A cure is represented parametrically by the equation `x=f(t)=a^(In(b^t)) and y=g(t)=b^(-In(a^t))a,b gt0 and a = ne 1, b ne 1 ` where ` t in R`
The value of `(d^2y)/(dx^2)` at the point where f(t) = g(t) is

A cure is represented parametrically by the equation x=f(t)=a^(In(b^t)) and y=g(t)=b^(-In(a^t))a,b gt0 and a = ne 1, b ne 1 where t in R Which of the following is not a correct expression for (dy)/(dx) ?

A cure is represented parametrically by the equation x=f(t)=a^(In(b^t)) and y=g(t)=b^(-In(a^t))a,b gt0 and a = ne 1, b ne 1 where t in R The value of (f(t))/(f'(t)).(f''(-t))/(f'(-t))+(f(-t))/(f'(t)).(f''(t))/(f''(t))AAtinR is equal to

A function is represented parametrically by the equations x=(1+t)/(t^3),y=3/(2t^2)+2/t then (dy)/(dx) -x ((dy)/(dx))^3 has the absolute value of equal to

The parametric equation x=2a((1-t^(2)))/(1+t^(2)) and y=(4at)/(l+t^(2)) represent a circle of radius

If t is a parameter and x = t + 1/t , y = t - 1/t , " then " (d^2 y)/(dx^2) =

If x = e^(t)sint, y =e^(t)cost then (d^2y)/(dx^2) at t = pi is

The parametric equations x=(2a(1-t^(2)))/(1+t^(2)) and y=(4at)/(1+t^(2)) represents a circle whose radius is

Let y = t^(10) +1 and x = t^8 +1 . Then (d^2y)/(dx^2) is

The parametric representation (2+t^(2),2t+1) represents