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प्रश्न
`1/(1 - sinθ) + 1/(1 + sinθ)` = 2sec2θ
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उत्तर
डावी बाजू = `1/(1 - sinθ) + 1/(1 + sinθ)`
= `((1 + sinθ) + (1 - sinθ))/((1 - sinθ)(1 + sinθ))`
= `(1 + sinθ + 1 - sinθ)/((1 - sinθ)(1 + sinθ))`
= `2/(1 - sin^2θ)`
= `2/cos^2θ` .....[∵ 1 - sin2θ = cos2θ]
= `2 xx 1/cos^2θ`
= 2sec2θ
= उजवी बाजू
∴ `1/(1 - sinθ) + 1/(1 + sinθ)` = 2sec2θ
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संबंधित प्रश्न
cos2θ(1 + tan2θ) = 1
(sec θ - cos θ)(cot θ + tan θ) = tan θ sec θ
`tanθ/(secθ - 1) = (tanθ + secθ + 1)/(tanθ + secθ - 1)`
cosec θ.`sqrt(1 - cos^2theta) = 1` हे सिद्ध करा.
(sec θ + tan θ) . (sec θ – tan θ) = ?
जर 3 sin θ = 4 cos θ, तर sec θ = ?
`(cos^2theta)/(sintheta) + sintheta` = cosec θ हे सिद्ध करा.
cot θ + tan θ = cosec θ × sec θ, हे सिद्ध करण्यासाठी खालील कृती पूर्ण करा.
कृती:
डावी बाजू = `square`
= `square/sintheta + sintheta/costheta`
= `(cos^2theta + sin^2theta)/square`
= `1/(sintheta*costheta)` ......`[cos^2theta + sin^2theta = square]`
= `1/sintheta xx 1/square`
= `square`
= उजवी बाजू
`(cot "A" + "cosec A" - 1)/(cot"A" - "cosec A" + 1) = (1 + cos "A")/"sin A"` हे सिद्ध करा.
दाखवा की: `tanA/(1 + tan^2 A)^2 + cotA/(1 + cot^2A)^2` = sinA × cosA.
