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Question
If tan−1 `((sqrt(1 + x^2) − sqrt(1 − x^2))/(sqrt(1 + x^2) + sqrt(1 − x^2)))` = α, prove that sin 2 α = x2.
Theorem
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Solution
Let x2 = cos 2 θ
tan−1 `((sqrt(1 + cos 2 θ) − sqrt(1 − cos 2 θ))/(sqrt(1 + cos 2 θ) + sqrt(1 − cos 2 θ)))` = α
tan−1 `((cos θ − sin θ)/(cos θ − sin θ))`
= tan−1 `((1 − tan θ)/(1 + tan θ))`
= tan−1 `(tan(π/4 − θ))`
`π/4` − θ = α
`π/2 − 2θ = 2α`
sin`(π/2 − 2θ) = sin 2 α`
cos 2 θ = sin 2 α
x2 = sin 2 α
Hence Proved
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