4. Compute the outward flux of the vector field F(r) = (r, y', =') through the unit sphere r² + y² + =² = 1 by first converting it to a triple integral using Gauss' Theorem, then switching to spherical coordinates.

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Author:Erwin Kreyszig
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4. Compute the outward flux of the vector field F(r) = (r³, y", z*)
through the unit sphere r + y + 2² = 1 by first converting it to a
triple integral using Gauss' Theorem, then switching to spherical
coordinates.
Transcribed Image Text:4. Compute the outward flux of the vector field F(r) = (r³, y", z*) through the unit sphere r + y + 2² = 1 by first converting it to a triple integral using Gauss' Theorem, then switching to spherical coordinates.
5. Let f(r, y, 2) = cos(2) and S be the unit sphere r + y + z = 1.
Compute the surface integral | f(x,y, z) dS.
[5]
Transcribed Image Text:5. Let f(r, y, 2) = cos(2) and S be the unit sphere r + y + z = 1. Compute the surface integral | f(x,y, z) dS. [5]
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