GE-169›Double-Slit Interference and Related Problems

Applied PhysicsTopic 40 of 45

Double-Slit Interference and Related Problems

10 minread

1,719words

Intermediatelevel

Double-Slit Interference and Related Problems

Double-slit interference is one of the most important experiments in wave optics that demonstrates the wave nature of light. It shows how two coherent light sources can produce interference patterns when they pass through two closely spaced slits, leading to regions of constructive and destructive interference. This concept has broader applications not only in optics but also in sound, water waves, and quantum mechanics (e.g., electron diffraction).

1. Young's Double-Slit Experiment

In the Young's Double-Slit Experiment, a monochromatic light source (such as a laser) shines through two narrow slits, creating two coherent light sources. As these light waves pass through the slits, they interfere with each other and produce an interference pattern on a screen placed behind the slits.

Key Features of the Experiment:

Monochromatic Light: The light source must emit light of a single wavelength (or very narrow range of wavelengths) for a clear and sharp interference pattern to emerge.
Coherent Sources: The two slits act as coherent sources, meaning they emit light waves that maintain a constant phase relationship.
Pattern Formation: The interference pattern consists of alternating bright and dark bands on the screen.

Interference Pattern:

Constructive Interference (bright fringes) occurs when the path difference between the two waves is an integer multiple of the wavelength ( $m\lambda$ ).
Destructive Interference (dark fringes) occurs when the path difference is an odd multiple of half the wavelength ( $\left( m + \frac{1}{2} \right)\lambda$ ).

2. Derivation of the Interference Pattern

In the Young's double-slit experiment, the angular position of the interference fringes can be derived using basic principles of wave optics.

Variables:

$\lambda$ = Wavelength of the light
$d$ = Distance between the slits
$L$ = Distance from the slits to the screen
$y_m$ = Position of the m-th order fringe on the screen
$m$ = Fringe order (0, 1, 2, 3, …)
$\theta$ = Angle of the fringe relative to the central maximum (m = 0)

Constructive Interference:

For constructive interference, the path difference between the two waves from the slits must be an integer multiple of the wavelength:

\Delta L = m\lambda

Where $m = 0, 1, 2, \dots$ is the order of the fringe.

Using geometry, we can express the position of the m-th bright fringe:

y_m = \frac{m \lambda L}{d}

Where:

$y_m$ is the distance from the central maximum (m = 0) to the m-th bright fringe on the screen,
$d$ is the distance between the slits,
$L$ is the distance from the slits to the screen.

Destructive Interference:

For destructive interference, the path difference must be an odd multiple of half the wavelength:

\Delta L = \left( m + \frac{1}{2} \right)\lambda

The position of the m-th dark fringe is given by:

y_m = \frac{\left( m + \frac{1}{2} \right) \lambda L}{d}

3. Double-Slit Interference: Problem Solving

Example 1: Finding Fringe Separation

Problem: In a Young's double-slit experiment, light with a wavelength of $600 \, \text{nm}$ passes through slits that are $0.2 \, \text{mm}$ apart. The screen is placed $2 \, \text{m}$ away from the slits. Find the separation between adjacent bright fringes on the screen.

Solution:

Given:
- Wavelength, $\lambda = 600 \, \text{nm} = 6 \times 10^{-7} \, \text{m}$
- Distance between slits, $d = 0.2 \, \text{mm} = 2 \times 10^{-4} \, \text{m}$
- Distance to the screen, $L = 2 \, \text{m}$
To find the fringe separation, we use the formula for the distance between adjacent bright fringes (i.e., the separation between two consecutive $m$ values):

\Delta y = \frac{\lambda L}{d}

Substituting the given values:

\Delta y = \frac{(6 \times 10^{-7}) \times 2}{2 \times 10^{-4}} = 6 \times 10^{-3} \, \text{m} = 6 \, \text{mm}

So, the separation between adjacent bright fringes is $6 \, \text{mm}$ .

Example 2: Finding the Position of the First Dark Fringe

Problem: In the same experiment, find the position of the first dark fringe on the screen.

Solution:

Using the formula for the position of the m-th dark fringe (for $m = 1$ ):

y_1 = \frac{\left( 1 + \frac{1}{2} \right) \lambda L}{d} = \frac{\left( \frac{3}{2} \right) \lambda L}{d}

Substitute the known values:

y_1 = \frac{(1.5) \times (6 \times 10^{-7}) \times 2}{2 \times 10^{-4}} = 9 \times 10^{-3} \, \text{m} = 9 \, \text{mm}

Thus, the first dark fringe appears at a distance of $9 \, \text{mm}$ from the central maximum.

