MathDB

Let

D

be a plane region bounded by a circle of radius

r.

Let

(x,y)

be a point of

D

and consider a circle of radius

\delta

and center at

(x,y).

Denote by

l(x,y)

the length of that arc of the circle which is outside

D.

Find

\lim_{\delta \to 0} \frac{1}{\delta^{2}} \int_{D} l(x,y)\; dx\; dy.

Problem Statement