" b) "x=a+bt,y=b-(a)/(t)" where t is a parameter."

Find the locus of point (a+bt,b-(a)/(t)) where t is a parameter.

The locus of the point (a+bt,b-(a)/(t)) where t is the parameter is

The locus of the point (a+b t, b-(a)/(t)), where t is the parameter is

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

If x=at^(3) and y=bt^(2), where t is a parameter,then prove that (dy)/(dx)=(8b)/(27a^(3)t^(2))

If x = (2at)/(1 + t^2) , y = (a(1-t^2) )/(1 + t^2) , where t is a parameter, then a is

Any point whose x and y co-ordinates satisfy the equations (1 - (x//a))/(t^(2)) = (1 + (x//a))/(1) = (y//b)/(t) , where t is an non-zero parameter, lies on a/m

If the co-ordinates of a point P are x = at^(2) , y = a sqrt(1 - t^(4)) , where t is a parameter , then the locus of P is a/an

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 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