Let R and a be real numbers such that 0 < a < R. Let S be the surface parametrized by r(u, v) = (R+ a cos(u)) cos(v)i + (R+a cos(u)) sin(v)j+ a sin(u)k, where 0 < u < 2r and 0 < v < 2a. (a) Describe and draw S. (b) Find the surface area of S. (c) Evaluate (x² + y ) do.

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Calc 3 - Stokes parts b anc c --> region is a torus in part a 

Let R and a be real numbers such that 0 < a < R. Let S be the surface parametrized by
r(u, v) = (R+ a cos(u)) cos(v)i + (R+a cos(u)) sin(v)j + a sin(u)k,
where 0 < u < 2n and 0 < v < 2n.
(a) Describe and draw S.
(b) Find the surface area of S.
(c) Evaluate
(x² + y ) do.
Transcribed Image Text:Let R and a be real numbers such that 0 < a < R. Let S be the surface parametrized by r(u, v) = (R+ a cos(u)) cos(v)i + (R+a cos(u)) sin(v)j + a sin(u)k, where 0 < u < 2n and 0 < v < 2n. (a) Describe and draw S. (b) Find the surface area of S. (c) Evaluate (x² + y ) do.
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