plz solve it within 30-40 mins I'll give you multiple upvote 3. Let S be the part of the sphere +y + z² = 4 located above the plane z 0, oriented atthe point (0, 0, 2) by the unit normal vector n= k. Note that CE is not a closed surface. Let Falso be the defined vector field byF(z, y, 2) = [r +exp(Vy? +2?)]i+ [v + exp(v2 + z²)] j +[z + exp{/2where exp stands for the exponential function.Calculate the flux of F through S.is pronortional to the square of the

Flux of a vector valued function can be calculated easily using divergence theorem if S is a closed…

B. Let S be the part of the sphere r +y + z2 = 4 located above the plane z 0, oriented at the point (0, 0, 2) by the unit normal vector i=k. Note that CE is not a closed surface. Let F %3D also be the defined vector field by F(z, y, z) = [r + exp(Vy? +2?)]i+ [y +exp(v+22)]j+2 + exp(v+y²)] , %3D where exp stands for the exponential function. Calculate the flux of F through S.

B. Let S be the part of the sphere r +y + z2 = 4 located above the plane z 0, oriented at the point (0, 0, 2) by the unit normal vector i=k. Note that CE is not a closed surface. Let F %3D also be the defined vector field by F(z, y, z) = [r + exp(Vy? +2?)]i+ [y +exp(v+22)]j+2 + exp(v+y²)] , %3D where exp stands for the exponential function. Calculate the flux of F through S.

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

plz solve it within 30-40 mins I'll give you multiple upvote

3. Let S be the part of the sphere +y + z² = 4 located above the plane z 0, oriented at
the point (0, 0, 2) by the unit normal vector n= k. Note that CE is not a closed surface. Let F
also be the defined vector field by
F(z, y, 2) = [r +exp(Vy? +2?)]i+ [v + exp(v2 + z²)] j +[z + exp{/2
where exp stands for the exponential function.
Calculate the flux of F through S.
is pronortional to the square of the

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