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Question
Prove that `sin θ/(1 + cos θ) + (1 + cos θ)/sin θ = 2 "cosec" θ`.
Theorem
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Solution
L.H.S. = `sin θ/(1 + cos θ) + (1 + cos θ)/sin θ`
= `(sin^2θ + (1 + cosθ)^2)/(sinθ(1 + cos θ))`
= `(sin^2θ + 1 + cos^2θ + 2 cos θ)/(sinθ(1 + cosθ))`
= `(2 + 2 cos θ)/(sinθ(1 + cos θ)` ...(∵ sin2 θ + cos2 θ = 1)
= `(2(1 + cos θ))/(sin θ(1 + cos θ))`
= `2/sin θ`
= 2 cosec θ
L.H.S. = R.H.S.
Hence proved.
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