Particle 's position as a function of time is given by `x=-t^(2)+4t+4` find the maximum value of position coordinate of particle.

The particle's position as a funciton of time is given as x=5t^2-9t+3 . Find out the maximum value of position co-ordinate? Also, plot the graph.

The particles position as a function of time is given as x=t^(3)-3t^(2)+6, then maximum value of x occurs when "t=

The particles position as a function of time is given as x=t^(3)-3t^(2)+6 ," then maximum value of "x" occurs when t=

A particle's position as a function of time is described as y (t) = 2t^(2) + 3t + 4 . What is the average velocity of the particle from t = 0 to t = 3 sec ?

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 maximum value of position co-ordinate of particle on positive x -axis is

A foce acts on a 30.g particle in such a way that the position of the particle as a function of time is given by x=3t-4t^(2)+t^(3) , where x is in metre and t in second. The work done during the first 4s is

Position of particle moving along x-axis is given by x=2t^(3)-4t+3 Initial position of the particle is

A force acts on a 3.0 gm particle in such a way that the position of the particle as a function of time is given by x=3t-4t^(2)+t^(3) , where xx is in metres and t is in seconds. The work done during the first 4 seconds is

Acceleration of particle moving along the x-axis varies according to the law a=-2v , where a is in m//s^(2) and v is in m//s . At the instant t=0 , the particle passes the origin with a velocity of 2 m//s moving in the positive x-direction. (a) Find its velocity v as function of time t. (b) Find its position x as function of time t. (c) Find its velocity v as function of its position coordinates. (d) find the maximum distance it can go away from the origin. (e) Will it reach the above-mentioned maximum distance?