MCQ Questions for Class 11 Engineering Physics Oscillations Quiz 11

A cubical block of side 'a' is floating in a fixed and closed cylindrical container of radius $$2a$$ kept on the ground. Density of the block is $$\rho$$, whereas the density of liquid is $$2\rho$$. Container is made up of conducting wall so that the temperature remains constant. A piston is mounted in the cylinder which can move inside the cylinder without friction. If piston oscillates with large amplitude A.

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The cube will remain stationary
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The cube will oscillate with very small amplitude in same phase with piston
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The cube will oscillate with very small amplitude in opposite phase with piston
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The cube will oscillate with amplitude A

(b) When the block is at position $$B$$ on the graph. its

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position and velocity are positive
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position is positive and velocity is negative
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position in negative and velocity is positive
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position and velocity are negative

When the block is at position $$C$$ on the graph, its

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velocity is maximum and acceleration is zero
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velocity if minimum and acceleration is zero
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velocity is zero and acceleration is negative
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velocity is zero and acceleration if positive

(b) Position of the block as a function of time can now be expressed as

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$$x=2\sqrt{3}\cos\left(16t+\dfrac{\pi}{6}\right)cm$$
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$$x=3\cos\left(16t+\dfrac{\pi}{3}\right)cm$$
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$$x=3.8\cos\left(16t+\dfrac{\pi}{6}\right)cm$$
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$$x=3.2\cos \left(16t+\dfrac{\pi}{4}\right)cm$$

A particle executes SHM starting from its mean position at $$t=0$$. If its velocity is $$\sqrt 3 b\omega$$, when it is at a distance $$b$$ from the mean position, when $$\omega==2\pi /T$$, the time taken by the particle to move from $$b$$ to the extreme position on the same side is

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$$\dfrac{5\pi}{6\omega}$$
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$$\dfrac{\pi}{3\omega}$$
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$$\dfrac{\pi}{2\omega}$$
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$$\dfrac{\pi}{4\omega}$$

A cork floating on the pond water executes a simple harmonic motion, moving up and down over a range of $$4\ cm$$. The time period of the motion is $$1\ s$$. At $$t=0$$, the cork is at its lowest position of oscillation, the position and velocity of the cork at $$t=10.5\ s$$, would be

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$$2\ cm$$ above the mean position, $$0\ m/s$$
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$$2\ cm$$ below the mean position, $$0\ m/s$$
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$$1\ cm$$ above the mean position, $$2\sqrt 3 \pi \ m/s$$ up
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$$1\ cm$$ below the mean position, $$2\sqrt 3 \pi \ m/s$$ up

A simple pendulum is oscillating between extreme positions $$P$$ and $$Q$$ about the mean position $$O$$. Which of the the following statements are true about the motion of pendulum?

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At point $$O$$, the acceleration of the bob is difference from zero.
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The acceleration of the bob is constant throughout the oscillation
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The tension in the string is constant throughout the oscillation
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The tension is maximum at $$O$$ and minimum at $$P$$ or $$Q$$

(b) Velocity of the block as a function of time can be expressed as

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$$v=-48\sin \left(16t\dfrac{\pi}{2}\right)cm/s$$
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$$v=-48\sin \left(16t\dfrac{\pi}{3}\right)cm/s$$
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$$v=-56\sin \left(16t\dfrac{\pi}{4}\right)cm/s$$
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$$v=-56\sin \left(16t\dfrac{\pi}{6}\right)cm/s$$

The displacement of a particle is represented by the equation
$$y = 3 \cos \left [ \dfrac{\pi }{4} - 2\omega t \right ]$$ the motion of the particle is

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Simple harmonic with period $$\dfrac{2\pi }{\omega } $$
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Simple harmonic with period $$\dfrac{\pi }{\omega } $$
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Periodic but not simple harmonic.
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Non-periodic.

The displacement of a particle is represented by the equation $$y = \sin ^{3}\omega t$$ The motion is

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non-periodic.
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Periodic but not simple harmonic.
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Simple harmonic with period $$\dfrac{2\pi }{\omega} $$
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Simple harmonic with period $$\dfrac{\pi }{\omega} $$

Which of the following statements are true for a stationary wave?

