Question

`1/("cosec"  theta - cot theta)` = cosec θ + cot θ हे सिद्ध करा.

Answer 1

डावी बाजू = `1/("cosec"  theta - cot theta)`

= `1/("cosec"  theta - cot theta) xx ("cosec"theta + cottheta)/("cosec"theta + cottheta)`    ......[छेदाचे परिमेयकरण करून]

= `("cosec"theta + cottheta)/("cosec"^2theta - cot^2theta)`   ......[∵ (a – b)(a + b) = a² – b²]

= `("cosec"theta + cottheta)/1`    ......`[(∵ 1 + cot^2θ = "cosec"^2θ),(∴ "cosec"^2θ - cot^2θ = 1)]`

= cosecθ + cotθ

= उजवी बाजू 

∴ `1/("cosec"  theta - cot theta)` = cosec θ + cot θ