How do you evaluate #tan(arccos(-9/10))#?

1 Answer
maganbhai P.
Mar 25, 2018

#-sqrt19/9.#

Explanation:

We have, #color(red)((1)cos^-1(-x)=pi-cos^-1x#
#color(red)((2)tan(pi-theta)=-tantheta#
#color(red)((3)cos^-1x=tan^-1((sqrt(1-x^2)/x)#
#color(red)((4)tan(tan^-1x)=x#

#tan(cos^-1(-9/10))=tan(pi-cos^-1(9/10)).to#Apply(1)
#=-tan(cos^-1(9/10))...........to#Apply(2)
#=-tan(tan^-1(sqrt(1-(9/10)^2)/(9/10)))...to#Apply(3)
#=-tan(tan^-1(sqrt(1-(81/100))/(9/10)))#
#=-tan(tan^-1((sqrt(100-81)/10)/(9/10)))#
#=-tan(tan^-1(sqrt19/9))#

#=-sqrt19/9....to# Apply(4)

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