A curve is represented paramtrically by the equations `x=e^(t)cost` and `y=e^(t)sint` where `t` is a parameter. Then
The value of `(d^(2)y)/(dx^(2))` at the point where `t=0` is

A curve is represented parametrically by the equations x=e^(t)cos t and y=e^(t)sin t where t is a parameter.Then The relation between the the parameter.t' and the angle a between the tangent to the given curve andthe x-axis is given by,t' equals

A curve is represented parametrically by the equations x=f(t)=a^(In(b^t))and y=g(t)=b^(-In(a^(t)))a,bgt0 and a ne 1, b ne 1" Where "t in R. The value of (d^(2)y)/(dx^(2)) at the point where f(t)=g(t) is

If x=t+(1)/(t) and y=t-(1)/(t) , where t is a parameter,then a value of (dy)/(dx)

A curve is represented parametrically by the equations x=t+e^(at) and y=-t+e^(at) when t in R and a>0. If the curve touches the axis of x at the point A, then the coordinates of the point A are

If x=3cos t and y=5sint , where t is a parameter, then 9(d^(2)y)/(dx^(2)) at t=-(pi)/(6) is equal to

If x = e^(t) sin t and y = e^(t) cos t, t is a parameter , then the value of (d^(2) x)/( dy^(2)) + (d^(2) y)/(dx^(2)) at t = 0 , is :

If x=a(sin t-t cos t),y=a sin t then find the value of (d^(2)y)/(dx^(2))

If x=e^(t)cost and y=e^(t)sint , then what is (dx)/(dy) at t=0 equal to?

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)))