A sphere and circular disc of same mass ...

A sphere and circular disc of same mass and radius are allowed to roll down an inclined plane from the same height without slipping. Find the ratio of times taken by these two to come to the bottom of incline :

Text Solution

AI Generated Solution

To solve the problem of finding the ratio of times taken by a sphere and a circular disc of the same mass and radius rolling down an inclined plane from the same height, we can follow these steps: ### Step-by-Step Solution: 1. **Understanding the Problem**: - We have a sphere and a circular disc, both with mass \( m \) and radius \( r \), rolling down an incline from a height \( h \) without slipping. 2. **Identifying Forces**: ...

Topper's Solved these Questions

SYSTEM OF A PARTICLES & ROTATIONAL MOTION
VMC MODULES ENGLISH|Exercise SOLVED EXAMPLES|20 Videos
SYSTEM OF A PARTICLES & ROTATIONAL MOTION
VMC MODULES ENGLISH|Exercise PRACTICE EXERCISE-1|4 Videos
SIMPLE HARMONIC MOTION
VMC MODULES ENGLISH|Exercise 7-previous year question|46 Videos
SYSTEM OF PARTICLES AND ROTATIONAL MOTION
VMC MODULES ENGLISH|Exercise IMPECCABLE|56 Videos

Similar Questions

Explore conceptually related problems

A solid cylinder of mass M and radius R rolls down an inclined plane of height h without slipping. The speed of its centre when it reaches the bottom is.

Two objects, a ring and a spherical shell of same mass and radius are released from the top of two Identical inclined plane. If they are rolling without slipping, then ratio of speed of center of mass of the two objects when they will reach the bottom of the inclined plane is

A hollow sphere and a solid sphere having same mass and same radii are rolled down a rough inclined plane.

A ring starts to roll down the inclined plane of height h without slipping . The velocity when it reaches the ground is

A solid sphere, disc and solid cylinder, all of the same mass, are allowed to roll down (from rest) on inclined plane, them

A hollow sphere and a solid sphere both having the same mass of 5 kg and radius 10 m are initially at rest. If they are made to roll down the same inclined plane without slipping, the ratio of their speeds when they reach the bottom of the plane (V_("hollow"))/(V_("solid")) , will be

Assertion : A solid sphere and a ring of same mass and radius are released simultaneously from the top of an inclined surface. The two objects roll down the plane without slipping. They reach the bottom of the incline with equal linear speeds Reason : Decrease in potential enery for both is the same.

A disc and a solid sphere of same mass and radius roll down an inclined plane. The ratio of thhe friction force acting on the disc and sphere is

The speed of a homogeneous solid sphere after rolling down an inclined plane of vertical height h from rest without slipping will be.

VMC MODULES ENGLISH-SYSTEM OF A PARTICLES & ROTATIONAL MOTION-IN-CHAPTER EXERCISE F

A sphere and circular disc of same mass and radius are allowed to roll...
Text Solution
|
A ball of radius 11 cm and mass 8 kg rolls from rest down a ramp of le...
Text Solution
|
From an inclined plane a sphere, a disc, a ring and a shell are rolled...
Text Solution
|
A solid cylinder 30 cm in diameter at the top of an inclined plane 2.0...
Text Solution
|
A cylinder of mass M and radius R rolls on an inclined plane. The gain...
Text Solution
|
A disc of radius R is rolling down an inclined plane whose angle of in...
Text Solution
|
A solid cylinder (i) rolls down (ii) slides down an inclined plane. Th...
Text Solution
|
The acceleration of a body rolling down on an inclined plane does not ...
Text Solution
|
If a ring, a disc, a solid sphere and a cyclinder of same radius roll ...
Text Solution
|
A ring is rolling on an inclined plane. The ratio of the linear and ro...
Text Solution
|
The M.I. of a solid cylinder about its axis is I. It is allowed to roo...
Text Solution
|