The side length of the square is $a$. Two different quadrants are inscribed in it as follows. A small red circle is also inscribed between them.
Find the radius of the smallest circle (red one) in terms of '$a$' only.
The side length of the square is $a$. Two different quadrants are inscribed in it as follows. A small red circle is also inscribed between them.
Find the radius of the smallest circle (red one) in terms of '$a$' only.
$r=\frac{3^2-2^2\sqrt{2}}{7^2} a$.
Take $a=1$ to simplify. To find $r$, find the solution to the following that has $(x,y) \in [0,1]^2$:
$x^2+y^2 = (1+r)^2\\ (x-1)^2+(y-1)^2 = (\sqrt{2}-1+r)^2\\ x = 1-r .$ $x,y$ represent the center of the smaller circle, $r$ is the radius. There are two solutions, only one has $(x,y) \in [0,1]^2$. Since I took $a=1$ to simplify, I need to scale the answer by $a$, which gives the answer above.