H C Verma Solutions for Chapter: Simple Harmonic Motion, Exercise 4: EXERCISES

Assume that a tunnel is dug across the earth (radius=$R$) passing through its Centre. Find the time a particle takes to cover the length of the tunnel if:

(a) it is projected into the tunnel with a speed of $\sqrt{gR}$.

(b) it is released from a height $R$ above the tunnel.

(c) it is thrown vertically upward along the length of tunnel with a speed of $\sqrt{gR}$.

Assume that a tunnel is dug along a chord of the earth, at a perpendicular distance $\frac{R}{2}$ from the earth's Centre where $R$ is the radius of the earth. The wall of the tunnel is frictionless.

(a) Find the gravitational force exerted by the earth on a particle of mass $\mathrm{m}$ placed in the tunnel at a distance $\mathrm{x}$ from the Centre of the tunnel.

(b) Find the component of this force along the tunnel and perpendicular to the tunnel.

(c) Find the normal force exerted by the wall on the particle.

(d) Find the resultant force on the particle.

(e) Show that the motion of the particle in the tunnel is simple harmonic and find the time period.

A simple pendulum of length $l$ is suspended through the ceiling of an elevator. Find the time period of small oscillations if the elevator:
$\left(\mathrm{a}\right)$ is going up with an acceleration $a_0$
$\left(\mathrm{b}\right)$ is going down with an acceleration $a_0$ and
$\left(\mathrm{c}\right)$ is moving with a uniform velocity.

The ear-ring of a lady shown in figure has a $3 \mathrm{cm}$ long light suspension wire.
$\left(a\right)$ Find the time period of small oscillations if the lady is standing on the ground.
$\left(b\right)$ The lady now sits in a merry-go-round moving at $4 \mathrm{m} {\mathrm{s}}^{-1}$ in a circle of radius $2 \mathrm{m}.$ Find the time period of small oscillations of the ear-ring.

Find the time period of small oscillations of the following systems.

(a) A meter stick suspended through the $20 \mathrm{cm}$ mark.

(b) A ring of mass $\mathrm{m}$ and radius $\mathrm{r}$ suspended through a point on its periphery.

(c) A uniform square plate of edge $\mathrm{a}$ suspended through a corner.

(d) A uniform disc of mass $\mathrm{m}$ and radius $\mathrm{r}$ suspended through a point $r/2$ away from the Centre.

A closed circular wire hung on a nail in a wall undergoes small oscillations of amplitude $2^{°}$ and time period $2 s$. Find

(a) the radius of the circular wire,

(b) the speed of the particle the farthest away from the point of suspension as it goes through its mean position,

(c) the acceleration of this particle as it goes through its mean position and

(d) the acceleration of this particle when it is at an extreme position. (Take $g={\pi }^2 \mathrm{m} {\mathrm{s}}^{-2}$)

A particle is subjected to two simple harmonic motions of same time period in the same direction. The amplitude of the first motion is $3.0 \mathrm{cm}$ and that of the second is $4.0 \mathrm{cm}$. Find the resultant amplitude if the phase difference between the motions is

(a) $0^{°}$

(b) ${60}^{\circ }$

(c) ${90}^{\circ }$

A particle is subjected to two simple harmonic motions given by

$x_1=2.0\sin \left(100\mathrm{\pi }t\right)$ and $x_2=2.0\sin (120\mathrm{\pi }t+\mathrm{\pi }/3)$

Where $x$ is in $\mathrm{centimeter}$ and $t$ in $\mathrm{second}$. Find the displacement of the particle at:

$\left(\mathrm{a}\right) t=0·0125 \mathrm{s}$

$\left(\mathrm{b}\right) t=0.025 \mathrm{s}$