A particle whose speed in 50 m/s moves along the line from A(2, 1) to B(9, 25). Find its velocity vector in the form of `a hat(i) + b hat(j)`.

A particle whose speed is 50ms^(-1) moves along the line from A(2,1) to B(9,25) . Find its velocity vector in the from of ahat(i)+bhat(j) .

A particle whose speed is 50ms^(-1) moves along the line from A(2,1) to B(9,25) . Find its velocity vector in the from of ahat(i)+bhat(j) .

A particle is moving with speed 6m//s along the direction of vec(A)=2hat(i)+2hat(j)-hat(k) , then its velocity is :

A particle is moving with a constant acceleration vec(a) = hat(i) - 2 hat(j) m//s^(2) and instantaneous velocity vec(v) = hat(i) + 2 hat(j) + 2 hat(k) m//s then rate of change of speed of particle 1 second after this instant will be :

Electric and magnetic field are directed as E_(0) hat(i) and B_(0) hat(k) , a particle of mass m and charge + q is released from position (0,2,0) from rest. The velocity of that particle at (x,5,0) is (5 hat(i) + 12 hat(j)) the value of x will be

A particle is moving in x-y plane. At an instant, it has velocity (4 hat (i) + 4 hat(j)) m//s and acceleration (3 hat(i) + 5 hat(j)) m//s^(2) At that instant, the radius of curvature of its path will be :

A point object is moving with velocity v_(0) =2 hat(i) - 3 hat(j ) + 4hat( k) in front of a moving plane mirror whose normal is along x - axis.The mirror is moving with velocity v_(m) = hat(i) - 4 hat(j) + 2 hat( k ) . Find the velocity vector of image

A particle of mass 2 kg is moving with velocity vec(v)_(0) = (2hat(i)-3hat(j))m//s in free space. Find its velocity 3s after a constant force vec(F)= (3hat(i) + 4hat(j))N starts acting on it.

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 of charge q and mass m starts moving from the origin under the action of an electric field vec E = E_0 hat i and vec B = B_0 hat i with a velocity vec v = v_0 hat j . The speed of the particle will become 2v_0 after a time.