What is the average area using polar coordinates?

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nysnacc
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Homework Statement


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Homework Equations


Average (area) = 1/Area * integrate of polar

The Attempt at a Solution


y= r* sin theta
x= r* cos theta
r^2 = x^2+y^2

upload_2016-9-13_21-4-40.png
 
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BvU said:
Why the square root ?
x^2 + y^2 =r^2... OH, so only r not root r! and other than that, its fine?
 
Hi, the ##Area(R)=\pi a^{2}## that you must divide, after ##z(x,y)=f(r,\theta)=\sqrt{x^{2}+y^{2}}=r## and not ##\sqrt{r}##... so inside there is ##r^2## ...
 
so the solution is (1/Area) double integral r dr d(theta) ?
 
1/Area* ∫∫ r dr dθ is not correct ...?
 
the formula say ##\frac{1}{Area(R)}\int\int_{R}f(r,\theta)rdrd\theta## so you have ##f(r,\theta)\cdot r## inside ...
 
so f(r, θ) makes a r,
then 1/Area* ∫∫ r* r dr dθ
 
thanks buddy!
 
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Ssnow said:
now it is ok, :wink:
And I got the answer as ⅓ a
 
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