Example 3: Finding the Wavelength of Light from the Fringe Pattern

Problem: In a Young's double-slit experiment, the distance between adjacent bright fringes on the screen is $0.4 \, \text{cm}$ , and the distance from the slits to the screen is $1.5 \, \text{m}$ . The slits are $0.1 \, \text{mm}$ apart. Calculate the wavelength of the light used.

Solution:

Given:
- Fringe separation, $\Delta y = 0.4 \, \text{cm} = 4 \times 10^{-3} \, \text{m}$
- Distance to screen, $L = 1.5 \, \text{m}$
- Distance between slits, $d = 0.1 \, \text{mm} = 1 \times 10^{-4} \, \text{m}$
We can use the formula for the fringe separation to solve for the wavelength $\lambda$ :

\Delta y = \frac{\lambda L}{d}

Rearranging for $\lambda$ :

\lambda = \frac{\Delta y d}{L}

Substituting the known values:

\lambda = \frac{(4 \times 10^{-3}) \times (1 \times 10^{-4})}{1.5} = \frac{4 \times 10^{-7}}{1.5} = 2.67 \times 10^{-7} \, \text{m} = 267 \, \text{nm}

So, the wavelength of the light used is approximately $267 \, \text{nm}$ .

4. Effect of Changing Parameters on the Fringe Pattern

Increasing the wavelength $\lambda$ : The fringe separation $\Delta y$ increases. This means that with longer wavelengths, the fringes spread further apart.
Increasing the slit separation $d$ : The fringe separation $\Delta y$ decreases. Smaller slit spacing makes the interference fringes closer together.
Increasing the distance to the screen $L$ : The fringe separation $\Delta y$ increases. Moving the screen further away from the slits makes the fringes spread out.

5. Quantum Mechanical Aspect: Matter Waves

In quantum mechanics, the wave-particle duality of matter means that particles like electrons also exhibit interference patterns, similar to light. This phenomenon was observed in the electron double-slit experiment, where electrons, when passed through two slits, form an interference pattern, just like light waves do. This result shows that particles have wave-like properties and can exhibit interference under certain conditions.

6. Summary of Key Concepts

Double-slit interference occurs when two coherent light sources (slits) produce an interference pattern on a screen.
The positions of the bright and dark fringes depend on the wavelength of the light, the slit separation, and the distance to the screen.
Constructive interference occurs when the path difference is an integer multiple of the wavelength, and destructive interference occurs when the path difference is an odd multiple of half the wavelength.
Changing parameters such as wavelength

Previous topic 39

Two Source Interference

Next topic 41

Interference from Thin Films

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GE-169›Double-Slit Interference and Related Problems

Applied PhysicsTopic 40 of 45

Double-Slit Interference and Related Problems

10 minread

1,719words

Intermediatelevel

Double-Slit Interference and Related Problems

1. Young's Double-Slit Experiment

Key Features of the Experiment:

Monochromatic Light: The light source must emit light of a single wavelength (or very narrow range of wavelengths) for a clear and sharp interference pattern to emerge.
Coherent Sources: The two slits act as coherent sources, meaning they emit light waves that maintain a constant phase relationship.
Pattern Formation: The interference pattern consists of alternating bright and dark bands on the screen.

Interference Pattern:

Constructive Interference (bright fringes) occurs when the path difference between the two waves is an integer multiple of the wavelength ( $m\lambda$ ).
Destructive Interference (dark fringes) occurs when the path difference is an odd multiple of half the wavelength ( $\left( m + \frac{1}{2} \right)\lambda$ ).

2. Derivation of the Interference Pattern

In the Young's double-slit experiment, the angular position of the interference fringes can be derived using basic principles of wave optics.

Variables:

$\lambda$ = Wavelength of the light
$d$ = Distance between the slits
$L$ = Distance from the slits to the screen
$y_m$ = Position of the m-th order fringe on the screen
$m$ = Fringe order (0, 1, 2, 3, …)
$\theta$ = Angle of the fringe relative to the central maximum (m = 0)

Constructive Interference:

For constructive interference, the path difference between the two waves from the slits must be an integer multiple of the wavelength:

\Delta L = m\lambda

Where $m = 0, 1, 2, \dots$ is the order of the fringe.

