Let F vector = <x,y,z> and use the Divergence Theorem to calculate the (nonzero) volume of some solid in IR3 by calculating a surface integral. (You can pick the solid).

Amari Flowers

Amari Flowers

Answered question

2021-01-10

Let Fr=<x,y,z> and use the Divergence Theorem to calculate the (nonzero) volume of some solid in IR3 by calculating a surface integral. (You can pick the solid).

Answer & Explanation

Cristiano Sears

Cristiano Sears

Skilled2021-01-11Added 96 answers

Step 1
Consider the provided question,
Given, F=x,y,z=ξ+yj+zk
Let s be a closed surface enclosing some volume V.
Find sFNds
By gauss divergence theorem,
sFNds=V÷Fdv
Since, F=ξ+yj+zk
div F=x(x)+(y)(y)+(z)(z)
=1+1+1
=3
Step 2
Now, find the (nonzero) volume V of some solid in R3 by calculating a surface integral.
sFNds=V÷Fdv
=V(3)dv
=3V1dv
sFNds=3V
V=1.3sFNds
Hence, nonzero volume, V=13sFNds

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Multivariable calculus

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?