A charge of 5 C5C is at the origin. How much energy would be applied to or released from a -2 C2C charge if it is moved from ( 3 , 6 ) (3,6) to ( -3 , 5) (3,5)?

1 Answer
Dwight
Dec 19, 2016

The potential energy of the -2 C charge changes from -1.34xx10^(10)J1.34×1010J to -1.54xx10^(10)J1.54×1010J, a change of -2.0xx10^9 J2.0×109J released.

Explanation:

Fortunately, by doing this problem using energy methods, we need only calculate the energy at the initial and final locations, and do not have to consider the (challenging) task of evaluating the force at each point along the path. (Calculus, anyone?)

At (3,6), the distance between the charges is sqrt(3^2 + 6^2)32+62 = sqrt4545

By Coulomb's law, the force is

F = ((9xx10^9)(5)(2))/45F=(9×109)(5)(2)45 = 2.0xx10^92.0×109 C (attractive)

and the potential energy is PE = FDeltad = (2.0xx10^9)xx sqrt45= -1.34xx10^(10)J

At (3,-5) the distance between the charges is sqrt(3^2 + 5^2) = sqrt34

By Coulomb's law, the force is

F = ((9xx10^9)(5)(2))/34 = 2.65xx10^9 C (attractive)

and the potential energy is PE = FDeltad = (2.65xx10^9)xx sqrt34= -1.54xx10^(10)J

Thus, the change in energy has been -2.0xx10^9 J where I have affixed the negative as the PE is lower at (3,-5) than at (3,6) because the -2 C charge is now closer to the 5 C to which it is attracted.

(As an aside, in all the above, the location of zero potential energy is taken to be at oo for the negative charge. This is the usual convention. Thus, this charge has negative potential energy at all points a finite distance from the positive charge. A negative PE generally implies a bound state for the charges as energy must be supplied to separate them to large distance from each other.)

Related questions
See all questions in Coulomb's Law
Impact of this question
1659 views around the world
You can reuse this answer
Creative Commons License