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Given that sin A= -4 over 5 and angle A is in quadrant 3, what is the value of cos(2A)?

User Yat Fei Leong
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1 Answer

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11 votes

Solution:

Given;


\sin(A)=-(4)/(5)

Then, the value of cosine x is;


\cos(A)=-(3)/(5)

Because cosine and sine are negative on the third quadrant.

Then;


\begin{gathered} \cos(2A)=\cos^2(A)-\sin^2(A) \\ \\ \cos(2A)=(-(3)/(5))^2-(-(4)/(5))^2 \\ \\ \cos(2A)=(9)/(25)-(16)/(25) \\ \\ \cos(2A)=-(7)/(25) \end{gathered}

User Thenoseman
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