http://www.physicsbook.gatech.edu/api.php?action=feedcontributions&feedformat=atom&user=Bmock7Physics Book - User contributions [en]2026-04-28T13:07:40ZUser contributionsMediaWiki 1.42.7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15285Loop Rule2015-12-05T20:32:52Z<p>Bmock7: /* Connectedness */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. Keep in mind that this applies through ANY round trip path; there can be<br />
multiple round trip paths through more complex circuits. This principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
Solution:<br />
<br />
First, write loop rule equations for each of the possible loops in the circuit. There are 3 loop equations that are possible.<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - Q/C = 0 </math><br />
<br />
<math> {I}_{2}{R}_{2} - Q/C = 0 </math><br />
<br />
From here, we can then solve for the current passing through a,b,d and e. We also know that the current passing through<br />
these points must be the same so <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{1}{R}_{2} = 0 </math><br />
<br />
<math> emf = {I}_{1}({R}_{1} + {R}_{2}) = 0 </math><br />
<br />
<math> emf/({R}_{1} + {R}_{2}) = {I}_{1} </math><br />
<br />
So the current at a,b,d,e = <math> emf/({R}_{1} + {R}_{2}) </math><br />
<br />
You must also know that once a capacitor is charging for a long time, current no longer flows through the capacitor. We can then<br />
easily solve for c because since current is no longer flowing through the capacitor, the current at c = 0.<br />
<br />
Lastly, we will use the loop rule equation of <math> {I}_{2}{R}_{2} - Q/C = 0 </math> to solve for Q.<br />
<br />
<math> {I}_{2}{R}_{2} = Q/C </math><br />
<br />
<math> C*({I}_{2}{R}_{2}) = Q </math> Since <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> C*({I}_{1}{R}_{2}) = Q </math> Lastly, we will plug in what we found {I}_{1} equals from before.<br />
<br />
<math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}) = Q </math><br />
<br />
Lastly, Q = <math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}</math> and we have now solved the problem.<br />
<br />
<br />
<br />
<br />
Answers: <br />
<br />
Current at a,b,d,e = <math> emf/({R}_{1} + {R}_{2}) </math><br />
<br />
Current at c = 0<br />
<br />
Q = <math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}</math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
One interesting note about Loop Rule is that is does not apply universally to all circuits. In particular, AC (alternating current) circuits, have a fluctuating <br />
electric charge that changes direction. This causes the electric potential of a round trip path around the circuit to no longer be zero. However, DC (direct current)<br />
circuits still follow the loop rule.<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15168Loop Rule2015-12-05T20:18:53Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. Keep in mind that this applies through ANY round trip path; there can be<br />
multiple round trip paths through more complex circuits. This principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
Solution:<br />
<br />
First, write loop rule equations for each of the possible loops in the circuit. There are 3 loop equations that are possible.<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - Q/C = 0 </math><br />
<br />
<math> {I}_{2}{R}_{2} - Q/C = 0 </math><br />
<br />
From here, we can then solve for the current passing through a,b,d and e. We also know that the current passing through<br />
these points must be the same so <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{1}{R}_{2} = 0 </math><br />
<br />
<math> emf = {I}_{1}({R}_{1} + {R}_{2}) = 0 </math><br />
<br />
<math> emf/({R}_{1} + {R}_{2}) = {I}_{1} </math><br />
<br />
So the current at a,b,d,e = <math> emf/({R}_{1} + {R}_{2}) </math><br />
<br />
You must also know that once a capacitor is charging for a long time, current no longer flows through the capacitor. We can then<br />
easily solve for c because since current is no longer flowing through the capacitor, the current at c = 0.<br />
<br />
Lastly, we will use the loop rule equation of <math> {I}_{2}{R}_{2} - Q/C = 0 </math> to solve for Q.<br />
<br />
<math> {I}_{2}{R}_{2} = Q/C </math><br />
<br />
<math> C*({I}_{2}{R}_{2}) = Q </math> Since <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> C*({I}_{1}{R}_{2}) = Q </math> Lastly, we will plug in what we found {I}_{1} equals from before.<br />
<br />
<math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}) = Q </math><br />
<br />
Lastly, Q = <math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}</math> and we have now solved the problem.<br />
<br />
<br />
<br />
<br />
Answers: <br />
<br />
