IF t is a parameter, then `x = a(t + (1)/(t))` and `y = b(t - (1)/(t))` represents

The equation x =1/2 (t+ (1)/(t)), y = 1/2 (t - 1/t), t ne 0 represents

Find dy/dx if, x= (t+(1/t))^a ,y= a^(t+(1/t))

Find dy/dx if: x= a(t-(1/t)), y=a(t+(1/t))

The equation x = (e ^(t) + e ^(-t))/(2), y = (e ^(t) -e^(-t))/(2), t in R, represents

The amplitude of a wave represented by displacement equation y=(1)/(sqrt(a)) sin omega t +-(1)/(sqrt(b)) cos omega t will be

If y(t) is a solution of (1+t)((dy)/(dt))-t y=1 and y(0)=-1 then y(1) is

If x=e^t sin t , y=e^t cos t , t is a parameter , then (d^2y)/(dx^2) at (1,1) is equal to