1. Let V be the solid region in R satisfying x2 + y² < 3, y + z < 0 and z 2 0. Let S be the surface of V oriented with outward unit normal. Let F be the vector field F(x, y, 2) = [æyz°ji + [e*y]j+ [æ°y – e°]k (a) Sketch the region V. (b) Use Gauss' divergence theorem to find the flux of F across S.

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1. Let V be the solid region in R satisfying x2 + y² < 3, y + z < 0 and z 2 0. Let S be the surface
of V oriented with outward unit normal. Let F be the vector field
F(x, y, 2) = [æyz°ji + [e*y]j+ [æ°y – e°]k
(a) Sketch the region V.
(b) Use Gauss' divergence theorem to find the flux of F across S.
Transcribed Image Text:1. Let V be the solid region in R satisfying x2 + y² < 3, y + z < 0 and z 2 0. Let S be the surface of V oriented with outward unit normal. Let F be the vector field F(x, y, 2) = [æyz°ji + [e*y]j+ [æ°y – e°]k (a) Sketch the region V. (b) Use Gauss' divergence theorem to find the flux of F across S.
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