Optics: Optical instrument Resolution

Optical instrument Resolution :

1. Definition:

Theresolution is an important property of any optical instrument, such as a microscope, a telescope, a camera, or an eye.

The resolution of a certain optical device is its ability to show two points apart as separate points. In other words, it is the measure of its ability to produce separate images of two adjacent points objects. It is also called a resolving power of the device. For example, if the resolution of a device is equal to Re, and the two points are separated by S. If S < Re then the two points will be blended and seen blurred, if S > Re, then the two points will be seen separated as really they are.

2. Expression of the resolution

We have seen, with the Fraunhofer diffraction by a circular aperture, the expression of the angular position θ₁ related to Airy disk (the first dark ring surrounding the bright central maximum) is

sin θ₁ = 1.22 λ/d
λ is the wavelength of the used light in the device,
and d is the diameter of the circular aperture of the device.

θ₁ is small, so: θ₁ = 1.22 λ/d

We have:

r₁ = L θ₁ = 1.22 λL/d

The central maximum is more spread out for longer wavelengths and for smaller apertures.

For an optical instrument, the circular aperture is the lens (for a microscope, a camera) or the entrance mirror (for a telescope). The screen is an eye or detector.

Two points source of light (as stars for a telescope) produce two images that are diffraction patterns with no interference seen at the distance L (>> d) from the circular aperture.

The angle separation of the two points source from the eye (or detector) must allow to show two points, not one. For this, the resolution is defined by a criterion. We use the Rayleigh criterion. According to this criterion, two images are just resolved if the center of the central maximum of one pattern falls on the first dark ring of the other. Therefore,

Two point objects separated by an angle Δθ are clearly resolved when Δθ > Δθ_R

Δθ_R is the limiting angle of resolution for an optical instrument with an aperture diameter d receiving a light of wavelength λ. We have:

Δθ_R = 1.22 λ/d

in radian (rad)

For a microscope, the distance L is close to the focal length f of the objective, the spatial resolution is:
r₁ = θ₁ = 1.22 λL/d, or

Δl = 1.22 f λ/d

For a telescope, the aperture diameter "D" of its objective is large (about 5 meters), then we can take 1.22 = 1, so

Δθ_R = λ/D

3. Electronic microscope:

Instead of using light, we use electrons. We know that they behave as waves according to De Broglie formula:

λ = h/p

h is the Planck's constant, p the magnitude of the linear momentum, and λ the associated wavelength for the electron.

If E is the kinetic energy of the electron, E = mv²/2
Then
p = mv = m (2E/m)^1/2 = (2mE)^1/2
Using the De Broglie relationship p = h/λ yields:
λ = h/p = h/(2mE)^1/2
Therefore, the angular resolution power is:
Δθ_R = 1.22 λ/d = 1.22 h/d(2mE)^1/2

h (Planck's constant) = 6.63 × 10^-34 m² kg/s
m (electron mass) = 9.11 × 10^-31 kilograms
1 eV (electron volt) = 1.60 x 10^-19 joules
1 cm = 1.0 x 10^-2 m
Then:
Δθ_R = 1.22 h/d(2mE)^1/2 = 1.22 x 6.63 × 10^-34/(2m)^1/2 d(E)^1/2
= 1.22 x 6.63 × 10^-34/(2 x 9.11 × 10^-31 x 1.60 x 10^-19)^1/2 x 1.0 x 10^-2 d(E)^1/2 = 1.5 x 10^-9/d E^1/2

Δθ_R = 1.5 x 10^-9/dE^1/2
d in m, and E in eV

Δθ_R = 1.5 x 10^-7/dE^1/2

d in cm, and E in eV

4. Comparison: Δθ_R(light) and Δθ_R(electron)

If E = 1.0 eV , and d = 1.0 cm
Δθ_R = 1.5 x 10^-7 = 0.15 x 10^-6 rad = 0.15 µn;rad.

If we consider a yellow light with a wavelength of 580 nm, the resolution will be:
Δθ_R = 1.22 x 580x ^-9/1.0 x ^-2 708 x ^-7 rad = 71 µrad

The limiting resolution of an electron microscope is much higher than that of an optical microscope

Remark:

For an electron, the wavelength is λ = h/(2mE)^1/2 =
6.63 × 10^-34/(2x 9.11 × 10^-31x 1.60 x 10^-19E)^1/2 = 1.23 x 10^-9 /E^1/2

Therefore:

λ_electron = 1.23 nm/E^1/2

E in eV