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Q) Prove that : \frac{\tan A}{(1 + \sec A)} - \frac{\tan A}{(1 - \sec A)} = 2 \cos ec A

(Q 26 B – 30/1/3 – CBSE 2026 Question Paper)

Ans: 

Step 1: Let’s start from LHS:

LHS = \frac{\tan A}{(1 + \sec A)} - \frac{\tan A}{(1 - \sec A)}

\frac{\tan A (1 - \sec A) - \tan A (1 + \sec A)}{(1 + \sec A)(1 - \sec A)}

= \frac{(\tan A - \tan A \sec A - \tan A - \tan A \sec A)}{(1 - \sec^2 A)}

= \frac{(\cancel{\tan A} - \tan A \sec A - \cancel{\tan A} - \tan A \sec A)}{(1 - \sec^2 A)}

= \frac{(- 2 \tan A \sec A)}{(1 - \sec^2 A)}

= \frac{(2 \tan A \sec A)}{(\sec^2 A - 1)}

Step 2: Since 1 + tan 2 A = sec 2 A

∴ sec 2 A – 1 = tan 2 A

Step 3: By substituting this value from step 2 in LHS, we get:

LHS = \frac{(2 \tan A \sec A)}{(\sec^2 A - 1)}

= \frac{(2 \tan A \sec A)}{(\tan ^2 A)}

= \frac{(2 \sec A)}{(\tan A)}

= \frac{(\frac{2}{\cos A})}{(\frac{\sin A}{\cos A})}

= \frac{(2 \cos A)}{(\sin A \cos A)}

= \frac{(2 \cancel{\cos A})}{(\sin A \cancel{\cos A})}

= \frac{2}{\sin A}

= 2 cosec A = RHS

Hence Proved!

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