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Given ∆ABC with Angle B = 84°, C = 32° and Side BC = 25. Find AC. Round to nearest integer
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Given ∆ABC with Angle B = 84°, C = 32° and Side BC = 25. Find AC. Round to nearest integer

User Camilo Abboud
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1 Answer

5 votes

First, we have to make a diagram to visualize the problem.

First, we find angle A using the interior angle theorem.


\begin{gathered} A+B+C=180 \\ A+84+32=180 \\ A=180-84-32 \\ A=64 \end{gathered}

Then, we use the law of sines.


\begin{gathered} (AC)/(\sin84)=(BC)/(\sin A) \\ (AC)/(\sin84)=(25)/(\sin 64) \\ AC=(25\cdot\sin 84)/(\sin 64)_{} \\ AC\approx28 \end{gathered}

Therefore, AC is 28 units long.

Given ∆ABC with Angle B = 84°, C = 32° and Side BC = 25. Find AC. Round to nearest-example-1
User Ward Segers
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