If `y=3x^(2)-6x" and "x=g(t)` is a derivable function such that `g(14)=-2" and "g'(14)=8," then "((dy)/(dx))" at "t=14` is

If x=f(t) and y=g(t) , then find (dy)/(dx)

If x=f(t) and y=g(t) are differentiable functions of t then (d^(2)y)/(dx^(2)) is

If x=f(t) and yy=g(t) are differentiable functions of t then (d^(2)y)/(dx^(2)) is

If y=g{g(x)}, g(0)=0 and g'(0)=2 then find dy/dx at x=0

If x = g(t) and y = f(t) , find (d^2y)/(dx^2) as a function of t.

Let f(x) is an even function and derivative of g(x), then g(x) can't be:

If y = f(u) is a differentiable functions of u and u = g(x) is a differentiable functions of x such that the composite functions y = f[g(x) ] is a differentiable functions of x then (dy)/(dx) = (dy)/(du) . (du)/(dx) Hence find (dy)/(dx) if y = sin ^(2)x

Find the derivative of the function g(t) = ((t-2)/(2t+1)) .

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