Velocity (in m/s) of a particle moving in a straight line given by `v=(t^(2)-2t_1)`. Match Table-1 with Table -2

The speed(v) of a particle moving along a straight line is given by v=(t^(2)+3t-4 where v is in m/s and t in seconds. Find time t at which the particle will momentarily come to rest.

The velocity 'v' of a particle moving along straight line is given in terms of time t as v=3(t^(2)-t) where t is in seconds and v is in m//s . The distance travelled by particle from t=0 to t=2 seconds is :

The velocity 'v' of a particle moving along straight line is given in terms of time t as v=3(t^(2)-t) where t is in seconds and v is in m//s . The displacement of aprticle from t=0 to t=2 seconds is :

The velocity 'v' of a particle moving along straight line is given in terms of time t as v=3(t^(2)-t) where t is in seconds and v is in m//s . The speed is minimum after t=0 second at instant of time

Velocity time equation of a particle moving in a straight line is v=2t-4 for tle2s and v=4-2t for tgt2 .The distance travelled by the particle in the time interval from t=0 to t=4s is (Here t is in second and v in m/s)

The space s described in time t by a particle moving in a straight line is given by s=t^5-40 t^3+30 t^2+80 t-250 . Find the minimum value of acceleration.

Velocity-time equation of a particle moving in a straight line is, v=(10+2t+3t^2) (SI units) Find (a) displacement of particle from the mean position at time t=1s, if it is given that displacement is 20m at time t=0 . (b) acceleration-time equation.

At time t , the displacement of a particle moving in a straight line by x = - 4t^(2) +2t . Find the velocity and acceleration a when t = (1/2) s .

If the velocity of a paraticle moving along x-axis is given as v=(4t^(2)+3t=1)m//s then acceleration of the particle at t=1sec is :

The velocity time graph of a particle moving in a straight line is given line is given in the figure. Then starting from t=0, the particle