Set up the integral for the divergence theorem both ways. Then find the flux.F(x,y,z) = 3x hat(i) + xy hat(j) + 2xz hat(k)E is the cube bounded by the planes x = 0, x = 3, y = 0, y = 3, and z = 0, z = 3.

alesterp

alesterp

Answered question

2021-02-20

Set up the integral for the divergence theorem both ways. Then find the flux.
F(x,y,z)=3xi^+xyj^+2xzk^
E is the cube bounded by the planes x=0,x=3,y=0,y=3, and z=0,z=3.

Answer & Explanation

Macsen Nixon

Macsen Nixon

Skilled2021-02-21Added 117 answers

Step 1
Considering the given dunction is
f(x,y,z)=3xi^+xyj^+2xzk^.
Where E is the cube bounded by the planes x=0,x=3,y=0,y=3 and z=0,z=3.
Find the flux.
Step 2
Consider
F(x,y,z)=3xi^+xyj^+2xzk^.
Find the div(f), then
grad F=3+x+2x
=3+3x
By using the divergence theorem, then
Flux=Fdv
=030303(3+3x)dzdydx
=03(3+3x)03(z)03dydx
=303(3+3x)03dydx
=303(3+3x)(y)03dx
=903(3+3x)dx
=9(3x+3x22)03
=4052
Hence, total flux is 4052.

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