A particle of mass M is revolving along ...

A particle of mass `M` is revolving along a circule of radius `R` and nother particle of mass `m` is recolving in a circle of radius `r`. If time periods of both particles are same, then the ratio of their angular velocities is

Similar Questions

Explore conceptually related problems

Two particles of mass M and m are moving in a circle of radii R and r. if their time period are the same, what will be the ratio of their linear velocities?

A particle of mass m is moving along a circle of radius r with a time period T . Its angular momentum is

A particle of mass m is being rotated on a vertial circle of radius r. If the speed of particle at the highest point be v, then

If KE of the particle of mass m performing UCM in a circle of radius r is E. Find the acceleration of the particle

Two particles having mass M and m are moving in a circular path having radius R and r. If their time period are same then the ratio of angular velocity will be

A particle of mass `M` is revolving along a circule of radius `R` and nother particle of mass `m` is recolving in a circle of radius `r`. If time periods of both particles are same, then the ratio of their angular velocities is

Similar Questions

Recommended Questions