Question #422ca

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Answer 1 · 2017-02-23T18:13:35

Factor the numerator. Use #tan^2x+1 = sec^2x# in the denominator. Finish by simplifying the quotient.

Answer 2 · 2017-02-23T18:23:19

See full proof below

I will assume you are trying to prove:

#(1-2secx-3sec^2x)/(-tan^2x)-=(1-3secx)/(1-secx)#

When proving trigonometric identities, it is sometimes wiser to start from the right-hand side and prove the left.

#(1-3secx)/(1-secx)=((1-3secx)(1+secx))/((1-secx)(1+secx))=#

#(1-3secx+secx-3sec^2x)/(1-sec^2x)=#

# (1-2secx-3sec^2x)/(-tan^2x)=#

# (3sec^2x+2secx-1)/(tan^2x)#

The final step is not needed, but adding it makes the whole expression look neater and removes the negatives.