Magnetic Field of a Solenoid: Difference between revisions

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==The Main Idea==
==The Main Idea==
[[File:Io15.gif|200px|thumb|right|alt text]]
The purpose of this application is to explore another way to apply the Biot-Sarvart law. The magnetic field is uniform along the axis of the solenoid, when electric current is run through it. The solenoid has to have coils much larger than the radius. The length of the coil is much larger than the diameter, and its often wrapped around a metal rod. The rod produces a magnetic field when an electric current is passed through it.


The purpose of this application is to explore another way to apply the Biot-Sarvart law. The magnetic field is uniform along the axis of the solenoid, when electric current is run through it. The solenoid has has to have coils much larger than the radius.  
A solenoid is a type of electromagnet when it is used to create a controlled magnetic field or if it is used to resist a current changing, then it is an inductor.  




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To determine the direction of the magnetic field: use your right hand and curl your fingers towards the direction of the current and the direction that your thumb is pointing to is the direction of the magnetic field.  
To determine the direction of the magnetic field: use your right hand and curl your fingers towards the direction of the current and the direction that your thumb is pointing to is the direction of the magnetic field.  


===A Computational Model===
===A Computational Model===
A solenoid has a length of .5 meters and a radius of .03 meters and wound around 50 times a wire that has a current of 1 ampere. Find the magnetic field vectors.
from visual import ∗
scene . width=1024 scene.x = scene.y = 0
scene . background = color . white
L = 0.5
R = 0.03
kmag = 1e-7
I = 1
Nturns=50. ## number of turns in solenoid
Nelts=20. ## number of line segments per turn
bscale = 600. ## scale factor for B arrows
.## make a solenoid
dxx = L/(Nturns∗Nelts)
xx = arange(L/2., L/2+dxx, dxx)
omega = 2∗pi∗Nturns/L
solenoid = curve(x=xx, y=R∗sin(xx∗omega), z=R∗cos(xx∗omega), color=(.9,.7,0),radius =0.001)
.## make a list of zero lth arrows at observation locations
Barrows =[] ## empty list
dx = L/4.
zz=0.
for x in arange(-L/2, L/2+dx, dx):
    for y in [-.05,-.04, -.02,-.01,0,.01,.02,.03,.04,.05]:
          aa = arrow (pos = (x,y,zz), axis = (0,0,0), color = color.cyan, shaftwidth = .0003)
          Barrows.append(aa)
for b in Barrows:
    for point in solenoid.pos:
          dl = point - dlstart
          r = b.pos - (dlstart +dl/2)
          b.axis = b.axis + (-bscale*kmag*I*cross(dl, norm(r)))/mag(r)**2


How do we visualize or predict using this topic. Consider embedding some vpython code here [https://trinket.io/glowscript/31d0f9ad9e Teach hands-on with GlowScript]
          dlstart = point


==Examples==
==Examples==


[[File:solenoid.jpg]]
===Difficult===
===Simple===
To solve for the magnetic field of a solenoid, we need to do a three step process.
A simple example of this  
 
Imagine a solenoid with a length L that is made up of N loops wound, each with a radius R and a current I. Each loop is one piece.
[[File:Screen Shot 2015-12-05 at 6.12.26 PM.jpg]]
 
Step 2: Write an Equation for the Magnetic Field Due to One Piece
 
The origin of the solenoid is at its center. To find the location of one piece we have to find the integration variable, which is x, and then the distance from the loop to the observation location is d-z. There are also N/L loops in the solenoid so the number of loops in the length <math>\Delta x</math> is N/L*<math>\Delta E</math>.
 
So this the equation we have so far using the magnetic field formula, shown as the top image on the right. 
[[File:FullSizeRenderRadz.jpg|200px|thumb|right|Equation]]


===Difficult===
Step 2: Add Up all the Pieces


To solve for the magnetic field of a solenoid, you can use a four step process.  
The net magnetic field lies along the axis and the sum is <math>\Delta B</math>.


