Question

How will you prove the following?

`int int_R` `(x^2y^2)/(x^2 +y^2) dxdy = (65pi)/16`,
where, R is the annulus between `x^2+y^2=4` and `x^2+y^2=9`

Answer 1

See below

Explanation:

Write it in polar.

`int int_R \ (x^2y^2)/(x^2 +y^2) \ color(blue)(dx\ dy)`

`equiv int_0^(2 pi) int_2^3 (r^2 cos^2 theta \ r^2 sin^2 theta )/(r^2) color(red)(\ r \ dr \ d theta)`

`=1/4 int_0^(2 pi) int_2^3 \ r^3 sin^2 (2 theta) \ dr \ d theta`

`=1/4 int_0^(2 pi) ( \ r^4/4)_2^3 sin^2 (2 theta) \ d theta`

`=1/4 int_0^(2 pi) ( \ r^4/4)_2^3 sin^2 (2 theta) \ d theta`

`=65/16 int_0^(2 pi) (1 - cos(4 theta))/2 \ d theta`

`=65/32 ( theta - 1/4 sin(4 theta) )_0^(2 pi)`

`=65/16 pi`