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Every particle has a fixed amplitude which is different from the amplitude of its nearest particle.
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All the particles cross their mean position at the same time.
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All the particles are oscillating with same amplitude.
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There is no net transfer of energy across any plane.
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There are some particles which are always at rest.

Which of the following statements is /are true for a simple harmonic oscillator?

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Force acting is directly proportional to displacement from the mean position and opposite to it.
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Motion is periodic.
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Acceleration of the oscillator is constant.
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The velocity is periodic.

A ball thrown by a boy from a roof-top has oscillatory motion.

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True
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False

Motion of a ball bearing inside a smooth curved bowl, when released from a point slightly above the lower point is

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Simple harmonic motion.
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Non-periodic motion.
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Periodic motion.
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Periodic but not SHM

The displacement time graph of a particle executing S.H.M. is shown in figure Which of the following statement is/are true?

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The force is zero at $$t = \dfrac{3 T}{4}$$
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The acceleration is maximum at $$t = \dfrac{4 T}{4}$$
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The velocity is maximum at $$t = \dfrac{T}{4}$$
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The P.E. is equal to K.E. of oscillation at $$t = \dfrac{T}{2}$$

The relation acceleration and displacement of four particles are given below.
Which one particle is executing simple harmonic motion?

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$$a_{x} = + 2x$$
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$$a_{x} = 2x^{2}$$
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$$a_{x} = - 2x^{2}$$
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$$a_{x} = - 2x$$

Figure shows the circular motion of a particle. The radius of the circle, The period, sense of revolution and the initial position are indicated on the figure. The simple harmonic motion of the x-projection of the radius vector of the rotating particle P is

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$$x(t) = B \sin \left ( \dfrac{2 \pi t}{30} \right )$$
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$$x(t) = B \cos \left ( \dfrac{\pi t}{15} \right )$$
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$$x(t) = B \sin \left ( \dfrac{\pi t}{15} + \dfrac{\pi }{2} \right )$$
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$$x(t) = B \cos \left ( \dfrac{\pi t}{15} + \dfrac{\pi }{2} \right )$$

Two masses $$m_1$$ and $$m_2$$ are suspended together by a massless springs of constant $$k$$. When the masses are in equilibrium, $$m_1$$ is removed without disturbing the system. Then the angular frequency of oscillation of $$m_2$$ is

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$$\sqrt{\dfrac{k}{m_1}}$$
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$$\sqrt{\dfrac{k}{m_2}}$$
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$$\sqrt{\dfrac{k}{m_1+m_2}}$$
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$$\sqrt{\dfrac{k}{m_1m_2}}$$

What is constant in S.H.M.

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Restoring force
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Kinetic energy
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Potential energy
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Periodic time

A system exhibiting $$S.H.M$$ must possess

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Inertia only
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Elasticity as well as inertia
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Elasticity inertia and an external force
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Elasticity only

Which of the following is not true? In the case of a simple pendulum for small amplitudes the periodic of oscillation is

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Directly proportional to square root of the length of the pendulum
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Inversely proportional to square root of the acceleration due to gravity
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Dependent on the mass, size and material of the bob
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Independent of the amplitude

A mass $$m$$ is suspedend from the two coupled springs connected in series. The force constant for springs are $$K_1$$ and $$K_2$$. The time period of the suspended mass will be

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$$T=2\pi \sqrt{\left(\dfrac{m}{K_1+K_2}\right)}$$
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$$T=2\pi \sqrt{\left(\dfrac{m}{K_1+K_2}\right)}$$
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$$T=2\pi \sqrt{\left(\dfrac{m(K_1+K_2)}{K_1K_2}\right)}$$
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$$T=2\pi \sqrt{\left(\dfrac{mK_1K_2}{K_1+K_2}\right)}$$

A simple pendulum is sec up in a trolley which moves to the right with an acceleration $$a$$ on a horizontal plane. Then the thread of the pendulum in the mean position makes an angle $$\theta$$ with the vertical

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$$\tan^{-1} \dfrac ag$$ in the forward direction
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$$\tan^{-1} \dfrac ag$$ in the backward direction
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$$\tan^{-1} \dfrac ga$$ in the backrward direction
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$$\tan^{-1} \dfrac ga$$ in the forward direction

The period of a simple pendulum is doubled, when

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Its length is doubled
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The mass of the bob is doubled
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Its length is made four times
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The mass of the bob and the length of the pendulum are doubled