Step 1: Cut up the distribution into pieces and Draw the |Delta|B
This can be turned into a integral from -L/2 to L/2, shown as the bottom image on the right.  
Think about this: a solenoid the length of L that's made up for N circular loops tightly wound, each with a radius of R and a conventional current in the loops is I.  
[[File:FullSizeRenderRads1.jpg|200px|thumb|right|The Integral]]


We want to find the magnetic field contributed by each of the loops at any location along the axis of the solenoid.


Step 2: Write an Equation for the Magnetic Field Because of One Piece.
The integral can be solved out using a standard table of integrals or an integration calculator.  
The origin is located at the center of the solenoid.
We find the integration variable x, which is given by the location of a single piece. d-x is given by the distance from the loop to the observation location. 
We also have to consider the number of loops


==Connectedness==
==Connectedness==
#How is this topic connected to something that you are interested in?
There are many applications to solenoids that we use as a part of our everyday lives. They can be found in medical equipment, air conditioning devices, electric locking mechanisms, cars, and many others. To find out more about each of these applications in detail please go to [[Solenoid Applications]].
#How is it connected to your major?
One example is the car starter solenoid. The starter solenoid receives a large electric current from the car battery and a small electric current from the ignition switch. When the switch is turned on, the small current forces the starter solenoid to close contacts and relays the large electric current to the starter motor.
#Is there an interesting industrial application?


==History==
==History==


Put this idea in historical context. Give the reader the Who, What, When, Where, and Why.
Andre-Marie Ampere originally coined the word "Solenoid" in the 1820's, which he used to describe a helical coil. He probably used solenoid while he was developing the theory for Ampere's Law, which can be used to find the magnetic field of a solenoid.
[[File:Andre-marie-ampere-3.jpg|200px|thumb|right|Andre-Marie Ampere]]


== See also ==
== See also ==
[[Solenoid Applications]]


[[Ampere's Law]]
[[Ampere's Law]]


[[Right Hand Rule]]
[[Right-Hand Rule]]


[[Magnetic Field of a Loop]]
[[Solenoid Applications]]


[[Magnetic Field of A Loop]]


===Further reading===
===Further reading===


Books, Articles or other print media on this topic
http://hyperphysics.phy-astr.gsu.edu/hbase/magnetic/solenoid.html


===External links===
===External links===
[http://www.scientificamerican.com/article/bring-science-home-reaction-time/]
http://www.gouldvalve.com/wp-content/uploads/2009/05/typical-uses-pages-1-3.pdf
 
http://www.deltrol-controls.com/products/solenoids
https://www.pa.msu.edu/courses/2000fall/PHY232/lectures/ampereslaw/solenoid.html


==References==
==References==


This section contains the the references you used while writing this page
http://hyperphysics.phy-astr.gsu.edu/hbase/magnetic/solenoid.html
http://www.bachofen.ch/fr/schalttechnik/ProdukteF_Composants/Befehlsgeraete_Schalter_Mikroschalter/Johnson_Electric_LEDEX_Solenoids_EN_2014.pdf


[[Category:Which Category did you place this in?]]
Matters and Interactions, 3rd Edition
[[Category: Fields]]

Latest revision as of 22:24, 5 December 2015

Created by ramin8 !!

A Solenoid is a type of electromagnet, which consists of a coil tightly wound into a helix. Usually it produces a uniform magnetic field when an electric current is run through it. The purpose of a solenoid is to create a controlled magnetic field.


The Main Idea

alt text

The purpose of this application is to explore another way to apply the Biot-Sarvart law. The magnetic field is uniform along the axis of the solenoid, when electric current is run through it. The solenoid has to have coils much larger than the radius. The length of the coil is much larger than the diameter, and its often wrapped around a metal rod. The rod produces a magnetic field when an electric current is passed through it.

A solenoid is a type of electromagnet when it is used to create a controlled magnetic field or if it is used to resist a current changing, then it is an inductor.


A Mathematical Model

This is the formula for the magnetic field inside a long solenoid: [math]\displaystyle{ B = {\mu _{0}} \frac{NI}{L} }[/math] This formula is used inside a long solenoid, when the radius of the solenoid is much smaller than the length. B is the magnetic field. [math]\displaystyle{ {\mu _{0}} }[/math] is a constant. N is the number of loops in the solenoid. L is the length of the solenoid.

