2018 AMC 12A Problem 20

Below is the professionally curated solution for Problem 20 of the 2018 AMC 12A, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2018 AMC 12A solutions, or check the answer key.

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Concepts:cyclic quadrilaterallaw of cosinestriangle area

Difficulty rating: 2110

20.

Triangle ABCABC is an isosceles right triangle with AB=AC=3.AB = AC = 3. Let MM be the midpoint of hypotenuse BC.\overline{BC}. Points II and EE lie on sides AC\overline{AC} and AB,\overline{AB}, respectively, so that AI>AEAI \gt AE and AIMEAIME is a cyclic quadrilateral. Given that triangle EMIEMI has area 2,2, the length CICI can be written as abc,\tfrac{a - \sqrt{b}}{c}, where a,a, b,b, and cc are positive integers and bb is not divisible by the square of any prime. What is the value of a+b+c?a + b + c?

99

1010

1111

1212

1313

Solution:

Since ABC\triangle ABC is an isosceles right triangle, CM=BM=322CM = BM = \tfrac32 \sqrt2 and the base angles at B,CB, C are 45.45^\circ. As AIMEAIME is cyclic with right angle at A,A, angle IME=90.\angle IME = 90^\circ. Let x=CIx = CI and y=BE.y = BE. By the Law of Cosines in MCI,\triangle MCI, IM2=x2+922x322cos45=x23x+92, IM^2 = x^2 + \tfrac92 - 2 \cdot x \cdot \tfrac32\sqrt2 \cdot \cos 45^\circ = x^2 - 3x + \tfrac92, and similarly ME2=y23y+92.ME^2 = y^2 - 3y + \tfrac92.

The Pythagorean Theorem in right triangles EMIEMI and IAEIAE gives IM2+ME2=(3x)2+(3y)2,IM^2 + ME^2 = (3-x)^2 + (3-y)^2, which simplifies to x+y=3.x + y = 3. The area condition 12IMME=2\tfrac12 IM \cdot ME = 2 means IM2ME2=16.IM^2 \cdot ME^2 = 16. Substituting y=3xy = 3 - x makes ME2=x23x+92=IM2,ME^2 = x^2 - 3x + \tfrac92 = IM^2, so (x23x+92)2=16,\left(x^2 - 3x + \tfrac92\right)^2 = 16, hence x23x+92=4,x^2 - 3x + \tfrac92 = 4, i.e. x23x+12=0.x^2 - 3x + \tfrac12 = 0.

Since AI>AEAI \gt AE forces y>x,y \gt x, we take the smaller root x=372.x = \tfrac{3 - \sqrt{7}}{2}. Then a+b+c=3+7+2=12.a + b + c = 3 + 7 + 2 = 12.

Thus, the correct answer is D.

Problem 20 in Other Years