What does $arccos(cos ((-2pi)/3))$ equal?

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What does $arccos(cos ((-2pi)/3))$ equal?

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Answer 1 · 2015-12-24T07:17:42

$(2pi)/3$

Explanation:

It would look strange how is that possible! A question usually which pops up isn't $arccos(cos(A)) = A$ .

To understand this we can use $cos(-theta) = cos(theta)$
Therefore $cos(-(2pi)/3) = cos((2pi)/3)$

Following it up with $arccos(cos(-(2pi)/3)) = arccos(cos((2pi)/3))$

That leads us to our answer $(2pi)/3$ .

Let us understand the same in a different manner.
The range of $arccos(x)$ is $[0, pi]$ .
$cos((-2pi)/3) = -1/2$

The angle $(-2pi)/3$ is not in the range of the function. So we select the angle in the range $[0,pi]$ which gives cos(x) = -1/2 that works out to $(2pi)/3$ .

Hope this clears your doubt.

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What does $arccos(cos ((-2pi)/3))$ equal?

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