Given, x=f(t),y=g(t) where t is a parameter.
Statement-I `(d^2y)/(dx^2)=(g''(t))/(f''(t))`
Statement-II `(d^2y)/(dx^2)=(f'(t)g''(t)-g'(t)f''(t))/({f'(t)}^3)`

IF x=t^2+2t,y=t^3-3t , where t is a parameter then show that, (d^2y)/(dx^2)=3/(4(t+1)) .

If t is a parameter and x = t^2+2t,y = t^3-3t then show that (d^2y)/(dx^2) = 3/(4(t+1) .

If t is a parameter and x=t^(2)+2t, y=t^(3)-3t , then the value of (d^(2)y)/(dx^(2)) at t=1 is -

If x=(2t)/(1+t^2) , y=(1-t^2)/(1+t^2) , then find (dy)/(dx) .

If a curve is represented parametrically by the equation x=f(t) and y=g(t)" then prove that "(d^(2)y)/(dx^(2))=-[(g'(t))/(f'(t))]^(3)((d^(2)x)/(dy^(2)))

Let x=f(t) and y=g(t), where x and y are twice differentiable function. If f'(0)= g'(0) =f''(0) = 2. g''(0) = 6, then the value of ((d^(2)y)/(dx^(2)))_(t=0) is equal to

If x=sin^(-1) t, y=log(1-t^(2)), 0 le t lt 1 , then the value of (d^(2)y)/(dx^(2)) at t=(1)/(3) is -

If t is a variable parameter, show that x=(a)/(2)(t+(1)/(t)) and y = (b)/(2)(t-(1)/(t)) represent a hyperbola.

If x=cos t and y=log t , prove that at t=pi/2 , (d^2y)/(dx^2)+(dy/dx)^2=0 .

let y=t^(10)+1, and x=t^8+1, then (d^2y)/(dx^2) is