29 Introduction to Quantum Physics

# 233 29.4 Photon Momentum

- Relate the linear momentum of a photon to its energy or wavelength, and apply linear momentum conservation to simple processes involving the emission, absorption, or reflection of photons.
- Account qualitatively for the increase of photon wavelength that is observed, and explain the significance of the Compton wavelength.

# Measuring Photon Momentum

The quantum of EM radiation we call a photon has properties analogous to those of particles we can see, such as grains of sand. A photon interacts as a unit in collisions or when absorbed, rather than as an extensive wave. Massive quanta, like electrons, also act like macroscopic particles—something we expect, because they are the smallest units of matter. Particles carry momentum as well as energy. Despite photons having no mass, there has long been evidence that EM radiation carries momentum. (Maxwell and others who studied EM waves predicted that they would carry momentum.) It is now a well-established fact that photons * do* have momentum. In fact, photon momentum is suggested by the photoelectric effect, where photons knock electrons out of a substance. [link] shows macroscopic evidence of photon momentum.

[link] shows a comet with two prominent tails. What most people do not know about the tails is that they always point * away* from the Sun rather than trailing behind the comet (like the tail of Bo Peep’s sheep). Comet tails are composed of gases and dust evaporated from the body of the comet and ionized gas. The dust particles recoil away from the Sun when photons scatter from them. Evidently, photons carry momentum in the direction of their motion (away from the Sun), and some of this momentum is transferred to dust particles in collisions. Gas atoms and molecules in the blue tail are most affected by other particles of radiation, such as protons and electrons emanating from the Sun, rather than by the momentum of photons.

Not only is momentum conserved in all realms of physics, but all types of particles are found to have momentum. We expect particles with mass to have momentum, but now we see that massless particles including photons also carry momentum.

Momentum is conserved in quantum mechanics just as it is in relativity and classical physics. Some of the earliest direct experimental evidence of this came from scattering of x-ray photons by electrons in substances, named Compton scattering after the American physicist Arthur H. Compton (1892–1962). Around 1923, Compton observed that x rays scattered from materials had a decreased energy and correctly analyzed this as being due to the scattering of photons from electrons. This phenomenon could be handled as a collision between two particles—a photon and an electron at rest in the material. Energy and momentum are conserved in the collision. (See [link]) He won a Nobel Prize in 1929 for the discovery of this scattering, now called the Compton effect, because it helped prove that photon momentum is given by

where hh size 12{h} {} is Planck’s constant and λλ size 12{λ} {} is the photon wavelength. (Note that relativistic momentum given as p=γmup=γmu size 12{p=γ ital “mu”} {} is valid only for particles having mass.)

We can see that photon momentum is small, since p=h/λp=h/λ size 12{p = h/λ} {} and hh size 12{h} {} is very small. It is for this reason that we do not ordinarily observe photon momentum. Our mirrors do not recoil when light reflects from them (except perhaps in cartoons). Compton saw the effects of photon momentum because he was observing x rays, which have a small wavelength and a relatively large momentum, interacting with the lightest of particles, the electron.

(a) Calculate the momentum of a visible photon that has a wavelength of 500 nm. (b) Find the velocity of an electron having the same momentum. (c) What is the energy of the electron, and how does it compare with the energy of the photon?

**Strategy**

Finding the photon momentum is a straightforward application of its definition: p=hλp=hλ size 12{p = { {h} over {λ} } } {}. If we find the photon momentum is small, then we can assume that an electron with the same momentum will be nonrelativistic, making it easy to find its velocity and kinetic energy from the classical formulas.

