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6 Nov 2019
Let F = xy y2 z . and S denote the boundary of the unit cube with 0 x 1, 0 y 1, and 0 z 1. Compute the value of dS by direct computation of the surface integral. The normal is outward pointing on all faces of S. Evaluate the surface integral in 3a) using the Divergence Theorem. Show transcribed image text
Let F = xy y2 z . and S denote the boundary of the unit cube with 0 x 1, 0 y 1, and 0 z 1. Compute the value of dS by direct computation of the surface integral. The normal is outward pointing on all faces of S. Evaluate the surface integral in 3a) using the Divergence Theorem.
Show transcribed image text