Two particles of equal masses have velocities `vec v_1 = 4hati ms^(-1)` and `vec v_2 = 4hatj ms^(-1)`. First particle has an acceleration `vec a_1 = (5 hat i + 5 hat j) ms^(-2)`, while the acceleration of the other particle is zero. The centre of mass of the two particles moves in a path of

Two particles of equal mass have velocities vec v_1 = 2 hat i= m//s^-1 and vec v_2 = 2hat j m//s^-1 . First particle has an acceleration vec a_1= (3 hat i+ 3 hat j) ms^-2 while the acceleration of the other particle is zero. The centre of mass of the two particles moves in a path of.

Two particles of equal mass have velocities v1=2 i ms^(-1) and v2= 2 j ms^(-1) First particle has an acceleration a= (3i + 3j) ms^(-2) while the acceleration of the other particle is zero. The centre of mass of the two particles moves in a path of

A particle starting from rest attains a velocity of 50 ms^(-1) in 5 s. The acceleration of the particle is

A particle moves with a tangential acceleration a_(t)=vec(a).hat(v) where vec(a)=(5hat(i)) m//s^(2) . If the speed of the particle is zero at x=0 , then find v (in m//s ) at x=4.9 m .

A particle has an initial velocity (6hati+8hatj) ms^(-1) and an acceleration of (0.8hati+0.6hatj)ms^(-2) . Its speed after 10s is

A particle's velocity changes from (2hat I +3 hatj) ms^(-1) in to (3 hati - 2hatj) ms^(-1) in 2s. Its average acceleration in ms^(-2) is

A charged particle has acceleration vec a = 2 hat i + x hat j in a megnetic field vec B = - 3 hat i + 2 hat j - 4 hat k. Find the value of x.

Two particles of masses m and 2 m has initial velocity vecu_(1)=2hati+3hatj(m)/(s) and vecu_(2)=-4hati+3hatj(m)/(s) Respectivley. These particles have constant acceleration veca_(1)=4hati+3hatj((m)/(s^(2))) and veca_(2)=-4hati-2hatj((m)/(s^(2))) Respectively. Path of the centre of the centre of mass of this two particle system will be:

Two particles of equal mass have coordinates (2m,4m,6m) and (6m,2m,8m). Of these one particle has a velocity v_(1) = (2i)ms^(-1) and another particle has a velocity v_(2) = (2j)ms^(-1) at time t=0. The coordinate of their center of mass at time t=1s will be

A particle leaves the origin with an lintial veloity vec u = (3 hat i) and a constant acceleration vec a= (-1.0 hat i-0 5 hat j)ms^(-1) . Its velocity vec v and position vector vec r when it reaches its maximum x-coordinate aer .