If t is a variable parameter, show that `x=(a)/(2)(t+(1)/(t)) and y = (b)/(2)(t-(1)/(t))` represent a hyperbola.

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

If t be a variable parameter, show that the point x = a(1 -t^(2))/(1+t^(2)),y = b(2t)/(1 + t^(2)) always lies on an ellipse .

Show that the locus represented by x=(1)/(2)a(t+(1)/(t)),y=(1)/(2)a(t-(1)/(t)) is a rectangular hyperbola.

The eccentricity of the hyperbola 2x = a(t + (1)/(t)), 2y = a(t-(1)/(t))

If t is parameter then the locus of the point P(t,(1)/(2t)) is _

Show that for all values of t the point x = a. (1 + t^(2))/(1-t^(2)), y = (2at)/(1-t^(2)) lies on a fixed hyperbola. What is the value of the eccentricity of the hyperbola?

If t is a parameter and x = t^2+2t,y = t^3-3t then show that (d^2y)/(dx^2) = 3/(4(t+1) .

If t be a variable parameter, find the vartex, axis, focus and length of the latus rectum of the parabola whose parametric equations are, x = u cos alpha* t, y = u sin alpha * t - (1)/(2) "gt"^(2) .

If t is veriable paramete, parameter, show that the locus of the point of intersection of the straight lines (tx)/(a)+(y)/(b)-t = 0 and (x)/(a) - (ty)/(b) + 1 = 0 represents an ellipse

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 -