2022 AMC 10A Problem 5

Below is the professionally curated solution for Problem 5 of the 2022 AMC 10A, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2022 AMC 10A solutions, or check the answer key.

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Concepts:square (geometry)special right trianglerationalizing denominator

Difficulty rating: 1540

5.

Square ABCDABCD has side length 1.1. Points P,P, Q,Q, R,R, and SS each lie on a side of ABCDABCD such that APQCRSAPQCRS is an equilateral convex hexagon with side length s.s. What is s?s?

23\dfrac{\sqrt{2}}{3}

12\dfrac{1}{2}

222 - \sqrt{2}

1241 - \dfrac{\sqrt{2}}{4}

23\dfrac{2}{3}

Solution:

Consider the diagram:

Since AP=QC=s,AP = QC = s, we know that PB=PQ.PB = PQ. This shows that PBQ\triangle PBQ is a right triangle. Using the Pythagorean theorem, we get that PB=s2.PB = \dfrac{s}{\sqrt{2}}.

We also know that 1=AB=AP+PB=s+s2. 1 = AB = AP + PB = s + \dfrac{s}{\sqrt{2}}.

This equation simplifies to 1=(1+12)s 1 = (1 + \dfrac{1}{\sqrt{2}})s Which implies that s=11+12=22+1. s = \dfrac{1}{1 + \dfrac{1}{\sqrt{2}}} = \dfrac{\sqrt{2}}{\sqrt{2} + 1}.

We can rationalize this fraction to get

22+12121=22. \dfrac{\sqrt{2}}{\sqrt{2} + 1} \cdot \dfrac{\sqrt{2} - 1}{\sqrt{2} - 1} = 2 - \sqrt{2}.

Thus, C is the correct answer.

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