The position vectors os a particle is `r=(acosomegat)hati+(asinomegat)hatj.`The velocity of particle is

The position vector of a particle is r = a sin omega t hati +a cos omega t hatj The velocity of the particle is

A particle moves in xy-plane. The position vector of particle at any time is vecr={(2t)hati+(2t^(2))hatj}m. The rate of change of 0 at time t = 2 second. ( where 0 is the angle which its velocity vector makes with positive x-axis) is :

If the position vector of a particle is vecr=(3hati+4hatj) meter and Its angular velocity is vecomega(hatj+2hatk) rad/sec then find its linear velocity(in m/s)?

The position vector of a particle is given by vec r = (2t hati+5t^(2)hatj)m (t is time in sec). Then the angle between initial velocity and initial acceleration is

The position vectors of A and B are hati-hatj+2hatk and 3hati-hatj+3hatk . The position vector of the middle points of the line AB is

A particle is acted simultaneously by mutally perpendicular simple harmonic motion x=acosomegat and y=asinomegat . The trajectory of motion of the particle will be

The angular velocity of a particle is vec(w) = 4hati + hatj - 2hatk about the origin. If the position vector of the particle is 2hati + 3hatj - 3hatk , then its linear velocity is

(A):The Instantaneous velocity does not depend on instantaneous position vector. (R ):The instantaneous velocity and average velocity of a particle are always same.

The position vector of a particle changes with time according to the direction vec(r)(t)=15 t^(2)hati+(4-20 t^(2))hatj . What is the magnitude of the acceleration at t=1?

The velocity of a particle is v=6hati+2hatj-2hatk The component of the velocity parallel to vector a=hati+hatj+hatk in vector from is