An object moves along "x" -axis such that its position varying with time "t" is given as `x=4t-t^(2)`(x is in metre and time "t" in second).The distance travelled by the object from "t=0" to "t=3s" is

(1) 3m

(2) 5m

(3) 12m

(4) 21m

An object moves along x-axis such that its position varies with time according to the relation x=50t-5t^(2) Here, x is in meters and time is in seconds. Find the displacement and distance travelled for the time interval t = 0 to t = 6 s.

A particle moves along x-axis such that its position veries with time as x=50t-5t^2 . Select the correct alternative (s).

A body moves along x-axis such that its displacement varies with time as given, x=7 + 3t + 5t^2 . The average velocity during 3rd second is

A particle moves along x -axis. The position of the particle at time t is given as x=t^(3)-9t^(2)+24t+1 . Find the distance traveled in first 5 seconds.

The position of a particle is given by x=2(t-t^(2)) where t is expressed in seconds and x is in metre. The total distance travelled by the paticle between t=0 to t=1s is

The position of a particle along x-axis at time t is given by x=1 + t-t^2 . The distance travelled by the particle in first 2 seconds is

The position of a particle along X-axis at time t is given by x=2+t-3t^(2) . The displacement and the distance travelled in the interval, t = 0 to t = 1 are respectively

The position (in meters) of a particle moving on the x-axis is given by: x=2+9t +3t^(2) -t^(3) , where t is time in seconds . The distance travelled by the particle between t= 1s and t= 4s is m.

Position of a point object is given by x = (2)/(3)t^(3) - 4t^(2)+6t+7 (x is in meter and t is in seconds). What would be the distance travelled by object from t = 0 to instant when particle its direction of velocity for last time.

A particle is moving along x-axis. Its X-coordinate varies with time as, X=2t^2+4t-6 Here, X is in metres and t in seconds. Find average velocity between the time interval t=0 to t=2s.