2016 AMC 12A Problem 9

Below is the professionally curated solution for Problem 9 of the 2016 AMC 12A, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2016 AMC 12A solutions, or check the answer key.

All of the real AMC 8, AMC 10, AMC 12, and AIME problems in our complete solution collection are used with official legal permission of the Mathematical Association of America (MAA).

Concepts:diagonalrationalizing denominator

Difficulty rating: 1510

9.

The five small shaded squares inside this unit square are congruent and have disjoint interiors. The midpoint of each side of the middle square coincides with one of the vertices of the other four small squares as shown. The common side length is a2b,\dfrac{a-\sqrt{2}}{b}, where aa and bb are positive integers. What is a+b?a+b?

77

88

99

1010

1111

Solution:

Let xx be the common side length. The diagonal of the unit square has length 2\sqrt{2} and consists of two small-square diagonals (each x2x\sqrt2) plus one small-square side length x,x, so 2x2+x=2. 2x\sqrt2+x=\sqrt2.

Solving, x=222+1=2(221)(22+1)(221)=427. x=\dfrac{\sqrt2}{2\sqrt2+1}=\dfrac{\sqrt2\,(2\sqrt2-1)}{(2\sqrt2+1)(2\sqrt2-1)}=\dfrac{4-\sqrt2}{7}. Thus a=4,a=4, b=7,b=7, and a+b=11.a+b=11.

Thus, the correct answer is E.

Problem 9 in Other Years