spherical coordinate variable separation The potential: Vo (Θ) k sin² (Θ / 2) cos² (Θ / 2). where K is a constant, is specified on the surface of a conducting sphere of radius R Assume that there are no charges inside or outside the sphere .a) write Vo (Θ) in terms of the Legendre polynomials. b) find the potential inside and outside the sphere
spherical coordinate variable separation The potential: Vo (Θ) k sin² (Θ / 2) cos² (Θ / 2). where K is a constant, is specified on the surface of a conducting sphere of radius R Assume that there are no charges inside or outside the sphere .a) write Vo (Θ) in terms of the Legendre polynomials. b) find the potential inside and outside the sphere
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spherical coordinate variable separation The potential: Vo (Θ) k sin² (Θ / 2) cos² (Θ / 2). where K is a constant, is specified on the surface of a conducting sphere of radius R Assume that there are no charges inside or outside the sphere .a) write Vo (Θ) in terms of the Legendre polynomials. b) find the potential inside and outside the sphere. c) find the surface charge density σ (Θ) in the sphere
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