2014 AMC 10B Problem 19

Below is the professionally curated solution for Problem 19 of the 2014 AMC 10B, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2014 AMC 10B solutions, or check the answer key.

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Concepts:geometric probabilitychordtangent line

Difficulty rating: 1600

19.

Two concentric circles have radii 11 and 2.2. Two points on the outer circle are chosen independently and uniformly at random. What is the probability that the chord joining the two points intersects the inner circle?

 16 \ \dfrac{1}{6}

 14 \ \dfrac{1}{4}

 222 \ \dfrac{2-\sqrt{2}}{2}

 13 \ \dfrac{1}{3}

 12 \ \dfrac{1}{2}

Solution:

First, without loss of generality, we could choose some point on the outer circle. Then, the second point can be chosen in a region on the other circle.

This region is such that it has a line that intersects the circle, so the edge of the region is such that the chord is perpendicular with the inner circle.

If we look at the angle at the center, we can see that it has 2 right triangles where the adjacent side is 11 and the hypotenuse is 2,2, making cos(θ2)=12.\cos \left(\dfrac \theta 2\right) = \dfrac 12.

Thus, θ2=60,\dfrac \theta 2 = 60^\circ, making θ=120.\theta = 120 ^\circ .

Therefore, the probability is 120360=13.\dfrac {120^\circ}{360^\circ} = \dfrac 13 .

Thus, the correct answer is D .

Problem 19 in Other Years