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प्रश्न
If `cos^-1 x/2 + cos^-1 y/3 = θ`, then prove that 9x2 – 12xy cos θ + 4y2 = 36 sin2 θ
सिद्धांत
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उत्तर
Given: `cos^-1 x/2 + cos^-1 y/3 = θ`
⇒ `cos^-1 [x/2 xx y/3 - sqrt(1 - x^2/4) * sqrt(1 - y^2/9)] = θ` ...`[∵ cos^-1a + cos^-1b = cos^-1 (ab - sqrt(1 - a^2) * sqrt(1 - b^2))]`
⇒ `(xy)/6 - sqrt(1 - x^2/4) * sqrt(1 - y^2/9) = cos θ`
⇒ `(xy)/6 - cos θ = sqrt(1 - x^2/4) * sqrt(1 - y^2/9)`
Squaring both sides, we get
⇒ `((xy)/6 - cos θ)^2 = (1 - x^2/4)(1 - y^2/9)`
⇒ `(x^2y^2)/36 + cos^2θ - (2xy)/6 cos θ = 1 - x^2/4 - y^2/9 + (x^2y^2)/36`
⇒ `x^2/4 + y^2/9 - (xy cos θ)/3 = 1 - cos^2θ`
⇒ `(9x^2 + 4y^2 - 12xy cos θ)/36 = sin^2 θ`
⇒ 9x2 + 4y2 – 12xy cos θ = 36 sin2 θ
⇒ 9x2 – 12xy cos θ + 4y2 = 36 sin2 θ
Hence Proved.
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