How do you find $cos(theta)$ if $sin(theta)= 3/5$ and $90 < theta < 180$ ?

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How do you find $cos(theta)$ if $sin(theta)= 3/5$ and $90 < theta < 180$ ?

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Answer 1 · 2018-03-31T05:18:12

$costheta=-4/5$

Explanation:

$90<theta<180$ implies that we are in the second quadrant, where the cosine is negative and the sine is positive. So, keep in mind, $costheta$ will be negative.

Recall the identity

$sin^2theta+cos^2theta=1$

This tells us that

$cos^2theta=1-sin^2theta -> costheta=+-sqrt(1-sin^2theta)$

In our situation, as we are in the second quadrant, $costheta=-sqrt(1-sin^2theta)$

We have $sintheta=3/5, sin^2theta=(3/5)^2=9/25$

So,

$costheta=-sqrt(1-9/25)$
$costheta=-sqrt(25/25-9/25)$

$costheta=-sqrt(16/25)=-4/5$

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How do you find $cos(theta)$ if $sin(theta)= 3/5$ and $90 < theta < 180$ ?

1 Answer

Explanation:

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How do you find $cos(theta)$ if $sin(theta)= 3/5$ and $90 < theta < 180$ ?