We cannot integrate vector fields over S because S is no
Question and Solution
We cannot integrate vector fields over S because S is not orientable, but it is possible to integrate functions over S.
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We cannot integrate vector fields over S because S is not orientable, but it is possible to integrate functions over S. Using a computer algebra system: (a) Verify that n(u, v)2 = 1 + 3 4 v2 + 2v cos u 2 + 1 2 v2 cos u (b) Compute the surface area of S to four decimal places. (c) Compute S (x2 + y2 + z2)dS to four decimal places.
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