A particle moving along the $$x-$$axis execute simple harmonic motion, then the force acting on it is given by

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$$-A\ Kx$$
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$$A\ \cos \ (Kx)$$
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$$A\ exp \ (-Kx)$$
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$$A\ Kx$$

The period of simple pendulum is measured as $$T$$ in a stationary lift. If the lift moves upward with an acceleration of $$5\ g$$, the period will be

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The same
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Increased by $$3/5$$
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Decreased by $$2/3$$ times
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None of the above

Mark the wrong statement

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All S.H.M.s have fixed time period
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All motion having same time period are S.H.M.
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In S.H.M. total energy is proportional to square of amplitude
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Phase constant of S.H.M. depends upon initial conditions

The time period of a simple pendulum is $$2$$ sec. If its length is increased $$4$$ times, then its period becomes

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$$16$$ sec
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$$12$$ sec
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$$8$$ sec
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$$4$$ sec

A block is placed on a frictionless horizontal table. The mass of the block is $$m$$ and springs are attached on either side with force constants $$K_1$$ and $$K_2$$. If the block is displaced a little and left to oscillate, then the angular frequency of oscillation will be

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$$\left( \dfrac{K_1+K_2}{m}\right)^{1/2}$$
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$$\left[ \dfrac{K_1K_2}{m(K_1+K_2)}\right]^{1/2}$$
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$$\left[ \dfrac{K_1K_2}{(K_1-K_2)m}\right]^{1/2}$$
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$$\left[ \dfrac{K_1^2+K_2^2}{(K_1+K_2)m}\right]^{1/2}$$

In a simple pendulum, the period of oscillation $$T$$ is released to length of the pendulum $$l$$ as

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$$\dfrac {l}{T}=$$ constant
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$$\dfrac {l^2}{T}=$$ constant
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$$\dfrac {l}{T^2}=$$ constant
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$$\dfrac {l^2}{T^2}=$$ constant

Graph between velocity and displacement of a particle, executing S.H.M. is

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A straight line
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A parabola
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A hyperbola
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An ellipse

If the length of simple pendulum is increased by $$300\%$$,then the time period will be increased by

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$$100\%$$
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$$200\%$$
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$$300\%$$
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$$400\%$$

A simple pendulum is executing simple harmonic motion with a time period $$T$$. If the length of the pendulum is increased by $$21\%$$, the percentage increase in the time period of the pendulum of increased length is

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$$10\%$$
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$$21\%$$
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$$30\%$$
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$$50\%$$

The force constants of two springs are $$K_1$$ and $$K_2$$. Both are stretched till their elastic energies are equal. If the stretching forces are $$F_1$$ and $$F_2$$, then $$F_1 : F_2$$ is

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$$K_1: K_2$$
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$$K_2: K_1$$
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$$\sqrt{K_1}: \sqrt{K_2}$$
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$$K_1^2: K_2^2$$

If a simple harmonic oscillator has got a displacement of $$0.02\ m $$ and acceleration equal to $$2.0ms^{-2}$$ at any time, the angular frequency of the oscillator is equal to

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$$10\ rad\ s^{-1}$$
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$$0.1\ rad\ s^{-1}$$
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$$100\ rad\ s^{-1}$$
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$$1\ rad\ s^{-1}$$

What will be the force constant of the spring system shown in the figure

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$$\dfrac{K_1}{2}+K_2$$
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$$\left[ \dfrac{1}{2K_1}+\dfrac{1}{K_2}\right]^{-1}$$
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$$\dfrac{1}{2K_1}+\dfrac{1}{K_2}$$
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$$\left[ \dfrac{2}{K_1}+\dfrac{1}{K_1}\right]^{-1}$$

A simple pendulum oscillates in air with time period $$T$$ and amplitude $$A$$. As the time passes

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$$T$$ and $$A$$ both decrease
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$$T$$ increases and $$A$$ is constant
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$$T$$ increases and $$A$$ decreases
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$$T$$ decreases and $$A$$ is constant

Two simple pendulum of length $$1.44\ m$$ and $$1\ m$$ start swinging together. After how many vibrates will they again start swinging together

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$$5$$ oscillations of smaller pendulum
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$$6$$ oscillations of smaller pendulum
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$$4$$ oscillation of bigger pendulum
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$$6$$ oscillation of bigger pendulum