Current at a,b,d,e = <math> emf/({R}_{1} + {R}_{2}) </math><br />
<br />
Current at c = 0<br />
<br />
Q = <math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}</math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15161Loop Rule2015-12-05T20:17:40Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. Keep in mind that this applies through ANY round trip path; there can be<br />
multiple round trip paths through more complex circuits. This principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
Solution:<br />
<br />
First, write loop rule equations for each of the possible loops in the circuit. There are 3 loops that are possible.<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - Q/C = 0 </math><br />
<br />
<math> {I}_{2}{R}_{2} - Q/C = 0 </math><br />
<br />
From here, we can then solve for the current passing through a,b,d and e. We also know that the current passing through<br />
these points must be the same so <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{1}{R}_{2} = 0 </math><br />
<br />
<math> emf = {I}_{1}({R}_{1} + {R}_{2}) = 0 </math><br />
<br />
<math> emf/({R}_{1} + {R}_{2}) = {I}_{1} </math><br />
<br />
So the current at a,b,d,e = <math> emf/({R}_{1} + {R}_{2}) </math><br />
<br />
You must also know that once a capacitor is charging for a long time, current no longer flows through the capacitor. We can then<br />
easily solve for c because since current is no longer flowing through the capacitor, the current at c = 0.<br />
<br />
Lastly, we will use the loop rule equation of <math> {I}_{2}{R}_{2} - Q/C = 0 </math> to solve for Q.<br />
<br />
<math> {I}_{2}{R}_{2} = Q/C </math><br />
<br />
<math> C*({I}_{2}{R}_{2}) = Q </math> Since <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> C*({I}_{1}{R}_{2}) = Q </math> Lastly, we will plug in what we found {I}_{1} equals from before.<br />
<br />
<math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}) = Q </math><br />
<br />
Lastly, Q = <math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}</math> and we have now solved the problem.<br />
<br />
<br />
<br />
<br />
Answers: <br />
<br />
Current at a,b,d,e = <math> emf/({R}_{1} + {R}_{2}) </math><br />
<br />
Current at c = 0<br />
<br />
Q = <math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}</math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15160Loop Rule2015-12-05T20:17:24Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. Keep in mind that this applies through ANY round trip path; there can be<br />
multiple round trip paths through more complex circuits. This principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
Solution:<br />
<br />
First, write loop rule equations for each of the possible loops in the circuit. There are 3 loops that are possible.<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - Q/C = 0 </math><br />
<br />
<math> {I}_{2}{R}_{2} - Q/C = 0 </math><br />
<br />
From here, we can then solve for the current passing through a,b,d and e. We also know that the current passing through<br />
these points must be the same so <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{1}{R}_{2} = 0 </math><br />
<br />
<math> emf = {I}_{1}({R}_{1} + {R}_{2}) = 0 </math><br />
<br />
<math> emf/({R}_{1} + {R}_{2}) = {I}_{1} </math><br />
<br />
So the current at a,b,d,e = <math> emf/({R}_{1} + {R}_{2}) </math><br />
<br />
You must also know that once a capacitor is charging for a long time, current no longer flows through the capacitor. We can then<br />
easily solve for c because since current is no longer flowing through the capacitor, the current at c = 0.<br />
<br />
Lastly, we will use the loop rule equation of <math> {I}_{2}{R}_{2} - Q/C = 0 </math> to solve for Q.<br />
<br />
<math> {I}_{2}{R}_{2} = Q/C </math><br />
<br />
<math> C*({I}_{2}{R}_{2}) = Q </math> Since <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> C*({I}_{1}{R}_{2}) = Q </math> Lastly, we will plug in what we found {I}_{1} equals from before.<br />
<br />
<math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}) = Q </math><br />
<br />
Lastly, Q = <math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}</math> and we have now solved the problem.<br />
<br />
Answers: <br />
Current at a,b,d,e = <math> emf/({R}_{1} + {R}_{2}) </math><br />
Current at c = 0<br />
Q = <math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}</math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15140Loop Rule2015-12-05T20:14:16Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. Keep in mind that this applies through ANY round trip path; there can be<br />
multiple round trip paths through more complex circuits. This principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
Solution:<br />
<br />
