How do you evaluate #cos(sin^-1(sqrt2/2))#?

1 Answer
Bdub
Oct 13, 2016

#cos(sin^-1(sqrt2/2))=sqrt2/2#

Explanation:

#cos(sin^-1(sqrt2/2))#

The restriction for the range of arcsin x is #[-pi/2,pi/2]#. Since the argument is positive it means that our triangle is in quadrant I with opposite side 1 and hypotenuse #sqrt 2# and hence the adjcent is also 1. Remember that we don't need to know the angle let's just call it #theta# then we need to find the ratio for #cos theta# which is
#cos theta=a/h = 1/sqrt2 = sqrt2/2#

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