Proving (\sec^2 x+\tan^2 x)(\csc^2 x+\cot^2 x)=1+2\sec^2 x \csc^2 x and

Adrian Cervantes

Adrian Cervantes

Answered question

2022-01-28

Proving (sec2x+tan2x)(csc2x+cot2x)=1+2sec2xcsc2x and cosx1tanx+sinx1cotx=sinx+cosx

Answer & Explanation

enguinhispi

enguinhispi

Beginner2022-01-29Added 15 answers

(i)
(sec2x+tan2x)(csc2x+cot2x)
(sec2xcsc2x+tan2xcsc2x+sec2xcot2x+tan2xcot2x)
(sec2xcsc2x+sin2xcos2xsin2x+cos2xcos2xsin2x+1)
(sec2xcsc2x+1cos2x+1sin2x+1)
(sec2xcsc2x+sin2x+cos2xcos2xsin2x+1)
(sec2xcsc2x+1cos2xsin2x+1)
(sec2xcsc2x+sec2xcsc2x+1)
(1+2sec2xcsc2x)
(ii)
cosx1tanx+sinx1cotx
cosx(1cotx)+sinx(1tanx)(1tanx)(1cotx)
cos2xsinxcosxcos2x+sin2xcosxsinxsin2xsinxcosx(1tanx)(1cotx)

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