Use the transformation u = y/x, v = xy to findRxy3 dAover the region R in the first

Chapter 14, Problem 24

(choose chapter or problem)

Use the transformation $u=y / x, v=x y$ to find

$\int \int_{R} x y^{3} d A$

over the region $R$ in the first quadrant enclosed by $y=x, y=3 x, x y=1, x y=4$.

Equation Transcription:

$u=y/x,v=xy$

$\int\limits_{\ }^{\ }\int\limits_{R}^{\ }{xy}^{3}dA$

$R$

$y=x,\ y=3x,\ xy=1,\ xy=4$

Text Transcription:

u=y/x,v=xy

integral integral_R xy^3 dA

y=x, y=3x, xy=1, xy=4

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