1966 IMO Problems/Problem 6

Problem

In the interior of sides $BC, CA, AB$ of triangle $ABC$ , any points $K, L,M$ , respectively, are selected. Prove that the area of at least one of the triangles $AML, BKM, CLK$ is less than or equal to one quarter of the area of triangle $ABC$ .

Solution

Let the lengths of sides $BC$ , $CA$ , and $AB$ be $a$ , $b$ , and $c$ , respectively. Let $BK=d$ , $CL=e$ , and $AM=f$ .

Now assume for the sake of contradiction that the areas of $\Delta AML$ , $\Delta BKM$ , and $\Delta CLK$ are all at greater than one fourth of that of $\Delta ABC$ . Therefore

$\frac{AM\cdot AL\sin{\angle BAC}}{2}>\frac{AB\cdot AC\sin{\angle BAC}}{8}$

In other words, $AM\cdot AL>\frac{1}{4}AB\cdot AC$ , or $f(b-e)>\frac{bc}{4}$ . Similarly, $d(c-f)>\frac{ac}{4}$ and $e(a-d)>\frac{ab}{4}$ . Multiplying these three inequalities together yields

$def(a-d)(b-e)(c-f)>\frac{a^2b^2c^2}{64}$

We also have that $d(a-d)\leq \frac{a^2}{4}$ , $e(b-e)\leq \frac{b^2}{4}$ , and $f(c-f)\leq \frac{c^2}{4}$ from the Arithmetic Mean-Geometric Mean Inequality. Multiplying these three inequalities together yields

$def(a-d)(b-e)(c-f)\leq\frac{a^2b^2c^2}{64}$

This is a contradiction, which shows that our assumption must have been false in the first place. This proves the desired result.

1966 IMO (Problems) • Resources
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1966 IMO Problems/Problem 6

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