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How do you simplify #(cos theta csc theta)/tantheta#?

1 Answer

Jul 28, 2015

Use the following:
#csctheta=1/sintheta#

#tantheta=sintheta/costheta#

Explanation:

#(cos theta csc theta)/tantheta=((costheta)*1/sintheta)/(sintheta/costheta)#

#=costheta/sintheta*(costheta/sintheta)=(costheta)^2/(sintheta)^2=(costheta/sintheta)^2=(cottheta)^2=color(blue)(cot^2(theta))#

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