How do you evaluate #cos^-1(cos ((9pi)/8))#?

1 Answer
Bdub
Oct 12, 2016

#cos^-1(cos((9pi)/8))=cos^-1(cos((7pi)/8))=(7pi)/8#

Explanation:

Since the restriction for #cos^-1x# is # [0,pi], (9pi)/8# is in quadrant three and cosine is negative in quadrant three. So we need to find the reference angle which is #(9pi)/8-pi=pi/8#. Hence the argument x in quadrant II is# (7pi)/8 # since cosine is negative in quadrant two from the restriction. Lastly, use the property #f^-1(f(x)=x# so

#cos^-1(cos((9pi)/8))=cos^-1(cos((7pi)/8))=(7pi)/8#

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