Difference between revisions of "2000 AIME I Problems/Problem 4"

Revision as of 14:31, 24 November 2007

Problem

The diagram shows a rectangle that has been dissected into nine non-overlapping squares. Given that the width and the height of the rectangle are relatively prime positive integers, find the perimeter of the rectangle.

$[asy]draw((0,0)--(69,0)--(69,61)--(0,61)--(0,0));draw((36,0)--(36,36)--(0,36)); draw((36,33)--(69,33));draw((41,33)--(41,61));draw((25,36)--(25,61)); draw((34,36)--(34,45)--(25,45)); draw((36,36)--(36,38)--(34,38)); draw((36,38)--(41,38)); draw((34,45)--(41,45));[/asy]$

Solution

Call the length $l$ and the width $w$ . Call the squares' side lengths from smallest to largest $a_1,\ldots,a_9$ .

The picture shows that $a_1_+a_2= a_3$ (Error compiling LaTeX. Unknown error_msg), $a_1 + a_3 = a_4$ , $a_3 + a_4 = a_5$ , $a_4 + a_5 =$ , $a_2 + a_3 + a_5 = a_7$ , $a_2 + a_7 = a_8$ , $a_1 + a_4 + a_6 = a_9$ , and $a_6 + a_9 = a_7 + a_8$ .

With a lot of algebra, $a_9 = 36$ , $a_6=25$ , $a_8 = 33$ , $l=61,w=69$ , and the perimeter is $2(61)+2(69)=\boxed{398}$ .

Revision as of 14:30, 24 November 2007 (view source) Temperal (talk \| contribs) (solution) ← Older edit		Revision as of 14:31, 24 November 2007 (view source) Temperal (talk \| contribs) (oops, forgot those variables) Newer edit →
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	The picture shows that <math>a_1_+a_2= a_3</math>, <math>a_1 + a_3 = a_4</math>, <math>a_3 + a_4 = a_5</math>, <math>a_4 + a_5 =</math>, <math>a_2 + a_3 + a_5 = a_7</math>, <math>a_2 + a_7 = a_8 </math>,<math> a_1 + a_4 + a_6 = a_9 </math>, and <math>a_6 + a_9 = a_7 + a_8</math>.		The picture shows that <math>a_1_+a_2= a_3</math>, <math>a_1 + a_3 = a_4</math>, <math>a_3 + a_4 = a_5</math>, <math>a_4 + a_5 =</math>, <math>a_2 + a_3 + a_5 = a_7</math>, <math>a_2 + a_7 = a_8 </math>,<math> a_1 + a_4 + a_6 = a_9 </math>, and <math>a_6 + a_9 = a_7 + a_8</math>.

−	With a '''lot''' of algebra, <math>a_9 = 36</math>, <math>a_6=25</math>, <math>a_8 = 33</math>, and the perimeter is <math>2(61)+2(69)=\boxed{398}</math>.	+	With a '''lot''' of algebra, <math>a_9 = 36</math>, <math>a_6=25</math>, <math>a_8 = 33</math>, <math>l=61,w=69</math>, and the perimeter is <math>2(61)+2(69)=\boxed{398}</math>.

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Difference between revisions of "2000 AIME I Problems/Problem 4"

Revision as of 14:31, 24 November 2007

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