Difference between revisions of "Mock Geometry AIME 2011 Problems/Problem 6"
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The problem asks for the probability that point <math>P</math> is inside an equilateral triangle <math>A_1B_1C_1</math>. Let <math>x</math>, <math>y</math>, and <math>z</math> be the three distances from point <math>P</math> to each of the vertices, with <math>x</math> being the longest distance. Let's consider the case in which point <math>P</math> is actually on the line: | The problem asks for the probability that point <math>P</math> is inside an equilateral triangle <math>A_1B_1C_1</math>. Let <math>x</math>, <math>y</math>, and <math>z</math> be the three distances from point <math>P</math> to each of the vertices, with <math>x</math> being the longest distance. Let's consider the case in which point <math>P</math> is actually on the line: | ||
<asy> | <asy> | ||
− | unitsize( | + | unitsize(0.75cm); |
draw((0,4*sqrt(3))--(8,4*sqrt(3))); | draw((0,4*sqrt(3))--(8,4*sqrt(3))); | ||
draw((0,4*sqrt(3))--(4,0)); | draw((0,4*sqrt(3))--(4,0)); | ||
Line 11: | Line 11: | ||
draw((6,4*sqrt(3))--(4,0)); | draw((6,4*sqrt(3))--(4,0)); | ||
label("$x$",(5,2sqrt(3)),NNW); | label("$x$",(5,2sqrt(3)),NNW); | ||
− | + | label("$y$", (3,0),N) | |
+ | label("$z$", (7,0),N) | ||
</asy> | </asy> |
Revision as of 20:33, 7 July 2019
Problem
Three points are chosen at random on a circle. The probability that there exists a point
inside an equilateral triangle
such that
can be expressed in the form
where
are relatively prime positive integers. Find
Solution
The problem asks for the probability that point is inside an equilateral triangle
. Let
,
, and
be the three distances from point
to each of the vertices, with
being the longest distance. Let's consider the case in which point
is actually on the line:
unitsize(0.75cm); draw((0,4*sqrt(3))--(8,4*sqrt(3))); draw((0,4*sqrt(3))--(4,0)); draw((8,4*sqrt(3))--(4,0)); draw((6,4*sqrt(3))--(4,0)); label("$x$",(5,2sqrt(3)),NNW); label("$y$", (3,0),N) label("$z$", (7,0),N) (Error making remote request. Unknown error_msg)