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AIME 1998 · 第 6 题

AIME 1998 — Problem 6

专题
Contest Math
难度
L4
来源
AIME

题目详情

Problem

Let ABCDABCD be a parallelogram. Extend DA\overline{DA} through AA to a point P,P, and let PC\overline{PC} meet AB\overline{AB} at QQ and DB\overline{DB} at R.R. Given that PQ=735PQ = 735 and QR=112,QR = 112, find RC.RC.

解析

Solution

Solution 1

AIME diagram

There are several similar triangles. PAQPDC\triangle PAQ\sim \triangle PDC, so we can write the proportion:

AQCD=PQPC=735112+735+RC=735847+RC\frac{AQ}{CD} = \frac{PQ}{PC} = \frac{735}{112 + 735 + RC} = \frac{735}{847 + RC}

Also, BRQDRC\triangle BRQ\sim DRC, so:

QRRC=QBCD=112RC=CDAQCD=1AQCD\frac{QR}{RC} = \frac{QB}{CD} = \frac{112}{RC} = \frac{CD - AQ}{CD} = 1 - \frac{AQ}{CD} AQCD=1112RC=RC112RC\frac{AQ}{CD} = 1 - \frac{112}{RC} = \frac{RC - 112}{RC}

Substituting,

AQCD=735847+RC=RC112RC\frac{AQ}{CD} = \frac{735}{847 + RC} = \frac{RC - 112}{RC}

735RC=(RC+847)(RC112)735RC = (RC + 847)(RC - 112) 0=RC21128470 = RC^2 - 112\cdot847

Thus, RC=112847=308RC = \sqrt{112*847} = 308.

Solution 2

We have BRQDRC\triangle BRQ\sim \triangle DRC so 112RC=BRDR\frac{112}{RC} = \frac{BR}{DR}. We also have BRCDRP\triangle BRC \sim \triangle DRP so RC847=BRDR\frac{ RC}{847} = \frac {BR}{DR}. Equating the two results gives 112RC=RC847\frac{112}{RC} = \frac{ RC}{847} and so RC2=112847RC^2=112*847 which solves to RC=308RC=\boxed{308}