First, write loop rule equations for each of the possible loops in the circuit. There are 3 loops that are possible.<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - Q/C = 0 </math><br />
<br />
<math> {I}_{2}{R}_{2} - Q/C = 0 </math><br />
<br />
From here, we can then solve for the current passing through a,b,d and e. We also know that the current passing through<br />
these points must be the same so <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{1}{R}_{2} = 0 </math><br />
<br />
<math> emf = {I}_{1}({R}_{1} + {R}_{2}) = 0 </math><br />
<br />
<math> emf/({R}_{1} + {R}_{2}) = {I}_{1} </math><br />
<br />
So the current at a,b,d,e = <math> emf/({R}_{1} + {R}_{2}) </math><br />
<br />
You must also know that once a capacitor is charging for a long time, current no longer flows through the capacitor. We can then<br />
easily solve for c because since current is no longer flowing through the capacitor, the current at c = 0.<br />
<br />
Lastly, we will use the loop rule equation of <math> {I}_{2}{R}_{2} - Q/C = 0 </math> to solve for Q.<br />
<br />
<math> {I}_{2}{R}_{2} = Q/C </math><br />
<br />
<math> C*({I}_{2}{R}_{2}) = Q </math> Since <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> C*({I}_{1}{R}_{2}) = Q </math> Lastly, we will plug in what we found {I}_{1} equals from before.<br />
<br />
<math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}) = Q </math><br />
<br />
Lastly, Q = <math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}</math> and we have now solved the problem.<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15127Loop Rule2015-12-05T20:13:14Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. Keep in mind that this applies through ANY round trip path; there can be<br />
multiple round trip paths through more complex circuits. This principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
Solution:<br />
<br />
First, write loop rule equations for each of the possible loops in the circuit. There are 3 loops that are possible.<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - Q/C = 0 </math><br />
<br />
<math> {I}_{2}{R}_{2} - Q/C = 0 </math><br />
<br />
From here, we can then solve for the current passing through a,b,d and e. We also know that the current passing through<br />
these points must be the same so <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{1}{R}_{2} = 0 </math><br />
<br />
<math> emf = {I}_{1}({R}_{1} + {R}_{2}) = 0 </math><br />
<br />
<math> emf/({R}_{1} + {R}_{2}) = {I}_{1} </math><br />
<br />
So the current at a,b,d,e = <math> emf/({R}_{1} + {R}_{2}) </math><br />
<br />
You must also know that once a capacitor is charging for a long time, current no longer flows through the capacitor. We can then<br />
easily solve for c because since current is no longer flowing through the capacitor, the current at c = 0.<br />
<br />
Lastly, we will use the loop rule equation of <math> {I}_{2}{R}_{2} - Q/C = 0 </math> to solve for Q.<br />
<br />
<math> {I}_{2}{R}_{2} = Q/C </math><br />
<br />
<math> C*({I}_{2}{R}_{2}) = Q </math> Since <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> C*({I}_{1}{R}_{2}) = Q </math> Lastly, we will plug in what we found {I}_{1} equals from before.<br />
<br />
<math> C* (emf/({R}_{1} + {R}_{2})){R}_{2}) = Q </math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15106Loop Rule2015-12-05T20:10:09Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. Keep in mind that this applies through ANY round trip path; there can be<br />
multiple round trip paths through more complex circuits. This principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
Solution:<br />
<br />
First, write loop rule equations for each of the possible loops in the circuit. There are 3 loops that are possible.<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - Q/C = 0 </math><br />
<br />
<math> {I}_{2}{R}_{2} - Q/C = 0 </math><br />
<br />
From here, we can then solve for the current passing through a,b,d and e. We also know that the current passing through<br />
these points must be the same so <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{1}{R}_{2} = 0 </math><br />
<br />
<math> emf = {I}_{1}({R}_{1} + {R}_{2}) = 0 </math><br />
<br />
<math> emf/({R}_{1} + {R}_{2}) = {I}_{1} </math><br />
<br />
So the current at a,b,d,e = <math> emf/({R}_{1} + {R}_{2}) </math><br />
<br />
<br />
You must also know that once a capacitor is charging for a long time, current no longer flows through the capacitor. We can then<br />
easily solve for c because since current is no longer flowing through the capacitor, the current at c = 0.<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15097Loop Rule2015-12-05T20:09:30Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. Keep in mind that this applies through ANY round trip path; there can be<br />
