Gravitational Potential Energy: Difference between revisions
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<math>U = - G \frac{m_1 m_2}{r}\ </math> | <math>U = - G \frac{m_1 m_2}{r}\ </math> | ||
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* ''F'' is the gravitational potential energy | * ''F'' is the gravitational potential energy | ||
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* ''m''<sub>2</sub> is the second mass; | * ''m''<sub>2</sub> is the second mass; | ||
* ''r'' is the distance between the centers of the masses | * ''r'' is the distance between the centers of the masses | ||
[https://www.youtube.com/watch?v=zj5Th47UkC8] | [https://www.youtube.com/watch?v=zj5Th47UkC8] |
Revision as of 20:40, 5 April 2017
Claimed by: Arthi Nithi 3/5/2017
Gravitational Potential
Gravitational potential energy (U) is the energy stored in an object as a result of its position in a gravitational field and attractive forces from surrounding objects. Most commonly we see the potential energy for object near the surface of Earth (U = mgh) to be equivalent to the work required to lift an object to a height h with no change in kinetic energy. Since force required to lift the object is weight (mg), the gravitation potential energy is weight times height.
For a more general case, when two objects with mass are attracted to each other by gravity the gravitational potential depends on the distance between the two and masses of each. Kinetic energy is always positive and increase as an object approaches another. Thus, for total energy to be constant, gravitational potential energy must be less than or equal to 0. The gravity of one object does positive work as the other object approaches, which is why as distance r decreases the magnitude of U increases (becomes a larger negative value). Additionally, the more mass objects have the greater the potential energy.
A Mathematical Model
Gravitational Potential Energy Near Earth's Surface:
[math]\displaystyle{ U = mgh\ }[/math]
- U is the gravitational potential energy
- m is the mass of the object
- g gravitational acceleration approximated at 9.8 N/kg
- h the distance the object is from Earth's surface
Gravitational Potential Energy Between Two Objects:
[math]\displaystyle{ U = - G \frac{m_1 m_2}{r}\ }[/math]
- F is the gravitational potential energy
- G is the gravitational constant 6.67408(31)×10^−11 m3⋅kg^−1⋅s^−2
- m1 is the first mass;
- m2 is the second mass;
- r is the distance between the centers of the masses
A Computational Model
How do we visualize or predict using this topic?
Graphs are the best mathematical way to represent potential energy. Be low are a few examples of how to draw potential energy graphically.
In figure 6.38 to the left, there is a representation of a spacecraft leaving the asteroid. The gravitational potential is negative because the interaction is attractive and by the graph we can see the potential increases with separation.
In the next figure to the right it is important to note as the asteroid gets farther away the kinetic energy will continue to fall and K approaches K+U, but K can not be negative since it involves velocity. When the two objects are far apart U is nearly 0 and K+U is nearly K. This graph is an example of a bound system, with the spacecraft having a smaller initial velocity headed away from the asteroid.
How to Draw Energy graphs
- Draw U vs. r for the interaction
- At some r where you know K, plot the point
- Add that value of K to U so it has the same separation r
- Plot K+U at the r value, find K when added to U gives K+U
- Sketch K vs. r
Examples
Be sure to show all steps in your solution and include diagrams whenever possible
Simple
A ball of mass 100 grams is 7m above the ground, initially at rest( Ki=0) When the ball is 4 m above the ground what is the final Kinetic energy? Choose the ball+ Earth system. == First look at the two pictures to the right in order to see the ball+Earth as a system and to see what equations to use. The rest Energy is 0.
- [math]\displaystyle{ 0=\Delta K_{(Earth)} + \Delta K_{(ball)} +\Delta U }[/math],
- [math]\displaystyle{ 0= 0+(K_{(ball,f)} -0)+ \Delta(mgy) }[/math]
- [math]\displaystyle{ 0= K_{(ball,f)} + (0.1 kg)*(9.8 N/M)*(-3 m) }[/math]
- [math]\displaystyle{ U_g -2.94J }[/math]
This is used to solve for kinetic energy
- [math]\displaystyle{ K_{(ball,f)} = 2.94 J }[/math]
Middling
In February 2013 a large meteor, whose mass has been estimated to be 1.2x107 kg, fell to Earth near Chelyabinsk, Russia. (This meteor exploded spectacularly at height of about 30 km, doing significant damage to objects on the ground.) Consider a meteor of the same mass falling toward the Earth. Choose the Earth plus the meteor as the system. As the meteor falls from a distance of 1e8 m from the center of the Earth to 1e7 m, what is the change n the kinetic energy of the meteor? Explain the signs of the changes in kinetic and potential energy of the system.
