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प्रश्न
Prove that:
`sec((3pi)/2 - theta) sec(theta - (5pi)/2) + tan((5pi)/2 + theta) tan(theta - (5pi)/2)` = - 1
उत्तर
`sec((3pi)/2 - theta)` = sec (270° – θ) = -cosec θ
[∵ For 270° – θ change T-ratio. So add ‘co’ infront ‘sec’, it becomes ‘cosec’]
`sec(theta - (5pi)/2) = sec (- ((5pi)/2 - theta))`
`= sec ((5pi)/2 - theta)` ...[∵ sec(-θ) = θ]
= sec(450° – θ)
= sec (360° + (90° – θ))
= sec (90° – θ)
= cosec θ
[∵ For 90° – θ change in T-ratio. So add ‘co’ in front of ‘sec’ it becomes ‘cosec’]
`tan((5pi)/2 + theta)` = tan(450° + θ)
[∵ For 90° + θ, change in T-ratio. So add ‘co’ in front of ‘tan’ it becomes ‘cot’]
= tan (360° + (90° + θ))
= tan (90° + θ)
= -cot θ
`tan(theta - (5pi)/2) = tan(-((5pi)/2 - theta))`
`= - tan((5pi)/2 - theta)` ...[∵ tan(-θ) = -tan θ]
= -tan(450° – θ)
= -tan(360° + (90° – θ))
= -tan(90° – θ)
= -cot θ
LHS = `sec((3pi)/2 - theta) sec(theta - (5pi)/2) + tan((5pi)/2 + theta) tan(theta - (5pi)/2)`
= -cosec θ (cosec θ) + (-cot θ) (-cot θ)
= -cosec2 θ + cot2 θ
= -(1 + cot2 θ) + cot2 θ [∵ 1 + cot2 θ = cosec2 θ]
= -1
= RHS
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