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Question
Prove that:
tan2 θ + cot2 θ = sec2 θ cosec2 θ − 2
Theorem
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Solution
In the given question, we need to prove tan2 θ + cot2 θ = sec2 θ cosec2 θ − 2
Now using `tan θ = sin θ/cos θ` and `cot θ = cos θ/sin θ` in LHS, we get
`tan^2 θ + cot^2 θ = sin^2 θ/cos^2 θ + cos^2 θ/sin^2 θ`
`= (sin^4 θ + cos^4 θ)/(cos^2 θ sin^2 θ)`
`= ((sin^2 θ)^2 + (cos^2 θ)^2)/(cos^2 θ sin^2 θ)`
Further, using the identity `a^2 + b^2 = (a + b)^2 - 2ab` we get
`((sin^2 θ)^2 + (cos^2 θ)^2)/(cos^2 θ sin^2 θ) = ((sin^2 θ + cos^ θ)^2 - 2 sin^2 θ cos^2 θ)/(sin^2 θ cos^2 θ)`
`= ((1)^2 - 2sin^2 θ cos^2 θ)/(sin^2 θ cos^2 θ)`
`= 1/(sin^2 θ cos^2 θ) - (2 sin^2 θ cos^2 θ)/(sin^2 θ cos^2 θ`
`= cosec^2 θ sec^2 θ - 2`
Since L.H.S = R.H.S
Hence proved.
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