multiple round trip paths through more complex circuits. This principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
Solution:<br />
<br />
First, write loop rule equations for each of the possible loops in the circuit. There are 3 loops that are possible.<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - Q/C = 0 </math><br />
<br />
<math> {I}_{2}{R}_{2} - Q/C = 0 </math><br />
<br />
You must also know that once a capacitor is charging for a long time, current no longer flows through the capacitor.<br />
From here, we can then solve for the current passing through a,b,d and e. We also know that the current passing through<br />
these points must be the same so <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{1}{R}_{2} = 0 </math><br />
<br />
<math> emf = {I}_{1}({R}_{1} + {R}_{2}) = 0 </math><br />
<br />
<math> emf/({R}_{1} + {R}_{2}) = {I}_{1} </math><br />
<br />
So the current at a,b,d,e = <math> emf/({R}_{1} + {R}_{2}) </math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15087Loop Rule2015-12-05T20:08:46Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. Keep in mind that this applies through ANY round trip path; there can be<br />
multiple round trip paths through more complex circuits. This principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
Solution:<br />
<br />
First, write loop rule equations for each of the possible loops in the circuit. There are 3 loops that are possible.<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - Q/C = 0 </math><br />
<br />
<math> {I}_{2}{R}_{2} - Q/C = 0 </math><br />
<br />
You must also know that once a capacitor is charging for a long time, current no longer flows through the capacitor.<br />
From here, we can then solve for the current passing through a,b,d and e. We also know that the current passing through<br />
these points must be the same so <math> {I}_{1} = {I}_{2} </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{1}{R}_{2} = 0 </math><br />
<br />
<math> emf = {I}_{1}({R}_{1} + {R}_{2}) = 0 </math><br />
<br />
<math> emf/({R}_{1} + {R}_{2}) = {I}_{1} = 0 </math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15086Loop Rule2015-12-05T20:08:22Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. Keep in mind that this applies through ANY round trip path; there can be<br />
multiple round trip paths through more complex circuits. This principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
Solution:<br />
<br />
First, write loop rule equations for each of the possible loops in the circuit. There are 3 loops that are possible.<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - Q/C = 0 </math><br />
<br />
<math> {I}_{2}{R}_{2} - Q/C = 0 </math><br />
<br />
You must also know that once a capacitor is charging for a long time, current no longer flows through the capacitor.<br />
From here, we can then solve for the current passing through a,b,d and e. We also know that the current passing through<br />
these points must be the same so <math> {I}_{1} = {I}_{2}<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{1}{R}_{2} = 0 </math><br />
<br />
<math> emf = {I}_{1}({R}_{1} + {R}_{2}) = 0 </math><br />
<br />
<math> emf/({R}_{1} + {R}_{2}) = {I}_{1} = 0 </math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15056Loop Rule2015-12-05T20:03:02Z<p>Bmock7: /* Loop Rule */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. Keep in mind that this applies through ANY round trip path; there can be<br />
multiple round trip paths through more complex circuits. This principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
Solution:<br />
<br />
First, write loop rule equations for each of the possible loops in the circuit. There are 3 loops that are possible.<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - Q/C = 0 </math><br />
<br />
<math> {I}_{2}{R}_{2} - Q/C = 0 </math><br />
<br />
You must also know that once a capacitor is charging for a long time, current no longer flows through the capacitor.<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15045Loop Rule2015-12-05T20:01:58Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
Solution:<br />
<br />
First, write loop rule equations for each of the possible loops in the circuit. There are 3 loops that are possible.<br />
<br />
<math> emf - {I}_{1}{R}_{1} - {I}_{2}{R}_{2} = 0 </math><br />
<br />
<math> emf - {I}_{1}{R}_{1} - Q/C = 0 </math><br />
<br />
<math> {I}_{2}{R}_{2} - Q/C = 0 </math><br />
<br />
You must also know that once a capacitor is charging for a long time, current no longer flows through the capacitor.<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15010Loop Rule2015-12-05T19:57:03Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15006Loop Rule2015-12-05T19:56:49Z<p>Bmock7: /* Simple */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=15004Loop Rule2015-12-05T19:56:40Z<p>Bmock7: /* Middling */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
