Let S be the sphere of radius R centered at the origin. Explain using symmetry: S x2 dS
Chapter 16, Problem 28(choose chapter or problem)
Let S be the sphere of radius R centered at the origin. Explain using symmetry: S x2 dS = S y2 dS = S z2 dS Then show that S x2 dS = 4 3 R4 by adding the integrals.
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