Potential Due to a Charged Ring

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Find the electric potential on the axis of a uniformly charged ring of radius R and total charge Q at point P located a distance z from the center of the ring
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Potential Due to a Charged Disk

Find the electric potential on the axis of a uniformly charged disk of radius R and total charge Q at point P located a distance z from the center of the ring

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Potential Due to a Spherical Shell of Charge

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Find the electric potential both inside and outside a uniformly charged shell of radius R and total charge Q
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Potential Due to a Uniform Solid Sphere

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Find the electric field and electric potential inside a uniformly charged solid insulating sphere of radius R and total charge Q
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2012 Free Response Question 1

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2010 Free Response Question 1

$+Q E\&M. 1. Figure I A charge +Q is uniformly distributed over a quarter circle of radius R, as shown above. Points A, B, and C are located as shown, with A and C located symmetrically relative to the x-axis. Express all algebraic answers in terms of the given quantities and fundamental constants. (a) Rank the magnitude of the electric potential at points A, B, and C from greatest to least, with number 1 being greatest. If two points have the same potential, give them the same ranking. Justify your rankings. Point P is at the origin, as shown below, and is the center of curvature of the charge distribution. +Q Figure Il$

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2009 Free Response Question 1

![A spherically symmetric charge distribution has net positive charge Q) distributed within a radius of R. Its electric potential V as a function of the distance r from the center of the sphere is given by the following. V(r) = 2 -2+3 for r < R 41t€0R V(r) = for r > R 41t€or Express all algebraic answers in terms of the given quantities and fundamental constants. (a) For the following regions, indicate the direction of the electric field E(r) and derive an expression for its magnitude. Radially inward ii. r > R Radially inward Radially outward Radially outward (b) For the following regions, derive an expression for the enclosed charge that generates the electric field in that region, expressed as a function of r. ii. r

R (c) Is there any charge on the surface of the sphere (r = R) ? Yes No If there is, determine the charge. In either case, explain your reasoning. ](./media/image150.png)