The co-ordinate of the particle in x-y plane are given as `x=2+2t+4t^(2)` and `y=4t+8t^(2)` :-
The motion of the particle is :-

The coordinates of a moving particle at time t are given by x=ct^(2) and y=bt^(2) . The speed of the particle is given by :-

The co-ordinates of a moving particle at any time t are given by x=ct^(2) and y=bt^(2) The speed of the particle is

If some function say x varies linearly with time and we want to find its average value in a given time interval we can directly find it by (x_(i)+x_(f))/(2) . Here, x_(i) is the initial value of x and x_(f) its final value y co-ordinates of a particle moving in x-y plane at some instant are : x=2t^(2) and y=3//2 t^(2) . The average velocity of particle in at time interval from t=1 s to t=2s is :-

The co-ordinates of a particle moving in xy-plane vary with time as x="at"^(2),y="bt" . The locus of the particle is :

The coordinates of a particle moving in XY-plane very with time as x=4t^(2),y=2t . The locus of the particle is

The x and y coordinates of a particle at any time t are given by x=7t+4t^2 and y=5t , where x and t is seconds. The acceleration of particle at t=5 s is

The displacement of particle along the X-axis is given by x= a sin^(2) omega t . The motion of the particle corresponds to………..

The position of a particle moving along a. straight line is given by x = 2 - 5t + t ^(3) The acceleration of the particle at t = 2 sec. is ...... Here x is in meter.

If the velocity of a particle moving along x-axis is given as v=(3t^(2)-2t) and t=0, x=0 then calculate position of the particle at t=2sec.

The position of a particle moving along a straight line is given by x =2 - 5t + t ^(3). Find the acceleration of the particle at t =2 s. (x is metere).