The velocities of A and B are `vecv_(A)= 2hati + 4hatj and vecv_(B) = 3hati - 7hatj` , velocity of B as observed by A is

The velociies of A and B are vecv_(A)= 2hati + 4hatj and vecv_(B) = 3hati - 7hatj , velocity of B as observed by A is

Obtain the angle between A+B and A-B if A = 2hati +3hatj and B = hati - 2hatj.

The velocity (in m/s) of an object changes from vecv_(1) = 10 hati + 4hatj + 2hatk "to" vecv_(2) = 4hati + 2hatj + 3hatk in 5 second. Find the magnitude of average acceleration.

Two particles having position verctors vecr_(1)=(3hati+5hatj) metres and vecr_(2)=(-5hati-3hatj) metres are moving with velocities vecv_(1)=(4hati+3hatj)m//s and vecv_(2)=(alphahati+7hatj)m//s . If they collide after 2 seconds, the value of alpha is

A particle moves in plane with acceleration veca = 2hati+2hatj . If vecv=3hati+6hatj , then final velocity of particle at time t=2s is

The angle between vector a=2hati+hatj-2hatk and b=3hati-4hatj is equal to

Velocity and acceleration vectors of charged particle moving perpendicular to the direction of magnetic field at a given instant of time are vecv=2hati+chatj and veca=3hati+4hatj respectively. Then that value of 'c' is

A unit mass has vecr=8hati-4hatj and vecv=8hati+4hatj What is its angular momentum ?

The position vectors of points A and B are hati - hatj + 3hatk and 3hati + 3hatj - hatk respectively. The equation of a plane is vecr cdot (5hati + 2hatj - 7hatk)= 0 The points A and B