IF x=f(t) and y=g(t) , prove that , `(d^2y)/(dx^2)=(f_1g_2-g_1f_2)/(f_1^(3))` where suffixes denote differentiations w.r.t. t.

Find the differentiation of f(x)=log(ax+b) w.r.t x.

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)))

If f(x)=x^5-3x^3+2x^2+1 . Find the differentiation of f(x) w.r.t.x.

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)) .

Find the derivatives w.r.t. x : cos^(-1)[f(x)]

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)

f(x)=int_1^xlogt/(1+t+t^2)dt (xge1) then prove that f(x) =f(1/x)

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 f(x+f(y))=f(x)+yAAx ,y in R and f(0)=1, then prove that int_0^2f(2-x)dx=2int_0^1f(x)dx .

If x^2+y^2=t-1/t and x^4+y^4=t^2+1/t^2, then x^3y (dy)/(dx)= (a) 0 (b) 1 (c) -1 (d) none of these