1988 AIME Problems/Problem 12

Problem

Let $P$ be an interior point of triangle $ABC$ and extend lines from the vertices through $P$ to the opposite sides. Let $a$ , $b$ , $c$ , and $d$ denote the lengths of the segments indicated in the figure. Find the product $abc$ if $a + b + c = 43$ and $d = 3$ .

Solution 1

Call the cevians AD, BE, and CF. Using area ratios ( $\triangle PBC$ and $\triangle ABC$ have the same base), we have:

$\frac {d}{a + d} = \frac {[PBC]}{[ABC]}$

Similarily, $\frac {d}{b + d} = \frac {[PCA]}{[ABC]}$ and $\frac {d}{c + d} = \frac {[PAB]}{[ABC]}$ .

Then, $\frac {d}{a + d} + \frac {d}{b + d} + \frac {d}{c + d} = \frac {[PBC]}{[ABC]} + \frac {[PCA]}{[ABC]} + \frac {[PAB]}{[ABC]} = \frac {[ABC]}{[ABC]} = 1$

The identity $\frac {d}{a + d} + \frac {d}{b + d} + \frac {d}{c + d} = 1$ is a form of Ceva's Theorem.

Plugging in $d = 3$ , we get

$\frac{3}{a + 3} + \frac{3}{b + 3} + \frac{3}{c+3} = 1$ $3[(a + 3)(b + 3) + (b + 3)(c + 3) + (c + 3)(a + 3)] = (a+3)(b+3)(c+3)$ $3(ab + bc + ca) + 18(a + b + c) + 81 = abc + 3(ab + bc + ca) + 9(a + b + c) + 27$ $9(a + b + c) + 54 = abc=\boxed{441}$

Solution 2

Let the labels $A,B,C$ be the weights of the vertices. First off, replace $d$ with $3$ . We see that the weights of the feet of the cevians are $A+B,B+C,C+A$ . By mass points, we have that: $\dfrac{a}{3}=\dfrac{B+C}{A}$ $\dfrac{b}{3}=\dfrac{C+A}{B}$ $\dfrac{c}{3}=\dfrac{A+B}{C}$

If we add the equations together, we get $\dfrac{a+b+c}{3}=\dfrac{A^2B+A^2C+B^2A+B^2C+C^2A+C^2B}{ABC}=\dfrac{43}{3}$

If we multiply them together, we get $\dfrac{abc}{27}=\dfrac{A^2B+A^2C+B^2A+B^2C+C^2A+C^2B+2ABC}{ABC}=\dfrac{43}{3}+2=\dfrac{49}{3}$

Multiplying both sides by $27$ , we get that $abc=27\cdot \dfrac{49}{3}=\boxed{441}$ .

1988 AIME (Problems • Answer Key • Resources)
Preceded by Problem 11	Followed by Problem 13
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15
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1988 AIME Problems/Problem 12

Contents

Problem

Solution 1

Solution 2

See also