A particle having initial velocity u moves with a constant acceleration a for a time t. a. Find the displacement of the particle in the last 1 second . b. Evaluate it for `u=5m//s, a=2m//s^2 and t=10s`.

A particle having initial velocity 4 m/s moves with a constant acceleration 1m//s^(2) for a time interval of 10 second in straight line. Find the displacement of the particle in the last second and the distance travelled in 10 second.

A particle is moving with a velocity of v=(3+ 6t +9t^2) m/s. Find out (a) the acceleration of the particle at t=3 s. (b) the displacement of the particle in the interval t=5s to t=8 s.

A particle moves rectilinearly with initial velocity u and constant acceleration a. Find the average velocity of the particle in a time interval from t=0 to t=t second of its motion.

A particle of mass m is moving along the line y-b with constant acceleration a. The areal velocity of the position vector of the particle at time t is (u=0)

A particle initially at rest, moves with an acceleration 5 m s^(-2) for 5 s. Find the distance travelled in (a) 4 s, (b) 5 s and (c) 5th second.

Following are three equations of motion S(g)=ut+(1)/(2)at^(2) v(s)=sqrt(u^(2)+2as) v(t)=u+at Where ,S,u,t,a,v are respectively the displacement ( dependent variable ) , initial ( constant ) , time taken ( independent variable ) , acceleration ( constant ) and final velocity ( dependent variable ) of the particel after time t . Find the displacement of the particle when its velocity becomes 10m//s if acceleration is 5m//s^(2) all through -

Starting from origin at t=0, with initial velocity 5 hat(j) m//s , a particle moves in the x-y plane with a constant acceleration of (10 hat(i) - 5hat(j))m//s^(2) . Find the coordinates of the particle at the moment its y-coordinate is maximum.

A particle moves along the x-axis obeying the equation x=t(t-1)(t-2) , where x is in meter and t is in second a. Find the initial velocity of the particle. b. Find the initial acceleration of the particle. c. Find the time when the displacement of the particle is zero. d. Find the displacement when the velocity of the particle is zero. e. Find the acceleration of the particle when its velocity is zero.

Following are three equations of motion S(g)=ut+(1)/(2)at^(2) v(s)=sqrt(u^(2)+2as) v(t)=u+at Where ,S,u,t,a,v are respectively the displacement ( dependent variable ) , initial ( constant ) , time taken ( independent variable ) , acceleration ( constant ) and final velocity ( dependent variable ) of the particel after time t . Find the displacement of a particle after 10 seconds starting from rest with a uniform acceleration of 2m//s^(2)

A particle at origin (0,0) moving with initial velocity u = 5 m/s hatj and acceleration 10 hati + 4 hatj . After t time it reaches at position (20,y) then find t & y