Difference between revisions of "2017 AIME I Problems/Problem 6"

Revision as of 17:51, 8 March 2021

Problem 6

A circle is circumscribed around an isosceles triangle whose two congruent angles have degree measure $x$ . Two points are chosen independently and uniformly at random on the circle, and a chord is drawn between them. The probability that the chord intersects the triangle is $\frac{14}{25}$ . Find the difference between the largest and smallest possible values of $x$ .

Solution

The probability that the chord doesn't intersect the triangle is $\frac{11}{25}$ . The only way this can happen is if the two points are chosen on the same arc between two of the triangle vertices. The probability that a point is chosen on one of the arcs opposite one of the base angles is $\frac{x}{180}$ , and the probability that a point is chosen on the arc between the two base angles is $\frac{180-2x}{180}$ . Therefore, we can write $2\left(\frac{x}{180}\right)^2+\left(\frac{180-2x}{180}\right)^2=\frac{11}{25}$ This simplifies to $x^2-120x+3024=0$ Which factors as $(x-84)(x-36)=0$ So $x=84, 36$ . The difference between these is $\boxed{048}$ .

Note:

We actually do not need to spend time factoring $x^2 - 120x + 3024$ . Since the problem asks for $|x_1 - x_2|$ , where $x_1$ and $x_2$ are the roots of the quadratic, we can utilize Vieta's by noting that $(x_1 - x_2) ^ 2 = (x_1 + x_2) ^ 2 - 4x_1x_2$ . Vieta's gives us $x_1 + x_2 = 120,$ and $x_1x_2 = 3024.$ Plugging this into the above equation and simplifying gives us $(x_1 - x_2) ^ 2 = 2304,$ or $|x_1 - x_2| = 48$ .

Our answer is then $\boxed{048}$ .

Solution 2 (Not Complementary Counting method)

Because we know that we have an isosceles triangle with angles of $x$ (and we know that x is an inscribed angle), that means that the arc that is intercepted by this angle is $2x$ . We form this same conclusion for the other angle $x$ , and $180-2x$ . Therefore we get $3$ arcs, namely, $2x$ , $2x$ , and $360-4x$ . To have the chords intersect the triangle, we need the two points selected (to make a chord) to be on completely different arcs. An important idea to understand is that order matters in this case, so we have the equation $2$ * $\frac{2x}{360}$ * $\frac{2x}{360}$ + $2$ * $2$ * $\frac{2x}{360}$ * $\frac{360-4x}{360}$ = $\frac{14}{25}$ which using trivial algebra gives you $x^2-120x+3024$ and factoring gives you $(x-84)(x-36)$ and so your answer is $\boxed{048}$ . ~jske25

Video Solution

https://youtu.be/Mk-MCeVjSGc?t=690 ~Shreyas S

@@ Line 15: / Line 15: @@
 Our answer is then <math>\boxed{048}</math>.
+==Solution 2 (Not Complementary Counting method)==
+Because we know that we have an isosceles triangle with angles of <math>x</math> (and we know that x is an inscribed angle), that means that the arc that is intercepted by this angle is <math>2x</math>. We form this same conclusion for the other angle <math>x</math>, and <math>180-2x</math>. Therefore we get <math>3</math> arcs, namely, <math>2x</math>, <math>2x</math>, and <math>360-4x</math>. To have the chords intersect the triangle, we need the two points selected (to make a chord) to be on completely different arcs. An important idea to understand is that order matters in this case, so we have the equation <math>2</math> * <math>\frac{2x}{360}</math> * <math>\frac{2x}{360}</math> + <math>2</math> * <math>2</math> * <math>\frac{2x}{360}</math> * <math>\frac{360-4x}{360}</math> = <math>\frac{14}{25}</math> which using trivial algebra gives you <math>x^2-120x+3024</math> and factoring gives you <math>(x-84)(x-36)</math> and so your answer is <math>\boxed{048}</math>.
+~jske25
 ==Video Solution==

2017 AIME I (Problems • Answer Key • Resources)
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