Problem:<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
Solution:<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=14999Loop Rule2015-12-05T19:55:30Z<p>Bmock7: /* Simple */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
Problem:<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. <br />
<br />
Solution:<br />
Although we can solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=14994Loop Rule2015-12-05T19:54:52Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and \space C </math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=14992Loop Rule2015-12-05T19:54:42Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and C </math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=14990Loop Rule2015-12-05T19:54:33Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and charge Q of the capacitor. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and /space C </math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=14985Loop Rule2015-12-05T19:54:05Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
For the circuit above, imagine a situation where the switch has been closed for a long time. <br />
Calculate the current at a,b,c,d,e and chrage Q. Answer these using <math> emf, {R}_{1}, {R}_{2},<br />
and C </math><br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=14959Loop Rule2015-12-05T19:50:30Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=14958Loop Rule2015-12-05T19:50:22Z<p>Bmock7: /* Examples */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
RC Circuit<br />
<br />
[[File:HardLoopRule.jpg]]<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=File:HardLoopRule.jpg&diff=14950File:HardLoopRule.jpg2015-12-05T19:49:13Z<p>Bmock7: </p>
<hr />
<div></div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11607Loop Rule2015-12-04T05:37:41Z<p>Bmock7: /* Connectedness */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
RC Circuit<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11603Loop Rule2015-12-04T05:36:12Z<p>Bmock7: /* Difficult */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
RC Circuit<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
<br />
#How is it connected to your major?<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11599Loop Rule2015-12-04T05:35:52Z<p>Bmock7: /* History */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. Nowadays, it is used very often in electrical engineering. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
<br />
#How is it connected to your major?<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11598Loop Rule2015-12-04T05:35:02Z<p>Bmock7: /* Connectedness */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
<br />
#How is it connected to your major?<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11596Loop Rule2015-12-04T05:34:50Z<p>Bmock7: /* Connectedness */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
<br />
<br />
#How is it connected to your major?<br />
Because I am a Computer Science majors, while circuits are not directly connected to programming, computers and other electronics are made of different<br />
circuits. I assume that the Loop Rule is used in the electrical engineering that is required to create the circuits for the computers I use to program.<br />
<br />
#Is there an interesting industrial application?<br />
Since the Loop Rule is a fundamental principle of circuits, is it<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11549Loop Rule2015-12-04T05:11:47Z<p>Bmock7: /* Middling */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11548Loop Rule2015-12-04T05:11:37Z<p>Bmock7: /* Middling */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
This can also be rewritten as: <math> emf = 2 ({E}_{A} * {L}_{thick}) + {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11545Loop Rule2015-12-04T05:10:10Z<p>Bmock7: /* Middling */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. <br />
<br />
Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>. From here we just go around the circuit counterclockwise and add each potential difference to the loop rule equation.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11541Loop Rule2015-12-04T05:08:59Z<p>Bmock7: /* Simple */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math> <br />
From here it is a relatively simple process to find the current. We can rewrite the loop rule equation as <math> emf = IR </math> and then plug in 5 for the emf and<br />
