If `x=f(t) and y=phi(t),` prove that `(d^2y)/(dx^2)=(f_1phi_2-f_2phi_1)/(f_1^3)` where suffixes denote differentiation `w.r.t.t.`

If x=f(t) and y=g(t) , then (d^2y)/(dx^2) is equal to

If x=f(t) and y=g(t) , then write the value of (d^2y)/(dx^2) .

Differentiate w.r.t y = x^(-2)

If x=phi(t),y=Psi(t)," then "(d^(2)y)/(dx^(2)) is equal to

If y={f(x)}^(phi(x)),"then"(dy)/(dx) is

Using definition, differentiate w.r.t. 'x' f(x)=cos^(2)x

If x=a((1+t^2)/(1-t^2))"and"y=(2t)/(1-t^2),"f i n d"(dy)/(dx)

If sinx=(2t)/(1+t^2),tany=(2t)/(1-t^2),"f i n d"(dy)/(dx)dot

If x=(1+logt)/(t^2),y=(3+2logt)/t ,"f i n d"(dy)/(dx)dot

A particle moving on a curve has the position at time t given by x=f'(t) sin t + f''(t) cos t, y= f'(t) cos t - f''(t) sin t where f is a thrice differentiable function. Then prove that the velocity of the particle at time t is f'(t) +f'''(t) .