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Talk:2021 Fall AMC 10A Problems/Problem 7

Revision as of 21:44, 22 November 2021 by MRENTHUSIASM (talk | contribs) (Created page with "==Solution 2== Note that <math>\angle ADC = 90</math>, meaning that the reflex of <math>\angle ADE = 90+110=200^\circ</math>, so <math>\angle ADE = 360-200=160^\circ</math>. I...")
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Solution 2

Note that $\angle ADC = 90$, meaning that the reflex of $\angle ADE = 90+110=200^\circ$, so $\angle ADE = 360-200=160^\circ$. It is given that $\triangle DEF$ has two sides of equal length, so it is isosceles, thus having two congruent angles.

The sum of these two angles is $180-160=20^\circ$, so the measure of both $\angle DFE$ and angle $\angle FED$ is $10^\circ$. Since $\angle AFE$ is the supplement to $\angle DFE$, and $\angle DFE = 10^\circ$, $\angle AFE = 180-10 = \boxed{\textbf{(D)}170}$ degrees.

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