Critical Angle

As the angle of incidence at the boundary between a more dense and a less dense medium is increased, the angle of refraction also increases until it gets to 90°
When the angle of refraction is exactly 90° the light is refracted along the boundary (if the boundary is straight)
- At this point, the angle of incidence is known as the critical angle C
- This can only occur when light passes from a more dense to a less dense material
This angle can be found using the formula:

This can easily be derived from Snell’s law:

n₁ sin θ₁ = n₂ sin θ₂

Where:
- θ₁ = C
- θ₂ = 90°
- n₁ = n
- n₂ = 1 (air)

Worked example

A glass cube is held in contact with a liquid and a light ray is directed at the vertical face of the cube. The angle of incidence at the vertical face is 39° and the angle of refraction is 25° as shown in the diagram. The light ray is totally internally reflected at X. The refractive index of the glass cube is 1.45 and the refractive index of the liquid is 1.32. Total Internal Reflection Worked Example (1), downloadable AS & A Level Physics revision notes a) Complete the diagram to show the path of the ray beyond X

b) Calculate the critical angle for the ray at the glass-liquid boundary

a) Complete the diagram to show the path of the ray beyond X

Total Internal Reflection Worked Example (2), downloadable AS & A Level Physics revision notes

Step 1: Draw the reflected angle at the glass-liquid boundary

- When a light ray is reflected, the angle of incidence = angle of reflection
- Therefore, the angle of incidence (and reflection) is 90° – 25° = 65°

Step 2: Draw the refracted angle at the glass-air boundary

- At the glass-air boundary, the light ray refracts away from the normal
- Due to the reflection, the light rays are symmetrical to the other side

b) Calculate the critical angle for the ray at the glass-liquid boundary:

Step 1: Recall Snell's Law and rearrange to make critical angle the subject

n₁ sin θ₁ = n₂ sin θ₂

_{$\sin (C) = \frac{n_{2}}{n_{1}} \sin (θ_{2})$}

Step 2: Substitute in the known quantities

n₁ = refractive index of glass cube = 1.45
n₂ = refractive index of liquid = 1.32
θ₁ = C
θ₂ = 90° (The angle of refraction is 90° when at the critical angle)

$\sin (C) = \frac{n_{2}}{n_{1}} \sin (θ_{2})$

$C = \sin^{- 1} (\frac{1.32}{1.45})$

Step 3: Calculate the critical angle

$C = 65.55 °$

Examiner Tip

Always draw ray diagrams with a ruler, and make sure you're comfortable calculating unknown angles. The main rules to remember are:

Angles in a right angle add up to 90°
Angles on a straight line add up to 180°
Angles in any triangle add up to 180°

For angles in parallel lines, such as alternate and opposite angles, take a look at the OCR GCSE maths revision notes '7.1.1 Angles in Parallel Lines'

Critical Angle (Edexcel International A Level Physics)

Revision Note

Critical Angle

Worked example

Examiner Tip

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Author: Lindsay Gilmour