Prove that #sec^2x/(sec^2x-1)=csc^2x#?

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Answer 1 · 2017-03-20T13:43:19

Please see below.

#sec^2x/(sec^2x-1)#

= #sec^2x/tan^2x#

= #(1/cos^2x)/(sin^2x/cos^2x)#

= #1/cos^2x xx cos^2x/sin^2x#

= #1/cancel(cos^2x) xx cancel(cos^2x)/sin^2x#

= #1/sin^2x#

= #csc^2x#