- [math]\displaystyle{ U_{(grav)} }[/math] must first be calculated explicitly for each state
- [math]\displaystyle{ U_i = G \frac{m_E m_m}{r^2} = -6.7e-11 Nm^2/kg^2 \frac{6e24 kg * 1.2e7 kg m_m}{1e8^2m} }[/math]
- [math]\displaystyle{ = -4.82e13J }[/math]
- [math]\displaystyle{ U_f = G \frac{m_E m_m}{r^2}= -6.7e-11 Nm^2/kg^2 \frac{6e24 kg * 1.2e7 kg m_m}{1e7^2m} }[/math]
- [math]\displaystyle{ = -4.82e14J }[/math]
Both the initial and final values are negative. Seperation decreases so we know that The final potential energy minus the initial is greater than 0. Apply the Energy Principle now to find the final answer.
- [math]\displaystyle{ \Delta K_{(meteor)}+(-4.82e14 J - -4.82e13J)=0 }[/math]
- [math]\displaystyle{ \Delta K_{(meteor)}=4.34e14J }[/math]
Difficult
A robot spacecraft lands on an asteroid, picks up a sample, and blasts off to return to the Earth; it's total mass is 1500 kg. When it is 200 km from the center of mass of the asteroid, its speed is 5.0 m/s, and the rockets are turned off. At the moment when it has coasted to a distance 500 km from the center of the asteroid, its speed has a decreased to 4.1 m/s. Calculate the mass of the asteroid.
M will be the mass of the asteroid and m will be the mass of the spacecraft.
- [math]\displaystyle{ E_{(f)}= E_i + W }[/math]
Mc^2 + K_Mf+ mc^2 + [math]\displaystyle{ K_{(mf)}+ U_{(f)} }[/math]= Mc^2 + K_Mf+ mc^2 + [math]\displaystyle{ K_{(m,i)}+ U_{(i)} + W }[/math]
- [math]\displaystyle{ K_{(m,f)}+ U_{(f)}= K_{(m,i)}+ U_{(i)} + 0 }[/math]
- [math]\displaystyle{ .5 m v_{(f)}^2 - G \frac{M m}{r_{(f)}}= .5 m v_{(i)}^2 - G \frac{M m}{r_{(i)}} }[/math]
Can factor out the m
- [math]\displaystyle{ m (.5 v_{(f)}^2 - G \frac{M }{r_{(f)}})= m(.5 v_{(i)}^2 - G \frac{M }{r_{(i)}} ) }[/math]
- [math]\displaystyle{ GM (\frac{1 }{r_{(i)}} -\frac{1 }{r_{(f)}} )= .5 (v_{(i)}^2 -v_{(f)}^2) }[/math]
Connectedness
- http://voyager.jpl.nasa.gov/ Nasa uses gravitational energy to get probes to break through the heliosphere as in the voyager mission. Gravitational energy is very important to understand when sending probes to explore planets.
- Biochem majors may find this information useful in understanding how chemical potential works.
- Actual Application: http://www.forbes.com/sites/startswithabang/2015/11/02/move-over-hubble-gravity-itself-is-the-best-cosmic-telescope-of-all/
History
Put this idea in historical context. Give the reader the Who, What, When, Where, and Why.
Newton thought gravitational attraction was caused by mysterious magnetic forces.Einstein rejected this and came up with what we now know as force. Then it was just left to realize that work must be replaced with potential in a system of interacting objects.
See also
Media:http://theory.uwinnipeg.ca/physics/work/node5.html
Might be interesting to explore spring potential
Further reading
Books, Articles or other print media on this topic:
Media:http://www.sciencedirect.com/science/article/pii/S0370269301005895
Media:http://194.44.198.33/faculty/geology/phis_geo/fourman/library-Earth/Physics of the Earth.pdf
External links
Internet resources on this topic Simple Explaination: Media:http://scienceworld.wolfram.com/physics/GravitationalForce.html
Videos!Media:http://study.com/academy/lesson/gravitational-force-definition-equation-examples.html
Media:https://www.youtube.com/watch?v=a91DAsbYCo4
More InfoMedia:http://www.physicsclassroom.com/class/circles/Lesson-3/Newton-s-Law-of-Universal-Gravitation
Media:http://matterandinteractions.org/student/Mechanics/LectureVideos/LectureVideos.html
References
This section contains the the references you used while writing this page
Media:http://www.physicsclassroom.com/class/circles/Lesson-3/Newton-s-Law-of-Universal-Gravitation
Media:http://matterandinteractions.org/
Mathmatical Model and gravity Feild:
Media:https://en.wikipedia.org/wiki/Newton's_law_of_universal_gravitation