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I need help solving this trig problem w/ identites. (1)/(sinx-1)+(1)/(sinx+1) A. 2cot^(2)xsecx B. sec^(2)xcsc^(2)x C. secxcosx D. 2sec^(2)x

I need help solving this trig problem w/ identites. (1)/(sinx-1)+(1)/(sinx+1) A. 2cot^(2)xsecx B. sec^(2)xcsc^(2)x C. secxcosx D. 2sec^(2)x
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I need help solving this trig problem w/ identites.

(1)/(sinx-1)+(1)/(sinx+1)

A. 2cot^(2)xsecx
B. sec^(2)xcsc^(2)x
C. secxcosx
D. 2sec^(2)x

User Kernix
by
8.1k points

1 Answer

5 votes

\bf sin^2(\theta)+cos^2(\theta)=1\implies cos^2(\theta)=1-sin^2(\theta)\\\\\\ tan(\theta)=\cfrac{sin(\theta)}{cos(\theta)}\qquad \qquad sec(\theta)=\cfrac{1}{cos(\theta)} \\\\ -------------------------------


\bf \cfrac{1}{sin(x)-1}+\cfrac{1}{sin(x)+1}\implies \cfrac{sin(x)+1~~+~~sin(x)-1}{[sin(x)-1][sin(x)+1]} \\\\\\ \cfrac{2sin(x)}{\stackrel{\textit{difference of squares}}{sin^2(x)-1^2}}\implies \cfrac{2sin(x)}{sin^2(x)-1}\implies \cfrac{2sin(x)}{-[~1-sin^2(x)~]} \\\\\\ \cfrac{2sin(x)}{-[cos^2(x)]}\implies -2\cdot \cfrac{sin(x)}{cos(x)}\cdot \cfrac{1}{cos(x)}\implies -2tan(x)sec(x)
User Nikkita
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