Four Congruent Circles (Posted on 2006-06-14)

	Submitted by Bractals
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If the radius of the four circles can be constructed, then clearly the four circles can be constructed. A rough sketch of the solution shows that triangle A'B'C' is similar to triangle ABC, its incenter is the incenter of triangle ABC, and D' is its circumcenter. Let x be the radius of the four circles, R' and r' the circumradius and inradius respectively of the triangle A'B'C', and R and r the circumradius and inradius respectively of the triangle ABC. Therefore, r'/R' = r/R, r' = r - x, and R' = 2*x Solving these equations for x gives x = R*r/(R+2*r) The circumradius and inradius of triangle ABC can be constructed. The radius x is constructable from R and r. Eric's "Think BIG then small... like Alice" has a concise way of constructing this radius.

	Subject	Author	Date
	re: Think BIG then small... like Alice	brianjn	2006-06-15 08:14:16
	Think BIG then small... like Alice	Eric	2006-06-14 23:43:16
	Short cut - but not a construction	brianjn	2006-06-14 19:58:40
	re: If this is what is meant then this is a solution	Bractals	2006-06-14 18:33:02
	If this is what is meant then this is a solution	Charlie	2006-06-14 15:50:31