How do you simplify $cos (theta – 2pi)$ ?

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How do you simplify $cos (theta – 2pi)$ ?

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Answer 1 · 2016-01-31T22:53:54

$cos(theta)$

Explanation:

Use the cosine angle subtraction formula:

$cos(alpha-beta)=cos(alpha)cos(beta)+sin(alpha)sin(beta)$

When applied to $cos(theta-2pi)$ , we get

$cos(theta-2pi)=cos(theta)cos(2pi)+sin(theta)sin(2pi)$

Simplify, knowing that $cos(2pi)=1$ and $sin(2pi)=0$ .

$cos(theta-2pi)=cos(theta)xx1+sin(theta)xx0$

$cos(theta-2pi)=cos(theta)$

This should make sense. Since $2pi$ is one revolution around the unit circle, the angles $theta$ and $theta-2pi$ are in the exact same locations, so $cos(theta)=cos(theta-2pi)$ .

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How do you simplify $cos (theta – 2pi)$ ?

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