Electric Potential: Find at Infinity w/ Two Point Charges

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The electric potential at infinity is zero, as defined by the integral of the electric field from infinity to a point in space, which results in no movement when both points are at infinity. To calculate the work done by electrical forces when moving a proton from the origin to infinity, one must consider the change in potential energy, which is negative due to the work-energy theorem for conservative forces. Since the potential energy at infinity is zero, the work done is simply the negative of the potential energy at the origin. This means the work is equal to the negative value found at the origin, confirming that there is no change in potential energy at infinity. Understanding these principles is crucial for solving related problems in electrostatics.
wave41
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Hello everyone, I need alittle help with an assignment...I am given two charges one along the y-axis and one along the x, and I am asked to find the electric potential at infinite distance...I found the electric potential at the origin, but I am unsure about the eletric potential at infinity.Since when r final= infinity then it is o V at f...So the electric potential is equal to 1/4piE (Q/r)...what I am not sure about is as how to treat this with two point like charges...To find the electric potential at infinity...
Thank you
 
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The potential at infinity is just zero. Remember the definition of potential, as the integral of the electric field from infinity to the point in space you wish to calculate the potential. If that point happens to be infinity, you're moving from infinity to infinity, in other words, your not moving anywhere, and the potential is just zero, relative to infinity.
 
Thank you :smile:
 
I have another question about this problem...there is another part asking for the work done by electrical forces if the proton at the origin is moved from the origin to infinity?? Is it just the negative potential energy of the proton at the origin?
Thank you
 
Yes, because the work-energy theorem for conservative forces (such as the electric field force) is

W_C = -\Delta ({\rm PE}).

So to find the work of all conservative forces acting on a particle as it moves from one point to another, find the change in potential energy between those two points.

Don't forget the negative sign (which appears because conservative forces try to minimize potential energy). Note also that one of the potential energy values (at infinity) is 0.
 
sorry I have another dumb question...Since the particle's PE is zero at infinity, so there is really no change and it is just the negative of the result I found at the origin where the particles is no?
 
Yes, this is correct.
 
thanks :smile:
 

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