For which of the following does the centre of mass lie outside the body?
Which of the following points is the likely position of the centre of mass of the system shown in figure?
A particle of mass $$m$$ is moving in $$y z$$-plane with a uniform velocity $$v$$ with its trajectory running parallel to $$+v e y$$-axis and intersecting $$z$$-axis at $$z=a$$ in figure. The change in its angular momentum about the origin as it bounces elastically from a wall at $$y=$$ constant is
When a disc rotates with uniform angular velocity, which of the following is not true?
A uniform square plate has a small piece $Q$ of an irregular shape removed and glued to the centre of the plate leaving a hole behind in figure. The moment of inertia about the $z$-axis is then,
In problem 5, the CM of the plate is now in the following quadrant of x-y plane.
The density of a non-uniform rod of length 1 m is given by $$\rho(x)=a\left(1+b x^2\right)$$ where, a and b are constants and $$0 \leq x \leq 1$$. The centre of mass of the rod will be at
A merry-go-round, made of a ring-like platform of radius $$R$$ and mass $$M$$, is revolving with angular speed $$\omega$$. A person of mass $$M$$ is standing on it. At one instant, the person jumps off the round, radially away from the centre of the round (as seen from the round). The speed of the round of afterwards is
Choose the correct alternatives
Figure shows two identical particles 1 and 2, each of mass $$m$$, moving in opposite directions with same speed $$\mathbf{v}$$ along parallel lines. At a particular instant $$\mathbf{r}_1$$ and $$\mathbf{r}_2$$ are their respective position vectors drawn from point $$A$$ which is in the plane of the parallel lines. Choose the correct options.
The net external torque on a system of particles about an axis is zero. Which of the following are compatible with it?
Figure shows a lamina in $$x y$$-plane. Two axes $$z$$ and $$z^{\prime}$$ pass perpendicular to its plane. A force $$\mathbf{F}$$ acts in the plane of lamina at point $$P$$ as shown. Which of the following are true? (The point $$P$$ is closer to $$z^{\prime}$$-axis than the $$z$$-axis.)
With reference to figure of a cube of edge $$a$$ and mass $$m$$, state whether the following are true or false. (0 is the centre of the cube.)
The centre of gravity of a body on the earth coincides with its centre of mass for a small object whereas for an extended object it may not. What is the qualitative meaning of small and extended in this regard? For which of the following two coincides? A building, a pond, a lake, a mountain?
Why does a solid sphere have smaller moment of inertia than a hollow cylinder of same mass and radius, about an axis passing through their axes of symmetry?
The variation of angular position $$\theta$$, of a point on a rotating rigid body, with time $$t$$ is shown in figure. Is the body rotating clockwise or anti-clockwise?
A uniform cube of mass $$m$$ and side $$a$$ is placed on a frictionless horizontal surface. A vertical force $$F$$ is applied to the edge as shown in figure. Match the following (most appropriate choice)
| (a) | $$ m g / 4<F<m g / 2 $$ |
(i) | Cube will move up. |
|---|---|---|---|
| (b) | $$F > mg/2$$ | (ii) | Cube will not exhibit motion. |
| (c) | $$F > mg$$ | (iii) | Cube will begin to rotate and slip at A. |
| (d) | $$F=mg/4$$ | (iv) | Normal reaction effectively at a/3 from A, no motion. |
A uniform sphere of mass $$m$$ and radius $$R$$ is placed on a rough horizontal surface (figure). The sphere is struck horizontally at a height $$h$$ from the floor. Match the following
| (a) | $$h=R/2$$ | (i) | Sphere rolls without slipping with a constant veloci8ty and no loss of energy. |
|---|---|---|---|
| (b) | $$h > R$$ | (ii) | Sphere spins clockwise, loses energy by friction. |
| (c) | $$h > 3R/2$$ | (iii) | Sphere spins anti-clockwise, loses energy by friction. |
| (d) | $$h=7R/5$$ | (iv) | Sphere has only a translational motion, loses energy by friction. |
The vector sum of a system of non-collinear forces acting on a rigid body is given to be non-zero. If the vector sum of all the torques due to the system of forces about a certain point is found to be zero, does this mean that it is necessarily zero about any arbitrary point?
A wheel in uniform motion about an axis passing through its centre and perpendicular to its plane is considered to be in mechanical (translational plus rotational) equilibrium because no net external force or torque is required to sustain its motion. However, the particles that constitute the wheel do experience a centripetal the acceleration directed towards the centre. How do you reconcile this fact with the wheel being in equilibrium?
How would you set a half wheel into uniform motion about an axis passing through the centre of mass of the wheel and perpendicular to its plane? Will you require external forces to sustain the motion?
A door is hinged at one end and is free to rotate about a vertical axis (figure). Does its weight cause any torque about this axis? Give reason for your answer.
$$(n-1)$$ equal point masses each of mass $m$ are placed at the vertices of a regular n-polygon. The vacant vertex has a position vector a with respect to the centre of the polygon. Find the position vector of centre of mass.
Find the centre of mass of a uniform (a) half-disc, (b) quarter-disc.
Two discs of moments of inertia $$I_1$$ and $$I_2$$ about their respective axes (normal to the disc and passing through the centre), and rotating with angular speed $$\omega_1$$ and $$\omega_2$$ are brought into contact face to face with their axes of rotation coincident.
(a) Does the law of conservation of angular momentum apply to the situation? Why?
(b) Find the angular speed of the two discs system.
(c) Calculate the loss in kinetic energy of the system in the process.
(d) Account for this loss.
A disc of radius $$R$$ is rotating with an angular $$\omega_0$$ about a horizontal axis. It is placed on a horizontal table. The coefficient of kinetic friction is $$\mu_\kappa$$.
(a) What was the velocity of its centre of mass before being brought in contact with the table?
(b) What happens to the linear velocity of a point on its rim when placed in contact with the table?
(c) What happens to the linear speed of the centre of mass when disc is placed in contact with the table?
(d) Which force is responsible for the effects in (b) and (c)?
(e) What condition should be satisfied for rolling to begin?
(f) Calculate the time taken for the rolling to begin.
Two cylindrical hollow drums of radii $$R$$ and $$2 R$$, and of a common height $$h$$, are rotating with angular velocities $$\omega$$ (anti-clockwise) and $$\omega$$ (clockwise), respectively. Their axes, fixed are parallel and in a horizontal plane separated by $$3 R+\delta$$. They are now brought in contact $$(\delta \rightarrow 0)$$
(a) Show the frictional forces just after contact.
(b) Identify forces and torques external to the system just after contact.
(c) What would be the ratio of final angular velocities when friction ceases?
A uniform square plate $$S$$ (side $$c$$) and a uniform rectangular plate $$R$$ (sides $$b, a$$) have identical areas and masses.
Show that
(a) $$I_{x R} / I_{x S}<1$$
(b) $$I_{y R} / I_{y s}>1$$
(c) $I_{z R} / I_{z S}>1$
A uniform disc of radius $$R$$, is resting on a table on its rim. The coefficient of friction between disc and table is $$\mu$$ (figure). Now, the disc is pulled with a force $$F$$ as shown in the figure. What is the maximum value of $$F$$ for which the disc rolls without slipping?
