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Sin(theta)=2/3 and theta is in quadrant II, find cos theta
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Sin(theta)=2/3 and theta is in quadrant II, find cos theta

Sin(theta)=2/3 and theta is in quadrant II, find cos theta-example-1
User Denys Denysiuk
by
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1 Answer

3 votes

Answer: Choice C.
\displaystyle \boldsymbol{-(√(5))/(3)}

===================================================

Work Shown:

Part 1


\sin^2(\theta)+\cos^2(\theta) = 1\\\\\cos^2(\theta) = 1-\sin^2(\theta)\\\\\cos(\theta) = -√(1-\sin^2(\theta)) \ \ \text{ ..... cosine is negative in Q2}\\\\\cos(\theta) = -\sqrt{1-\left((2)/(3)\right)^2}\\\\\\cos(\theta) = -\sqrt{1-(4)/(9)}\\\\

Part 2


\cos(\theta) = -\sqrt{(9)/(9)-(4)/(9)}\\\\\cos(\theta) = -\sqrt{(9-4)/(9)}\\\\\cos(\theta) = -\sqrt{(5)/(9)}\\\\\cos(\theta) = -(√(5))/(√(9))\\\\\cos(\theta) = -(√(5))/(3)\\\\

User Wawa Loo
by
7.9k points
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