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प्रश्न
Find the value of `dy/dx` at `θ = π/3`, if x = cos θ – cos 2θ, y = sin θ – sin 2θ.
बेरीज
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उत्तर
Given, x = cos θ – 2 cos 2θ
y = sin θ – sin 2θ
Differentiate x = cos θ – 2 cos 2θ w.r.t θ
`dx/(dθ) = - sin θ + 2 sin 2θ` ...(i)
Differentiate y = sin θ – sin 2θ w.r.t θ
`dy/(dθ) = cos θ - cos 2θ` ...(ii)
On dividing equation (ii) by equation (i)
`((dy)/(dθ))/((dx)/(dθ)) = (cos θ - 2 cos 2θ)/(-sin θ + 2 sin 2θ)`
`dy/dx = (cos θ - 2 cos 2θ)/(2 sin 2θ - sin θ)`
`dy/dx]_(θ = π/3) = (cos(π/3) - 2 cos 2(π/3))/(2 sin 2(π/3) - sin(π/3))`
= `((1/2) - 2((-1)/2))/(2(sqrt(3)/2) - (sqrt(3)/2)`
= `(1/2 + 1)/(sqrt(3)/2)`
= `(3/2)/(sqrt(3)/2)`
= `sqrt(3)`
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