10 for the resistance, leaving us with I = .5 amperes.<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11529Loop Rule2015-12-04T05:05:23Z<p>Bmock7: /* Simple */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. <br />
<br />
The loop rule equation would be <math> {V}_{battery} - {V}_{resistor} = 0 </math><br />
<br />
<br />
Since we know the <math> emf </math> of the battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math><br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11525Loop Rule2015-12-04T05:02:55Z<p>Bmock7: /* Simple */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem.<br />
<br />
If the <math> emf </math> is 5 V and the resistance of the resistor is 10 ohms, what is the current passing through the resistor. Although we can<br />
solve this using the V = IR equation for the whole loop, lets examine this problem using the loop rule equation. Since we know the <math> emf </math> of the<br />
battery we just need to find the potential difference through the resistor. For this we can use the equation of V = IR.<br />
<br />
Thus we now have an loop rule equation of <math> emf - IR = 0 </math><br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11489Loop Rule2015-12-04T04:39:21Z<p>Bmock7: /* Examples */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit shown above consists of a single battery and a single resistor. The resistance of the wires is negligible for this problem. <br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11488Loop Rule2015-12-04T04:38:37Z<p>Bmock7: /* Simple */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
The circuit above consists of a<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11467Loop Rule2015-12-04T04:32:50Z<p>Bmock7: /* Simple */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11466Loop Rule2015-12-04T04:32:39Z<p>Bmock7: /* Examples */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
<br />
[[File:SimpleLoopRule.jpg]]<br />
<br />
<br />
<br />
<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=File:SimpleLoopRule.jpg&diff=11465File:SimpleLoopRule.jpg2015-12-04T04:32:17Z<p>Bmock7: </p>
<hr />
<div></div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11457Loop Rule2015-12-04T04:27:03Z<p>Bmock7: /* Middling */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>.<br />
<br />
Thus we can find that a loop rule equation is: <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11456Loop Rule2015-12-04T04:26:50Z<p>Bmock7: /* Middling */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>.<br />
<br />
Thus we can find that a loop rule equation is <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} /space = 0 </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11455Loop Rule2015-12-04T04:26:32Z<p>Bmock7: /* Middling */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>.<br />
<br />
Thus we can find that a loop rule equation is <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11454Loop Rule2015-12-04T04:26:10Z<p>Bmock7: /* Middling */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>.<br />
Thus we can find that a loop rule equation is <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin} </math><br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11453Loop Rule2015-12-04T04:25:38Z<p>Bmock7: /* Middling */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
For the thin section of the wire, the electric potential is <math> {E}_{D} * {L}_{thin} </math>.<br />
Thus we can find that a loop rule equation is <math> emf - 2 ({E}_{A} * {L}_{thick}) - {E}_{D} * {L}_{thin}<br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11428Loop Rule2015-12-04T04:15:07Z<p>Bmock7: /* Examples */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for the electric potential of location E - G of the wire.<br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11421Loop Rule2015-12-04T04:13:32Z<p>Bmock7: /* Middling */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire. From his we can now find the potential difference <br />
of each section of the wires. The electric potential of location A - C is <math> {E}_{A} * {L}_{thick} </math>. This is the same for<br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11383Loop Rule2015-12-04T04:03:59Z<p>Bmock7: /* Middling */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} </math> and the length of the thin wire be <math> {L}_{thin} </math><br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire.<br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11380Loop Rule2015-12-04T04:03:36Z<p>Bmock7: /* Middling */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Let the length of the thin wires be <math> {L}_{thick} and the length of the thin wire be {L}_{thin}<br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires. Remember that the electric potential of a wire is equal to the electric field * length of the wire.<br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11370Loop Rule2015-12-04T03:58:47Z<p>Bmock7: /* Examples */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose <math> emf </math> is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the <math> emf </math> of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires.<br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7http://www.physicsbook.gatech.edu/index.php?title=Loop_Rule&diff=11369Loop Rule2015-12-04T03:58:11Z<p>Bmock7: /* Examples */</p>
