Home
Class 11
PHYSICS
A body executing simple harmonic motion ...

A body executing simple harmonic motion makes 120 oscillations in one minute. Calculate (i) period (ii) frequency and (iii) angular frequency.

Text Solution

AI Generated Solution

To solve the problem step by step, we will calculate the period, frequency, and angular frequency of a body executing simple harmonic motion that makes 120 oscillations in one minute. ### Step 1: Calculate the Period (T) The period (T) is defined as the time taken to complete one full oscillation. Given: - Total oscillations = 120 - Total time = 1 minute = 60 seconds ...
Promotional Banner

Topper's Solved these Questions

  • OSCILLATIONS

    ICSE|Exercise ADDITIONAL SOLVED PROBLEMS|11 Videos

  • OSCILLATIONS

    ICSE|Exercise SHORT ANSWER QUESTIONS WITH ANSWER|20 Videos

  • MOTION IN FLUIDS

    ICSE|Exercise SELECTED PROBLEMS (FROM POISEUILLE.S FORMULA) |19 Videos

  • PROPERTIES OF MATTER

    ICSE|Exercise MODULE 4 ( TEMPERATURE ) UNSOLVED PROBLEMS|12 Videos

Similar Questions

Explore conceptually related problems

A simple pendulum completes 40 oscillations in one minute. Find its frequency

As shown in figure in a simple harmonic motion oscillator having identical four springs has time period

The position and velocity of a particle executing simple harmonic motion at t = 0 are given by 3 cm and 8 cm s^(-1) respectively . If the angular frequency of the particle is 2 "rad s" ^(-1) , then the amplitude of oscillation (in cm) is

Explain (i) natural oscillation (ii) natural frequency.

A particle executing simple harmonic motion with time period T. the time period with which its kinetic energy oscillates is

The restoing force acting on a body executing simple harmonic motion is 16 N when the body is 4 cm away from the equilibrium position. Calculate the spring constant.

The acceleration-displacement (a-X) graph of a particle executing simple harmonic motion is shown in the figure. Find the frequency of oscillation.

A particle executing simple harmonic motion of amplitude 5 cm has maximum speed of 31.4 cm / s . The frequency of its oscillation is

Assertion : We can call circular motion also as simple harmonic motion. Reason : Angular velocity in uniform circular motion and angular frequency in simple harmonic motion have the same meanings.

A body of mass 4 kg is made to oscillate on a spring of force constant 10 N/m. Calculate (i) angular frequency (2) frequency of vibration and (3) time period of vibration.