Answer Happy

Substitution into V.H= V.M gives v4m= V.M For a uniformly magnetized sphere, V.M = 0 except at the surface of the sphere (because M is discontinuous). Therefore, inside and outside the sphere n v?um= 0 The problem has azimuthal symmetry, so we can write Um = Um(r.2) using the general spherical coordinate solution to Laplace's equation for a problem with azimuthal symmetry: Um(r,0) = (Air' + Bır 1-1) P(cosa) I=0 Using one or more of the boundary conditions 1.4. finite for r = 0 2. Um O asr → 3. Um is continuous 4. (B2 - Bi.n=0 Activate Windows Go to Settings to activate Window find B and then A