A solid cylinder is attached to a horizontal massless spring as shown in the figure. If the cylinder rolls without slipping, the time period of oscillation of the cylinder is
The moment of inertia of a body about a given axis 1.2 kgm2• Initially the body is at rest. In order to produce a rotational kinetic energy of 1500 J and angular acceleration of 25 rad/s2 must be applied about the axis for a duration of
10s
8s
2s
4s
Five particles of mass 2 kg are attached to the rim of a circular disc of radius 0.1 m and negligible mass. Moment of inertia of the system about the axis passing through the centre of the disc and perpendicular to its plane is
1 kg m2
0.1 kg m2
2 kg m2
0.2 kg m2
A particle is kept at rest at the top of a sphere of diameter 42 m. When disturbed slightly, it slides down. At what height h from the bottom, the particle will leave the sphere?
14 m
28 m
35 m
7 m
C.
35 m
The condition of slipping by the particle from the top is given by
From the figure,
Suppose that the particle will leave the surface at height h from the centre of the sphere then it will create an angle θ with the center.
Hence, the height from the bottom of the sphere
= 14 m
Therefore, the required height at which the particle will leave the sphere is :
21 + h = 21+ 14 = 35 m
The angular momentum of a rotating body changes from Ao to 4Ao in 4 minutes. The torque acting on the body is:
3/4 Ao
4Ao
3Ao
3/2Ao
If a spherical ball rolls on a table without slipping the friction of its total energy associated with rotational energy is :
3/5
2/7
2/5
3/7
The equation of stationary wave along a stretched string is given by where, x and y are in cm and t in second. The separation between two adjacent nodes is :
1.5 cm
3 cm
6 cm
4 cm
If the angle between the vectors , the value of the product is equal to
BA2 sinθ
BA2 sinθ cosθ
zero
The moment of inertia of a uniform circular disc of radius R and mass M about an axis passing from the edge of the disc and normal to the disc is
MR2
A force of acts on O, the origin of the coordinate systems. The torque about the point (1, -1 ) is