**Solution for (a)**

Photon momentum is given by the equation:

Entering the given photon wavelength yields

**Solution for (b)**

Since this momentum is indeed small, we will use the classical expression p=mvp=mv size 12{p= ital “mv”} {} to find the velocity of an electron with this momentum. Solving for vv size 12{v} {} and using the known value for the mass of an electron gives

**Solution for (c)**

The electron has kinetic energy, which is classically given by

Thus,

Converting this to eV by multiplying by (1 eV)/(1.602×10–19J)(1 eV)/(1.602×10–19J) size 12{ ( “1 eV” ) / ( 1 “.” “602” times “10” rSup { size 8{“–19”} } `J ) } {} yields

The photon energy EE is

which is about five orders of magnitude greater.

**Discussion**

Photon momentum is indeed small. Even if we have huge numbers of them, the total momentum they carry is small. An electron with the same momentum has a 1460 m/s velocity, which is clearly nonrelativistic. A more massive particle with the same momentum would have an even smaller velocity. This is borne out by the fact that it takes far less energy to give an electron the same momentum as a photon. But on a quantum-mechanical scale, especially for high-energy photons interacting with small masses, photon momentum is significant. Even on a large scale, photon momentum can have an effect if there are enough of them and if there is nothing to prevent the slow recoil of matter. Comet tails are one example, but there are also proposals to build space sails that use huge low-mass mirrors (made of aluminized Mylar) to reflect sunlight. In the vacuum of space, the mirrors would gradually recoil and could actually take spacecraft from place to place in the solar system. (See [link].)

# Relativistic Photon Momentum

There is a relationship between photon momentum pp size 12{p} {} and photon energy EE size 12{E} {} that is consistent with the relation given previously for the relativistic total energy of a particle as E2=(pc)2+(mc)2E2=(pc)2+(mc)2 size 12{E rSup { size 8{2} } = ( ital “pc” ) rSup { size 8{2} } + ( ital “mc” ) rSup { size 8{2} } } {}. We know mm size 12{m} {} is zero for a photon, but pp size 12{p} {} is not, so that E2=(pc)2+(mc)2E2=(pc)2+(mc)2 size 12{E rSup { size 8{2} } = ( ital “pc” ) rSup { size 8{2} } + ( ital “mc” ) rSup { size 8{2} } } {} becomes

or

To check the validity of this relation, note that E=hc/λE=hc/λ size 12{E = ital “hc”/λ} {} for a photon. Substituting this into p=E/cp=E/c size 12{p = E”/c”} {} yields

as determined experimentally and discussed above. Thus, p=E/cp=E/c size 12{p = E”/c”} {} is equivalent to Compton’s result p=h/λp=h/λ size 12{p = h/λ} {}. For a further verification of the relationship between photon energy and momentum, see [link].

Almost all detection systems talked about thus far—eyes, photographic plates, photomultiplier tubes in microscopes, and CCD cameras—rely on particle-like properties of photons interacting with a sensitive area. A change is caused and either the change is cascaded or zillions of points are recorded to form an image we detect. These detectors are used in biomedical imaging systems, and there is ongoing research into improving the efficiency of receiving photons, particularly by cooling detection systems and reducing thermal effects.

Show that p=E/cp=E/c size 12{p = E”/c”} {} for the photon considered in the [link].

**Strategy**

We will take the energy EE size 12{E} {} found in [link], divide it by the speed of light, and see if the same momentum is obtained as before.

**Solution**

Given that the energy of the photon is 2.48 eV and converting this to joules, we get

**Discussion**

This value for momentum is the same as found before (note that unrounded values are used in all calculations to avoid even small rounding errors), an expected verification of the relationship p=E/cp=E/c size 12{p = E”/c”} {}. This also means the relationship between energy, momentum, and mass given by E2=(pc)2+(mc)2E2=(pc)2+(mc)2 size 12{E rSup { size 8{2} } = ( ital “pc” ) rSup { size 8{2} } + ( ital “mc” ) rSup { size 8{2} } } {} applies to both matter and photons. Once again, note that pp size 12{p} {} is not zero, even when mm size 12{m} {} is.

