$)A thick spherical shell of charge Q and uniform volume charge density r is bounded by radii r₁ and r₂> r₁.With V=0 at infinity, find the electric potential Vas a function of distance r from the center of the distribution, considering regions (a) r>r2, (b) r2>r> r₁, and (c) r

$)A thick spherical shell of charge Q and uniform volume charge density r is bounded by radii r₁ and r₂> r₁.With V=0 at infinity, find the electric potential Vas a function of distance r from the center of the distribution, considering regions (a) r>r2, (b) r2>r> r₁, and (c) r

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Question

4.
$)A thick spherical shell of charge Q and uniform volume charge
density r is bounded by radii r₁ and r₂> r₁.With V=0 at infinity, find the
electric potential V as a function of distance r from the center of the
distribution, considering regions (a) r>r2, (b) r2>r> r₁, and (c) r<r₁. (d) Do
these solutions agree with each other at r=r₂ and r= r₁?

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Step 1: Outline steps to solve the problem

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Step 2: Write an expression relating electric potential to electric field.

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Step 3: Find electric potential outside shell

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Step 4: Find electric potential in the interior of shell

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Step 5: Find electric potential insider the shell

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Step 6: Check whether potential expressions match at boundaries

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