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प्रश्न
Prove that:
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उत्तर
L.H.S = \[\sec^4 A\left( 1 - \sin^4 A \right) - 2 \tan^2 A\]
\[ = \sec^4 A - \sec^4 A \sin^4 A - 2 \tan^2 A\]
= `(sec^2A)^2 - 1/(cos^4A). sin^4A - 2tan^2A ...[secθ = 1/cosθ]`
= `(1 + tan^2A)^2 - (sin^4A)/(cos^4A) - 2 tan^2A ...[1 + tan^2θ = sec^2θ]`
= `1^2 + 2 xx 1 xx tan^2A + (tan^2A)^2 - tan^4A - 2tan^2A ...[(a + b)^2 = a^2 + 2ab + b^2 tanθ = (sinθ)/(cosθ)]`
= `1 + cancel(2tan^2A) + cancel(tan^4A) - cancel(tan^4A) - cancel(2tan^2A)`
= 1
= R.H.S
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Proof: L.H.S. = (sec θ – cos θ) (cot θ + tan θ)
= `(1/square - cos θ) (square/square + square/square)` ......`[∵ sec θ = 1/square, cot θ = square/square and tan θ = square/square]`
= `((1 - square)/square) ((square + square)/(square square))`
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= `square/(square square)`
= tan θ.sec θ
= R.H.S.
∴ L.H.S. = R.H.S.
∴ (sec θ – cos θ) (cot θ + tan θ) = tan θ.sec θ
