Velocity of a particle varies as `v=2t^3-3t^2` in `(km)/(hr)` If `t=0` is taken at 12:00 noon
Q. The time at which speed of the particle is minimum.

Velocity of a particle varies as v=2t^3-3t^2 in (km)/(hr) If t=0 is taken at 12:00 noon Q. What is the velocity of the particle at 12:00 noon?

Velocity of a particle varies as v=2t^3-3t^2 in (km)/(hr) If t=0 is taken at 12:00 noon Q. What is the velocity of the particle at 12:00 noon?

Velocity of a particle varies as v=2t^3-3t^2 in (km)/(hr) If t=0 is taken at 12:00 noon Q. Find the expression for the acceleration of the particle.

Velocity of a particle varies as v=2t^3-3t^2 in (km)/(hr) If t=0 is taken at 12:00 noon Q. Find the expression for the acceleration of the particle.

Velocity of a particle varies as v=2t^3-3t^2 in (km)/(hr) If t=0 is taken at 12:00 noon Q. Find the time between 12:00 noon and 1:00 pm which speed is maximum

If a=(3t^2+2t+1) m/s^2 is the expression according to which the acceleration of a particle varies. Then- a=(3t^2+2t+1) (m)/(s^2) Q. The expression for instantaneous velocity at any time t will be (if the particle was initially at rest)-

The speed(v) of a particle moving along a straight line is given by v=(t^(2)+3t-4 where v is in m/s and t in seconds. Find time t at which the particle will momentarily come to rest.

The speed(v) of a particle moving along a straight line is given by v=(t^(2)+3t-4 where v is in m/s and t in seconds. Find time t at which the particle will momentarily come to rest.

The speed(v) of a particle moving along a straight line is given by v=(t^(2)+3t-4 where v is in m/s and t in seconds. Find time t at which the particle will momentarily come to rest.