How do you evaluate $cos^-1(cos(-1/2))$ without a calculator?

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How do you evaluate $cos^-1(cos(-1/2))$ without a calculator?

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Answer 1 · 2016-10-13T21:04:26

$cos^-1(cos(-1/2))=cos^-1(cos(1/2))=1/2$

Explanation:

$cos^-1(cos(-1/2))$

Since the argument $-1/2$ is within the domain $-1<=x<=1$ we can apply the property $f^-1(f(x)=x$ and the property of even function $cos(-x)=cosx$ . Hence,

$cos^-1(cos(-1/2))=cos^-1(cos(1/2))=1/2$

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How do you evaluate $cos^-1(cos(-1/2))$ without a calculator?

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How do you evaluate cos^-1(cos(-1/2))cos^-1(cos(-1/2)) without a calculator?

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How do you evaluate $cos^-1(cos(-1/2))$ without a calculator?