Find an expression for the potential V at a point P(0, 0, 2) due to uniformly charged disk of a radius a and the surface density rho_s. The disk is located at the origin and on the (x, y) plane. The potential is given as: V(x, y) = 1/x + 1/y Find the following: V as a function of x and y, E – electric field intensity as a function of x and y, The directional derivative at P(1, 1, 0) in the direction of a vector AL^- = x^- y^

44 - Find an expression for the potential V at a point P(0, 0, 2) due to uniformly charged disk of a radius a and the surface density rho_s. The disk is located at the origin and on the (x, y) plane. The potential is given as: V(x, y) = 1/x + 1/y Find the following: V as a function of x and y, E - electric field intensity as a function of x and y, The directional derivative at P(1, 1, 0) in the direction of a vector AL^- = x^- y^

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images - Find an expression for the potential V at a point P(0, 0, 2) due to uniformly charged disk of a radius a and the surface density rho_s. The disk is located at the origin and on the (x, y) plane. The potential is given as: V(x, y) = 1/x + 1/y Find the following: V as a function of x and y, E - electric field intensity as a function of x and y, The directional derivative at P(1, 1, 0) in the direction of a vector AL^- = x^- y^

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