Suppose that we want to solve Laplace's equation inside a hollow rectangular box, with sides of length a, b and c in the x, y and z directions, respectively. Let us set up the axes so that the origin is at one corner of the box, so that the faces are located at = 0 and x = a; at y = 0 and y = b; and at z 0 and z c. Suppose that the faces are all held at zero potential, except for the face at zc, on which the potential is specified to be V(x, y, c) = Vo = const a) Find the electrostatic potential V at a generic point inside the box b) Find the expression for the electrostatic potential evaluated at the center of the box, i.e. deter- mine V(a/2, b/2, c/2). Simplify your answer as much as you can! c) Suppose now that a = b = c, i.e. the box is a cube. Give a simple argument which gives the exact (and simple) expression for the potential at the center of the cube. (No calculations are asked here. Use physics, wave your hands, etc. and say "the answer is such and such because ...")
Suppose that we want to solve Laplace's equation inside a hollow rectangular box, with sides of length a, b and c in the x, y and z directions, respectively. Let us set up the axes so that the origin is at one corner of the box, so that the faces are located at = 0 and x = a; at y = 0 and y = b; and at z 0 and z c. Suppose that the faces are all held at zero potential, except for the face at zc, on which the potential is specified to be V(x, y, c) = Vo = const a) Find the electrostatic potential V at a generic point inside the box b) Find the expression for the electrostatic potential evaluated at the center of the box, i.e. deter- mine V(a/2, b/2, c/2). Simplify your answer as much as you can! c) Suppose now that a = b = c, i.e. the box is a cube. Give a simple argument which gives the exact (and simple) expression for the potential at the center of the cube. (No calculations are asked here. Use physics, wave your hands, etc. and say "the answer is such and such because ...")
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Transcribed Image Text:Suppose that we want to solve Laplace's equation inside a hollow rectangular box, with sides of
length a, b and c in the x, y and z directions, respectively. Let us set up the axes so that the origin
is at one corner of the box, so that the faces are located at = 0 and x = a; at y = 0 and y = b;
and at z 0 and z c. Suppose that the faces are all held at zero potential, except for the face
at zc, on which the potential is specified to be V(x, y, c) = Vo = const
a) Find the electrostatic potential V at a generic point inside the box
b) Find the expression for the electrostatic potential evaluated at the center of the box, i.e. deter-
mine V(a/2, b/2, c/2). Simplify your answer as much as you can!
c) Suppose now that a = b = c, i.e. the box is a cube. Give a simple argument which gives the
exact (and simple) expression for the potential at the center of the cube. (No calculations are asked
here. Use physics, wave your hands, etc. and say "the answer is such and such because ...")
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