Thanks a bunch for prompt response.
If a modify the inequality representing D, it gets the following form
(x-1)2+y2≤ 1
Which means (If i am not wrong) D is representing the interior of a circle centered at (1,0) and having radius equal to 1.
Hi!
I have a similar Problem.
I have to calculate the double integral given below.
∬D√(x2 +y2) dxdy, D=x2+y2≤2x
How can i calculate the limits from the give inequality to calculate the value of the given double integral?
Waiting for a kind response.
Thanks in advance
Homework Statement
I have to calculate the double integral given below.
Homework Equations
∬D√(x2 +y2) dxdy,D=x2+y2≤2x
The Attempt at a Solution
How can i calculate the limits from the give inequality to calculate the value of the given double integral?
Waiting for a kind...