Find ∫c f*dr where f(x,y) = 〈 4xy3 , 6x2y2 〉 and c is a sequence of straight lines from (0,0) to (1,3) to (4,7) to (9,5) to (2,1

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Asitmoharna · Answer 1 · 2018-11-03T12:20:36+0000

First note that
$\mathbf f(x,y)=\langle4xy^3,6x^2y^2\rangle$ is continuous, which means that there is some scalar function
f(x,y)

whose gradient is
$\mathbf f(x,y)$ . In other words,
$\mathbf f(x,y)$ is conservative, and so the gradient theorem applies here, which means the value of the line integral is given by
f(2,1)-f(0,0)

.

So we look for such a function
f(x,y)

:

$(\partial f)/(\partial x)=4xy^3$

$\implies f=\displaystyle\int4xy^3\,\mathrm dx$

f=2x^2y^3+g(y)

$(\partial f)/(\partial y)=(\partial(2x^2y^3+g(y)))/(\partial y)$

6x^2y^2=6x^2y^2+g'(y)

$\implies g(y)=C$

$\implies f(x,y)=2x^2y^3+C$

Thus by the gradient theorem, the value of the line integral is

$\displaystyle\int_C\mathbf f\cdot\mathrm d\mathbf r=f(2,1)-f(0,0)=8$

Find ∫c f*dr where f(x,y) = 〈 4xy3 , 6x2y2 〉 and c is a sequence of straight lines from (0,0) to (1,3) to (4,7) to (9,5) to (2,1

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