A simple pendulum is set into vibrations. The bob of the pendulum comes to rest after some time due to

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Air friction
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Moment of inertia
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Weight of the bob
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Combination of all the above

The velocity of simple pendulum is maximum at

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Extremes
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Half displacement
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Mean position
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Every where

The time period of simple pendulum when it is made to oscilate on the surface of moon

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Increase
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Decrease
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Remains changed
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Becomes infinite

On a planet a freely falling body takes $$2\ sec$$ when it is dropped from a height of $$8\ m$$, the time period of simple pendulum of length $$1\ m$$ on that planet is

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$$3.14\ sec$$
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$$6.28\ sec$$
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$$1.57\ sec$$
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None of these

A particle on the trough of a wave at any instant will come to the mean position after a time (t = time period) [KCET 2005]

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T/2
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T/4
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T
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2T

The graph shows variation of displacement of a particle performing S.H.M. with time t. which of the following statements is correct from the graph ?

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The acceleration is maximum at time T .
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The force is maximum at time $$ \frac { 3T}{4} $$
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The velocity is zero at time $$ \frac { T}{2 } $$
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The kinetic energy is equal to total energy at a time $$ \frac {T}{4} $$

A set of keys on the end of a string is swung steadily in a horizontal circle. In one trial, it moves at speed $$v$$ in a circle of radius $$r$$. In a second trial, it moves at a higher speed $$4v$$ in a circle of radius $$4r$$. In the second trial, how does the period of its motion compare with its period in the first trial?

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It is the same as in the first trial.
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It is $$4$$ times larger.
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It is one-fourth as large.
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It is $$16$$ times larger.
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It is one-sixteenth as large.

In the above question, the velocity of the rear 2 kg block after it separates from the spring will be :

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0 m/s
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5 m/s
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10 m/s
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7.5 m/s

A mass $$m$$ is undergoing SHM in the vertical direction about the mean position $$y_{0}$$ with amplitude A and angular frequency $$\omega$$. At a distance $$y$$ from the mean position, the mass detaches from the spring. Assume that the spring contracts and does not obstruct the motion of $$m$$. Find the distance $$y^{*}$$ (measured from the mean position) such that the height $$h$$ attained by the block is maximum. $$(\mathrm{A}\mathrm{\omega})^{2}>g$$

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$$\dfrac{g}{\omega^2}$$
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$$\dfrac{2g}{\omega^2}$$
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$$\dfrac{g}{2\omega^2}$$
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None of these

A particle of mass m moves due to a conservative force with potential energy V(x) = $$\frac{Cx}{x^{2}+a^{2}}$$, where C and a are positive constants. The position(s) of stable equilibrium is/are given as

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$$x = + a$$ only
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$$x = - a$$ only
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$$x = - \dfrac{a}{2}$$ and $$+ \dfrac{a}{2}$$
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$$x = - a $$ and $$+ a $$

A particle of mass $$m$$ is bound by a linear potential $$U = Kr$$. It will have stationery circular motion with angular frequency $$\omega _{o}$$ with radius $$r$$ about the origin. If the particle is slightly disturbed from this circular motion, it will have small oscillations. If the angular frequency $$\omega$$ of the oscillations is $$\omega=\sqrt{n}\omega _{o}$$ The value of $$n$$ is :

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$$2$$
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$$3$$
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$$5$$
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$$6$$

A particle of mass m moves under a conservative force with potential energy. $$V(x)=\dfrac{ Cx}{\sqrt{a^2+x^2}, }$$ where $$C$$ and $$a$$are positive constants.

If the practicle starts from a point with velocity $$v$$, the range of values of $$v$$ for which it escapes to - $$\infty $$ are given by

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v $$< \sqrt{\dfrac{C}{ma}}$$
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v $$> \sqrt{\dfrac{C}{ma}}$$
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v $$> \sqrt{\dfrac{2C}{ma}}$$
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v $$< \sqrt{\dfrac{2C}{ma}}$$

CBSE Questions for Class 11 Engineering Physics Oscillations Quiz 11 - MCQExams.com

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Practice Class 11 Engineering Physics Quiz Questions and Answers

CBSE Questions for Class 11 Engineering Physics Oscillations Quiz 11 - MCQExams.com

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Practice Class 11 Engineering Physics Quiz Questions and Answers

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