<hr />
<div><br />
The Loop Rule is a fundamental principle of electric circuits that claims that in any round trip path in a circuit, [[Electric Potential]] equals zero.<br />
==Loop Rule==<br />
<br />
The loop rule simply states that in any round trip path in a circuit, <br />
[[Electric Potential]] equals zero. This<br />
principle deals with the conservation of energy within a circuit. Loop Rule and [[Node Rule]] are the two <br />
fundamental principle of electric circuits and are used to determine the behaviors of electric circuits.<br />
This principle is often used to solve for resistance of the light bulbs or other types of resistors or the<br />
current passing through these resistors.<br />
<br />
===A Mathematical Model===<br />
A mathematical representation is: <math> \Delta {V}_{1} + \Delta {V}_{2} + \space.... = 0 </math><br />
<br />
This can also be represented in a circuit as <math> emf = \Delta {V}_{1} + \Delta {V}_{2} + \space..... </math><br />
<br />
===A Visual Model===<br />
<br />
[[File:LoopRule.jpg]]<br />
<br />
The total voltage in the circuit is equal to all the individual voltages in the circuit added together.<br />
<br />
Another way to think about it is <math> \Delta {V} - (\Delta {V}_{1} + \Delta {V}_{2} + \Delta {V}_{3})= 0 </math><br />
<br />
==Examples==<br />
<br />
Be sure to show all steps in your solution and include diagrams whenever possible<br />
<br />
===Simple===<br />
===Middling===<br />
<br />
[[File:MediumExampleLoopRule.jpg]]<br />
<br />
<br />
The circuit shown above consists of a single battery, whose emf is 1.3 V, and three wires made of the same material, but having different cross-sectional areas.<br />
Find a loop rule equation that starts at the negative end of the battery and goes counterclockwise through the circuit.<br />
<br />
When beginning this problem, you must notice that the difference in cross-sectional areas affects the electric field in each wire. Because of this<br />
we will denote the electric field at D. as <math> {E}_{D} </math> and the electric field everywhere else as <math> {E}_{A} </math>.<br />
To begin we will go around the circuit clockwise and add up each component. First, we know that the emf of the battery is 1.3 V. Then, we will add up the potential <br />
voltage of each of the wires.<br />
<br />
===Difficult===<br />
<br />
==History==<br />
<br />
The Loop Rule is formally known as the Kirchhoff Circuit Law, named after Gustav Kirchhoff discovered and defined this fundamental concept of electric circuits. He discovered this during his time as a student at Albertus University of Königsberg in 1845. Kirchoff went on to explore the topics of spectroscopy and black body radiation after his graduation from Albertus. For more in depth information about Gustav Kirchhoff,<br />
visit the full wiki page on him: [[Gustav Kirchhoff]] <br />
<br />
[[File:KirchoffLoopRule.jpg|thumb|right||Gustav Kirchhoff]]<br />
<br />
==Connectedness==<br />
#How is this topic connected to something that you are interested in?<br />
#How is it connected to your major?<br />
#Is there an interesting industrial application?<br />
<br />
Since the Loop Rule is a fundamental principle of circuits,<br />
<br />
== See also ==<br />
Other Circuit Concepts you can check out :<br />
<br />
[[Node Rule]]<br />
<br />
[[Components]]<br />
<br />
[[Resistors and Conductivity]]<br />
<br />
[[Current]]<br />
<br />
===More Information and External links===<br />
<br />
[https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws Kirchoff's Circuit Laws - Wikipedia]<br />
<br />
[https://www.boundless.com/physics/textbooks/boundless-physics-textbook/circuits-and-direct-currents-20/kirchhoff-s-rules-152/the-loop-rule-540-5636/ Loop Rule - Boundless.com Textbook]<br />
<br />
[https://www.youtube.com/watch?v=IlyUtYRqMLs Loop Rule - Doc Physics Video Lecture]<br />
<br />
==References==<br />
<br />
* https://en.wikipedia.org/wiki/Kirchhoff%27s_circuit_laws#Kirchhoff.27s_voltage_law<br />
* Chabay, Ruth W. Matter and Interactions: Electric and Magnetic Interactions. John Wiley, 2015. Print.<br />
* http://www.ux1.eiu.edu/~cfadd/1360/28DC/Loop.html<br />
<br />
<br />
Claimed by Bmock7<br />
[[Category: Simple Circuits]]</div>Bmock7