6

Part of 2010 Chile National Olympiad

Problems(1)

finite no of equal circles inside equilateral

Source: Chile Finals 2010 L2 p6

Prove that in the interior of an equilateral triangle with side

a

you can put a finite number of equal circles that do not overlap, with radius

r = \frac{a}{2010}

, so that the sum of their areas is greater than

\frac{17\sqrt3}{80}

^2

geometrycombinatoricscombinatorial geometry