Using geometry, we can express the position of the m-th bright fringe:

y_m = \frac{m \lambda L}{d}

Where:

$y_m$ is the distance from the central maximum (m = 0) to the m-th bright fringe on the screen,
$d$ is the distance between the slits,
$L$ is the distance from the slits to the screen.

Destructive Interference:

For destructive interference, the path difference must be an odd multiple of half the wavelength:

\Delta L = \left( m + \frac{1}{2} \right)\lambda

The position of the m-th dark fringe is given by:

y_m = \frac{\left( m + \frac{1}{2} \right) \lambda L}{d}

3. Double-Slit Interference: Problem Solving

Example 1: Finding Fringe Separation

Solution:

Given:
- Wavelength, $\lambda = 600 \, \text{nm} = 6 \times 10^{-7} \, \text{m}$
- Distance between slits, $d = 0.2 \, \text{mm} = 2 \times 10^{-4} \, \text{m}$
- Distance to the screen, $L = 2 \, \text{m}$
To find the fringe separation, we use the formula for the distance between adjacent bright fringes (i.e., the separation between two consecutive $m$ values):

\Delta y = \frac{\lambda L}{d}

Substituting the given values:

\Delta y = \frac{(6 \times 10^{-7}) \times 2}{2 \times 10^{-4}} = 6 \times 10^{-3} \, \text{m} = 6 \, \text{mm}

So, the separation between adjacent bright fringes is $6 \, \text{mm}$ .

Example 2: Finding the Position of the First Dark Fringe

Problem: In the same experiment, find the position of the first dark fringe on the screen.

Solution:

Using the formula for the position of the m-th dark fringe (for $m = 1$ ):

y_1 = \frac{\left( 1 + \frac{1}{2} \right) \lambda L}{d} = \frac{\left( \frac{3}{2} \right) \lambda L}{d}

Substitute the known values:

y_1 = \frac{(1.5) \times (6 \times 10^{-7}) \times 2}{2 \times 10^{-4}} = 9 \times 10^{-3} \, \text{m} = 9 \, \text{mm}

Thus, the first dark fringe appears at a distance of $9 \, \text{mm}$ from the central maximum.

Example 3: Finding the Wavelength of Light from the Fringe Pattern

Solution:

Given:
- Fringe separation, $\Delta y = 0.4 \, \text{cm} = 4 \times 10^{-3} \, \text{m}$
- Distance to screen, $L = 1.5 \, \text{m}$
- Distance between slits, $d = 0.1 \, \text{mm} = 1 \times 10^{-4} \, \text{m}$
We can use the formula for the fringe separation to solve for the wavelength $\lambda$ :

\Delta y = \frac{\lambda L}{d}

Rearranging for $\lambda$ :

\lambda = \frac{\Delta y d}{L}

Substituting the known values:

\lambda = \frac{(4 \times 10^{-3}) \times (1 \times 10^{-4})}{1.5} = \frac{4 \times 10^{-7}}{1.5} = 2.67 \times 10^{-7} \, \text{m} = 267 \, \text{nm}

So, the wavelength of the light used is approximately $267 \, \text{nm}$ .

4. Effect of Changing Parameters on the Fringe Pattern

Increasing the wavelength $\lambda$ : The fringe separation $\Delta y$ increases. This means that with longer wavelengths, the fringes spread further apart.
Increasing the slit separation $d$ : The fringe separation $\Delta y$ decreases. Smaller slit spacing makes the interference fringes closer together.
Increasing the distance to the screen $L$ : The fringe separation $\Delta y$ increases. Moving the screen further away from the slits makes the fringes spread out.

5. Quantum Mechanical Aspect: Matter Waves

6. Summary of Key Concepts

Double-slit interference occurs when two coherent light sources (slits) produce an interference pattern on a screen.
The positions of the bright and dark fringes depend on the wavelength of the light, the slit separation, and the distance to the screen.
Constructive interference occurs when the path difference is an integer multiple of the wavelength, and destructive interference occurs when the path difference is an odd multiple of half the wavelength.
Changing parameters such as wavelength

Previous topic 39

Two Source Interference

Next topic 41

Interference from Thin Films

Past Papers

Open this section to load past papers

Click on Show Past Papers to see past papers.