Circle Problem

helijet · P versus NP Offline Joined: 04 Oct 2008 Posts: 33

A large circle is tangent to each of the sides of a square. A small circle is tangent to the large circle and two sides of the square as shown. If the sides of the square have length 1, then how would you find the radius of the smaller circle?

**Posted:** Sat Nov 07, 2009 1:51 pm

ckck

**Posted:** Sat Nov 07, 2009 5:23 pm

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helijet · P versus NP Offline Joined: 04 Oct 2008 Posts: 33

**Posted:** Sat Nov 07, 2009 5:36 pm

ckck

**Posted:** Sat Nov 07, 2009 5:42 pm

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SCII!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!
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BAM!

helijet · P versus NP Offline Joined: 04 Oct 2008 Posts: 33

Would this be the answer to this problem because this is as far as I can get:
$0.5\sqrt{2}$ -0.5 - $r\sqrt{2}$ + r / 2

Unfortunately none of the choices match this answer. Sad

**Posted:** Sat Nov 07, 2009 6:39 pm

ckck

Well, the length of that diagonal of the smaller square would be $r\sqrt{2}$ . Thus the entire length of the diagonal in terms of the radii of the two circles is $r\sqrt{2}+r+\frac{1}{2}$ . Also the length of this diagonal is $\frac{\sqrt{2}}{2}$ . Setting these two equal and solve for $r$ .

**Posted:** Sat Nov 07, 2009 7:37 pm

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kanakmangal · New Member Offline Joined: 24 May 2009 Posts: 1

3/2 - sqrt(2)

**Posted:** Wed Nov 11, 2009 9:09 am

castigioni · Poincare Conjecture Offline Joined: 29 Apr 2008 Posts: 106

The commom tangent to the circles determine an isosceles triangle whose minor circle is the incircle.The inradius is r=A/s
whose value is r=3/2-2^.5

**Posted:** Wed Nov 11, 2009 11:22 am