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16 votes
16 votes
Please prove that


sec^(2) \beta - cosec^(2) = (tan \beta + cot \beta) * (tan \beta - cot \beta)

User Daniel Hollands
by
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2 Answers

24 votes
24 votes


sec^2\beta -csc^2\beta \\(1+tan^2\beta )-(1+cot^2\beta )\\1+tan^2\beta -1-cot^2\beta \\tan^2\beta -cot^2\beta \\(tan\beta -cot\beta )(tan\beta +cot\beta )

User Rishi Dua
by
2.9k points
22 votes
22 votes

Recall the Pythagorean identity.


\sin^2(x) + \cos^2(x) = 1 \implies \left\langle \begin{matrix} \tan^2(x) + 1 = \sec^2(x) \\ 1 + \cot^2(x) = \csc^2(x) \end{matrix} \right.


\implies \sec^2(\beta) - \csc^2(\beta) = (\tan^2(\beta) + 1) - (1 + \cot^2(\beta)) \\\\ ~~~~~~~~= \tan^2(\beta) - \cot^2(\beta)

Recall the difference of squares identity.


a^2 - b^2 = (a - b) (a + b)


\implies \sec^2(\beta) - \csc^2(\beta) = (\tan(\beta) - \cot(\beta)) (\tan(\beta) + \cot(\beta))

User Nitseg
by
3.3k points
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