Problem

Two given circles intersect in two points and . Show how to construct a segment passing through and terminating on the two circles such that is a maximum.

by Vo Duc Dien

Let E and F be the centers of the small and big circles, respectively, and r and R be their respective radii.

Let M and N be the feet of E and F to AB, and α = ∠APE and ε = ∠BPF

We have:

AP × PB = 2r cosα × 2R cosε = 4 rR cosα cosε

AP × PB is maximum when the product cosα cosε is a maximum.

We have cosα cosε = ½ [cos(α + ε) + cos(α - ε)]

But α + ε = 180° - ∠EPF and is fixed, so is cos(α + ε)

So its maximum depends on cos(α - ε) which occurs when α = ε. To draw the line AB:

Draw a circle with center P and radius PE to cut the radius PF at H. Draw the line parallel to EH passing through P. This line meets the small and big circles at A and B, respectively.

Solution with graph posted at

http://www.cut-the-knot.org/wiki-math/index.php?n=MathematicalOlympiads.USA1975Problem4

See also