8. Use the divergence theorem to evaluate the flux integral OF-nds where F(x,y.z)= (x' + cotan*(y`z'), y' - e*²', z' +In(x – y), ñ is the outward unit normal to S, and S is the surface of the solid enclosed in the hemisphere z = Ja² – x² - y? and the plane z=0.
8. Use the divergence theorem to evaluate the flux integral OF-nds where F(x,y.z)= (x' + cotan*(y`z'), y' - e*²', z' +In(x – y), ñ is the outward unit normal to S, and S is the surface of the solid enclosed in the hemisphere z = Ja² – x² - y? and the plane z=0.
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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Expert Solution
Step 1
Given:
is the outward unit normal to S, and S is the surface of the solid enclosed in the hemisphere
and the plane
We have to evaluate the flux integral by using the divergence theorem
Step 2
The Divergence Theorem:
Where S is a closed surface.
And E is the region inside that surface.
In this problem we have to calculate the flux of the integral which means we have to calculate
the surface integral but by using divergence theorem we will calculate the volume of the
given integral.
Now we will find div F:
Step 3
We have to calculate the integral :
The limit for z is:
and substitute
We can define the region E as follows:
And Jacobian is:
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