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Find the measure of angle A using the Law of Cosines. Picture is not drawn to scale A= Round at least one decimal place .

Find the measure of angle A using the Law of Cosines. Picture is not drawn to scale-example-1
User AbrahamB
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1 Answer

10 votes
10 votes

The Law of Cosines tells us that, given any triangle ABC:

Then:


a^2=b^2+c^2-2bc\cos(A)

In this case:

a = 21

b = 23

c = 17

By the Law of Cosines:


21^2=23^2+17^2-2\cdot23\cdot17\cdot\cos(A)

And solve:


\begin{gathered} 441=529+289-782\cos(A) \\ . \\ 441-818=-782\cos(A) \\ . \\ (-377)/(-782)=\cos(A) \end{gathered}

Now we can apply arc cosine on both sides:


A=\cos^(-1)((377)/(782))\approx61.1775

The answer is, to one accurate decimal place:

A = 61.18 degrees.

Find the measure of angle A using the Law of Cosines. Picture is not drawn to scale-example-1
User Jjnevis
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