To determine the direction of the magnetic field: use your right hand and curl your fingers towards the direction of the current and the direction that your thumb is pointing to is the direction of the magnetic field.


A Computational Model

A solenoid has a length of .5 meters and a radius of .03 meters and wound around 50 times a wire that has a current of 1 ampere. Find the magnetic field vectors.

from visual import ∗

scene . width=1024 scene.x = scene.y = 0

scene . background = color . white

L = 0.5

R = 0.03

kmag = 1e-7

I = 1

Nturns=50. ## number of turns in solenoid

Nelts=20. ## number of line segments per turn

bscale = 600. ## scale factor for B arrows

.## make a solenoid

dxx = L/(Nturns∗Nelts)

xx = arange(L/2., L/2+dxx, dxx)

omega = 2∗pi∗Nturns/L

solenoid = curve(x=xx, y=R∗sin(xx∗omega), z=R∗cos(xx∗omega), color=(.9,.7,0),radius =0.001)


.## make a list of zero lth arrows at observation locations

Barrows =[] ## empty list

dx = L/4.

zz=0.


for x in arange(-L/2, L/2+dx, dx):

    for y in [-.05,-.04, -.02,-.01,0,.01,.02,.03,.04,.05]:
         aa = arrow (pos = (x,y,zz), axis = (0,0,0), color = color.cyan, shaftwidth = .0003)
         Barrows.append(aa)

for b in Barrows:

    for point in solenoid.pos:
         dl = point - dlstart
         r = b.pos - (dlstart +dl/2)
         b.axis = b.axis + (-bscale*kmag*I*cross(dl, norm(r)))/mag(r)**2
         dlstart = point

Examples

Difficult

To solve for the magnetic field of a solenoid, we need to do a three step process.

Imagine a solenoid with a length L that is made up of N loops wound, each with a radius R and a current I. Each loop is one piece.

Step 2: Write an Equation for the Magnetic Field Due to One Piece

The origin of the solenoid is at its center. To find the location of one piece we have to find the integration variable, which is x, and then the distance from the loop to the observation location is d-z. There are also N/L loops in the solenoid so the number of loops in the length [math]\displaystyle{ \Delta x }[/math] is N/L*[math]\displaystyle{ \Delta E }[/math].

So this the equation we have so far using the magnetic field formula, shown as the top image on the right.

Equation

Step 2: Add Up all the Pieces

The net magnetic field lies along the axis and the sum is [math]\displaystyle{ \Delta B }[/math].

This can be turned into a integral from -L/2 to L/2, shown as the bottom image on the right.

The Integral


The integral can be solved out using a standard table of integrals or an integration calculator.

Connectedness

There are many applications to solenoids that we use as a part of our everyday lives. They can be found in medical equipment, air conditioning devices, electric locking mechanisms, cars, and many others. To find out more about each of these applications in detail please go to Solenoid Applications. One example is the car starter solenoid. The starter solenoid receives a large electric current from the car battery and a small electric current from the ignition switch. When the switch is turned on, the small current forces the starter solenoid to close contacts and relays the large electric current to the starter motor.

History

Andre-Marie Ampere originally coined the word "Solenoid" in the 1820's, which he used to describe a helical coil. He probably used solenoid while he was developing the theory for Ampere's Law, which can be used to find the magnetic field of a solenoid.

Andre-Marie Ampere

See also

Ampere's Law

Right-Hand Rule

Solenoid Applications

Magnetic Field of A Loop

Further reading

http://hyperphysics.phy-astr.gsu.edu/hbase/magnetic/solenoid.html

External links

http://www.gouldvalve.com/wp-content/uploads/2009/05/typical-uses-pages-1-3.pdf http://www.deltrol-controls.com/products/solenoids https://www.pa.msu.edu/courses/2000fall/PHY232/lectures/ampereslaw/solenoid.html

References

http://hyperphysics.phy-astr.gsu.edu/hbase/magnetic/solenoid.html http://www.bachofen.ch/fr/schalttechnik/ProdukteF_Composants/Befehlsgeraete_Schalter_Mikroschalter/Johnson_Electric_LEDEX_Solenoids_EN_2014.pdf

Matters and Interactions, 3rd Edition