Derivation of Lens Maker Formula
Lenses of different focal lengths are used for various optical instruments. The focal length of a lens depends upon the refractive index of the material of the lens and the radii of curvatures of the two surfaces. The derivation of lens maker formula is provided here so that aspirants can understand the concept more effectively. The lens maker formula is commonly used by lens manufacturers for manufacturing lenses of desired focal length.
Lens Maker Formula Derivation
The following assumptions are taken for the derivation of lens maker formula.
- Let us consider the thin lens shown in the image above with 2 refracting surfaces having the radii of curvatures R1 and R2 respectively.
- Let the refractive indices of the surrounding medium and the lens material be n1 and n2 respectively.
The complete derivation of lens maker formula is described below. Using the formula for refraction at a single spherical surface we can say that,
For the first surface,
For the second surface,
Now adding equation (1) and (2),
When u = ∞ and v = f
Therefore we can say that,
Where μ is the refractive index of the material.
This is the lens maker formula derivation. Check the limitations of the lens maker’s formula to understand the lens maker formula derivation is a better way.
Limitations of the lens maker’s formula
- The lens should not be thick so that the space between the 2 refracting surfaces can be small.
- The medium used on both sides of the lens should always be same.