Advertisements
Advertisements
प्रश्न
If x = a `(cosθ + log tan θ/2) and y = sin θ`, then find `(d^2y)/(dx^2) at θ = pi/4`.
Advertisements
उत्तर
x = a `(cosθ + log tan θ/2) and y = sin θ`
Differentiate w.r.t., θ
`(dx)/(dθ) = a(-sin θ + 1/tan(θ/2) sec^2 θ/2 xx 1/2)`
= `a(-sinθ + (cos θ/2)/(2sin θ/2 cos^2 θ/2))`
= `a(-sinθ + (1)/(sinθ))`
= `a((1 - sin^2θ)/sinθ)`
= `a(cos^2θ)/sinθ` ...(i)
Now, y = sinθ
`(dy)/(dθ) = cosθ` ...(ii)
Dividing equation (ii) by equation (i),
`(dy)/(dx) = (dy//dθ)/(dx//dθ) = (cosθ)/((a(cos^2θ)/sinθ))`
= `sinθ/(a cosθ)`
`(dy)/(dx) = tan θ/a`
Again differentiate w.r.t. x,
`(d^2y)/(dx^2) = 1/a sec^2 θ (dθ)/(dx)`
= `1/a sec^2 θ. sin θ/(a cos^2θ) ...["From equation (i)" (dθ)/(dx) = (sin θ)/(a cos^2 θ)]`
at θ = `pi/4`
`(d^2y)/(dx^2) = 1/a^2 ((sec^2 pi/4)(sin pi/4))/((cos^2 pi/4)) ...[∵ sin pi/4 = 1/sqrt2 and cos pi/4 = 1/sqrt2]`
= `(1/a^2 xx (sqrt2)^2 xx 1/sqrt2)/(1/sqrt2)^2`
= `(1/a^2 xx 2/sqrt2)/(1/2)`
= `4/(a^2sqrt2)`
= `(2sqrt2)/a^2`
