The coordinates of a moving point P are `(2t^(2)+4, 4t+6)`. Then its locus will be a

The coordinates of a moving point P are (2t^(2)+4,4t+6); show that the locus of P is a parabola.

The coordinates of a moving point P are (at^(2),2at), whereis a variable parameter.Find the equation to the locus of P.

If the coordinates of a variable point P be (t+ 1/t , t- 1/t) , where t is a variable quantity, then find the locus of P .

If the coordinates of a vartiable point P be (t+(1)/(t), t-(1)/(t)) , where t is the variable quantity, then the locus of P is

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

The equation of motion of rockets are x=2t, y=-4t, z=4t where the time 't' is given in second and the coordinate of a moving point in kilometres. What is the path of the rockets? At what distance will the rocket be from the starting point O(0, 0, 0) in 10s.

The equations of motion of a rocket are x=2t,y=-4t and z=4t, where time t is given in seconds,and the coordinates of a moving points in kilometers.What is the path of the rocket? At what distance will be the rocket from the starting point O(0,0,0) in 10s?

Statement-I If a circle S=0 intersect hyperbola xy=4 at four points, three of them being (2, 2), (4, 1) and (6, (2)/(3) , then the coordinate of the fourth point are ((1)(4), 16) . Statement-II If a circle S=0 intersects a hyperbola xy=c^(2) at t_1, t_2, t_3 and t_4 , then t_1t_2t_3t_4=1

The coordinate of a moving point at time t are given by x=a(2t+sin2t),y=a(1-cos2t) Prove that acceleration is constant.

The coordinates of a particle moving in XY-plane at any instant of time t are x=4t^(2),y=3t^(2) . The speed of the particle at that instant is