How do you evaluate $sec^-1(sec((19pi)/10))$ ?

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How do you evaluate $sec^-1(sec((19pi)/10))$ ?

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Answer 1 · 2016-10-13T15:50:46

$sec^-1(sec((19pi)/10))=sec^-1(sec((pi)/10))=pi/10$

Explanation:

$sec^-1(sec((19pi)/10))$

Since the restriction for secant inverse is $[0,pi],y!=pi/2$ we can see that $(19pi)/10$ is in quadrant four which is out of the restriction but since secant is positive in quadrant IV we need to find the argument in quadrant I from our restriction. So the reference angle is $pi/10$ and therefore the argument in quadrant I is also $pi/10$ .

Applying the property $f^-1(f(x))=x$ we have our answer is $pi/10$

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How do you evaluate $sec^-1(sec((19pi)/10))$ ?

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