9.1.4 Examples of SHM

Period of a Simple Pendulum & a Mass-Spring System

Two examples of simple harmonic oscillators are:
- A simple pendulum
- A mass-spring system
Considering equations related to the restoring force leads to expressions for the time periods of these scenarios
- These relationships are useful for investigating simple harmonic motion experimentally

Restoring Force Examples, downloadable IB Physics revision notes

For a pendulum, the restoring force is provided by the component of the bob's weight that is perpendicular to the tension in the pendulum's string. For a mass-spring system, the restoring force is provided by the force of the spring

Time Period of a Simple Pendulum

A simple pendulum is a type of simple harmonic oscillator
- The pendulum consists of a string and a bob (a weight, generally spherical) at the end
An oscillating pendulum can be modelled as simple harmonic motion when the angle of oscillation is small

9-1-4-pendulum-resolved-forces-v2

Forces on a pendulum when it is displaced. Assuming θ < 10°, the small angle approximation can be used to describe the time period of a simple pendulum such as this.

The restoring force, F, which returns an oscillating pendulum bob to the equilibrium position is:

F = −mg sin θ

Where:
- m = the mass of the pendulum bob (kg)
- g = acceleration due to gravity (m s⁻²)
- θ = angle between the bob and the vertical (°)

Using Newton’s Second Law:

F = ma = −mg sin θ

Both sides can be divided by m to give an expression for the acceleration, a:

a = −g sin θ

In this case, the small-angle approximation can be used, this is where sin θ ≅ θ
- This is assuming the angle the pendulum makes with the vertical is less than 10°
The expression for acceleration then becomes:

a = −gθ

The displacement, x, is equal to the length of the arc made by the bob, x = Lθ
- Where L = length of the pendulum (m)
Rearranging this for θ and substituting it into the acceleration equation gives:

$a = - g (\frac{x}{L})$

This equation shows:
- For small values of x, the condition for SHM is satisfied as restoring force, F is proportional to −x
- For large values of x, the acceleration of a simple pendulum is not proportional to the displacement

Using the defining equation of SHM:

$a = - ω^{2} x$

Where ω = angular frequency of the oscillation (rad s⁻¹)
Equating with the previously derived expression for acceleration leads to:

$- ω^{2} x = - g (\frac{x}{L})$

$ω^{2} = \frac{g}{L}$

$ω = \sqrt{\frac{g}{L}}$

The equation relating angular frequency, ω, and time period, T, is:

$ω = \frac{2 π}{T}$

Finally, combining these expressions leads to an equation for the time period of a simple pendulum:

$\frac{2 π}{T} = \sqrt{\frac{g}{L}}$

$T = 2 π \sqrt{\frac{L}{g}}$

Time Period of a Mass–Spring System

A mass-spring system is another type of simple harmonic oscillator
The restoring force, F, which returns a mass-spring system to its equilibrium position is given by:

F = −kx

Where:
- x = extension of the spring (m)
- k = spring constant (N m⁻¹)

Using Newton’s Second Law:

F = ma = −kx

Rearranging for the acceleration, a:

$a = - \frac{k}{m} x$

The defining equation of SHM is given by a = −ω²x

Where:
- m = mass (kg)
- ω = angular frequency (rad s⁻¹)

Combining these expressions for acceleration gives:

$- ω^{2} x = - \frac{k}{m} x$

This can be simplified to give an expression for ω:

$ω^{2} = \frac{k}{m}$

$ω = \sqrt{\frac{k}{m}}$

The equation relating angular frequency, ω, and time period, T, is:

$ω = \frac{2 π}{T}$

Finally, combining these expressions leads to an equation for the time period of a mass-spring system:

$\frac{2 π}{T} = \sqrt{\frac{k}{m}}$

$T = 2 π \sqrt{\frac{m}{k}}$

This equation applies for both a horizontal or vertical mass-spring system

A mass-spring system can be either vertical or horizontal. The time period equation applies to both.

The equation shows that:
- The higher the spring constant k, the stiffer the spring and hence, the shorter the time period of oscillation
- The time period (and hence, frequency) of a mass-spring system is independent of the force of gravity

A consequence of this is that oscillations would have the same time period on Earth and the Moon

Worked example

A swinging pendulum with a length of 80.0 cm has a maximum angle of displacement of 8°.

Determine the angular frequency of the oscillation.

Step 1: List the known quantities

- Length of the pendulum, L = 80 cm = 0.8 m
- Acceleration due to gravity, g = 9.81 m s⁻²

Step 2: Write down the relationship between angular frequency, ω, and period, T

$ω = \frac{2 π}{T}$

$T = \frac{2 π}{ω}$

Step 3: Write down the equation for the time period of a simple pendulum

$T = 2 π \sqrt{\frac{L}{g}}$

- This equation is valid for this scenario since the maximum angle of displacement is less than 10°

Step 4: Equate the two equations and rearrange for ω

$\frac{2 π}{ω} = 2 π \sqrt{\frac{L}{g}}$

$ω = \sqrt{\frac{g}{L}}$

Step 5: Substitute the values to calculate ω

$ω = \sqrt{\frac{9.81}{0.8}}$ = 3.50 rad s⁻¹

Step 6: State the final answer to the correct number of significant figures

ω = 3.5 rad s⁻¹

Worked example

Calculate the frequency of a mass of 2.0 kg attached to a spring with a spring constant of 0.9 N m^–1 oscillating with simple harmonic motion.

Step 1: Write down the known quantities

- Mass, m = 2.0 kg
- Spring constant, k = 0.9 N m⁻¹

Step 2: Write down the equation for the time period of a mass-spring system

$T = 2 π \sqrt{\frac{m}{k}}$

Step 3: Write down the equation relating time period, T, and frequency, f

$T = \frac{1}{f}$

Step 4: Combine the equations and rearrange for frequency, f

$\frac{1}{f} = 2 π \sqrt{\frac{m}{k}}$

$f = \frac{1}{2 π} \sqrt{\frac{k}{m}}$

Step 5: Substitute in the values to calculate frequency, f

$f = \frac{1}{2 π} \sqrt{\frac{0.9}{2}}$ = 0.1068 Hz

Step 6: State the final answer to the correct number of significant figures

f = 0.11 Hz

Exam Tip

Another area of physics where you may have seen the spring constant k is in Hooke's Law, where F = kx.

Exam questions commonly merge these topics together, so make sure you're familiar with the Hooke's Law equation too.

The motion of both pendula and mass-spring systems can be described in graphical and mathematical forms. As with other forms of motion, you should become familiar with both

Make sure to pay particular attention to the difference between the graph shapes produced when the oscillator starts at the equilibrium position or maximum displacement

Graphs and equations can be used to describe different aspects of oscillations

DP IB Physics: HL

Revision Notes

Period of a Simple Pendulum & a Mass-Spring System

Time Period of a Simple Pendulum

Time Period of a Mass–Spring System

Worked example

Worked example

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Author: Lindsay Gilmour