Prove that: sec^3 θ / (sec^2 θ - 1) + cosec^3 θ / (cosec^2 θ

Q) Prove that: $\frac{sec^3 \theta}{(\sec^2 \theta - 1)} + \frac{cosec^3 \theta}{(\cos ec^2 \theta - 1)}$ = sec θ . cosec θ (sec θ + cosec θ)

(Q 26 A – 30/2/2 – CBSE 2026 Question Paper)

Ans:

Step 1: Let’s start from LHS:

$\frac{sec^3 \theta}{(\sec^2 \theta - 1)} + \frac{cosec^3 \theta}{(\cos ec^2 \theta - 1)}$

= $\frac{\frac{1}{\cos ^3 \theta}} {(\frac{1}{\cos ^2 \theta} - 1)} + \frac{\frac{1}{\sin ^3 \theta}} {(\frac{1}{\sin ^2 \theta} - 1)}$

= $\frac{\frac{1}{\cos ^3 \theta}} {(\frac{(1 - \cos ^2 \theta)}{\cos ^2 \theta})} + \frac{\frac{1}{\sin ^3 \theta}} {(\frac{(1 - \sin ^2 \theta)}{\sin ^2 \theta})}$

= $\frac{\cos ^2 \theta}{\cos ^3 \theta (1 - \cos ^2 \theta)} + \frac{\sin ^2 \theta}{\sin ^3 \theta (1 - \sin ^2 \theta)}$

= $\frac{1}{\cos \theta (1 - \cos ^2 \theta)} + \frac{1}{\sin \theta (1 - \sin ^2 \theta)}$

Step 2: Since sin ²θ + cos ² θ = 1

∴ 1 – cos ²θ = sin ²θ and 1 – sin ²θ = cos ²θ

Step 3: By substituting these values, we get:

LHS = $\frac{1}{\cos \theta (\sin ^2 \theta)} + \frac{1}{\sin \theta (\cos ^2 \theta)}$

= $\frac{1}{\sin \theta \cos \theta} (\frac{1}{\sin \theta} + \frac{1}{\cos \theta})$

= cosec θ . sec θ (cosec θ + sec θ)

= sec θ . cosec θ (sec θ + cosec θ) = RHS

Hence Proved!

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