![SOLVED: In Exercises 15-20, calculate the integral over the given region by changing to polar coordinates. f(x, y)=(x^2+y^2)^-3 / 2 ; x^2+y^2≤ 1, x+y ≥ 1 SOLVED: In Exercises 15-20, calculate the integral over the given region by changing to polar coordinates. f(x, y)=(x^2+y^2)^-3 / 2 ; x^2+y^2≤ 1, x+y ≥ 1](https://cdn.numerade.com/previews/df52cf56-1116-4d8c-9fd9-a99bc2503b82_large.jpg)
SOLVED: In Exercises 15-20, calculate the integral over the given region by changing to polar coordinates. f(x, y)=(x^2+y^2)^-3 / 2 ; x^2+y^2≤ 1, x+y ≥ 1
![transformation - Limits of integration when transforming from Cartesian to Polar coordinates - Mathematics Stack Exchange transformation - Limits of integration when transforming from Cartesian to Polar coordinates - Mathematics Stack Exchange](https://i.stack.imgur.com/fFMqr.jpg)
transformation - Limits of integration when transforming from Cartesian to Polar coordinates - Mathematics Stack Exchange
![derivatives - How $dxdy$ becomes $rdrd\theta$ during integration by substitution with polar coordinates - Mathematics Stack Exchange derivatives - How $dxdy$ becomes $rdrd\theta$ during integration by substitution with polar coordinates - Mathematics Stack Exchange](https://i.stack.imgur.com/iMlN6.png)