Note that the forms of the constants h= 4.14 × 10–15 eV ⋅ sh= 4.14 × 10–15 eV ⋅ s size 12{h =” 4″ “.” “14 ” times ” 10″ rSup { size 8{“–15″} } ” eV ” cdot ” s”} {} and hc= 1240 eV ⋅ nmhc= 1240 eV ⋅ nm size 12{ ital “hc” =” 1240 eV ” cdot ” nm”} {} may be particularly useful for this section’s Problems and Exercises.

# Section Summary

- Photons have momentum, given by p=hλp=hλ size 12{p = { {h} over {λ} } } {}, where λλ size 12{λ} {} is the photon wavelength.
- Photon energy and momentum are related by

p=Ecp=Ec size 12{p = { {E} over {c} } } {}, where E=hf=hc/λE=hf=hc/λ size 12{E = ital “hf”= ital “hc”/λ } {} for a photon.

# Conceptual Questions

Which formula may be used for the momentum of all particles, with or without mass?

Is there any measurable difference between the momentum of a photon and the momentum of matter?

Why don’t we feel the momentum of sunlight when we are on the beach?

# Problems & Exercises

(a) Find the momentum of a 4.00-cm-wavelength microwave photon. (b) Discuss why you expect the answer to (a) to be very small.

(a)

1.66×10−32kg⋅m/s1.66×10−32kg⋅m/s size 12{1 “.” “66” times “10” rSup { size 8{ – “32”} } `”kg” cdot “m/s”} {}

(b) The wavelength of microwave photons is large, so the momentum they carry is very small.

(a) What is the momentum of a 0.0100-nm-wavelength photon that could detect details of an atom? (b) What is its energy in MeV?

(a) What is the wavelength of a photon that has a momentum of 5.00×10−29kg⋅m/s5.00×10−29kg⋅m/s size 12{5 “.” “00” times “10” rSup { size 8{ – “29”} } `”kg” cdot “m/s”} {}? (b) Find its energy in eV.

(a) 13.3 μm

(b) 9.38×10-29.38×10-2 eV

(a) A γγ size 12{γ} {}-ray photon has a momentum of 8.00×10−21kg⋅m/s8.00×10−21kg⋅m/s size 12{8 “.” “00” times “10” rSup { size 8{ – “21”} } `”kg” cdot “m/s”} {}. What is its wavelength? (b) Calculate its energy in MeV.

(a) Calculate the momentum of a photon having a wavelength of 2.50 μm2.50 μm size 12{2 “.” “50”” μm”} {}. (b) Find the velocity of an electron having the same momentum. (c) What is the kinetic energy of the electron, and how does it compare with that of the photon?

(a) 2.65×10−28kg⋅m/s2.65×10−28kg⋅m/s size 12{2 “.” “65” times “10” rSup { size 8{ – “28”} } `”kg” cdot “m/s”} {}

(b) 291 m/s

(c) electron 3.86×10−26 J3.86×10−26 J size 12{3 “.” “86” times “10” rSup { size 8{ – “26”} } ” J”} {}, photon 7.96×10−20 J7.96×10−20 J size 12{7 “.” “96” times “10” rSup { size 8{ – “20”} } ” J”} {}, ratio 2.06×1062.06×106 size 12{2 “.” “06” times “10” rSup { size 8{6} } } {}

Repeat the previous problem for a 10.0-nm-wavelength photon.

(a) Calculate the wavelength of a photon that has the same momentum as a proton moving at 1.00% of the speed of light. (b) What is the energy of the photon in MeV? (c) What is the kinetic energy of the proton in MeV?

(a) 1.32×10−13 m1.32×10−13 m size 12{1 “.” “32” times “10” rSup { size 8{ – “13”} } ” m”} {}

(b) 9.39 MeV

(c) 4.70×10−2 MeV4.70×10−2 MeV size 12{4 “.” “70” times “10” rSup { size 8{ – 2} } ” MeV”} {}

(a) Find the momentum of a 100-keV x-ray photon. (b) Find the equivalent velocity of a neutron with the same momentum. (c) What is the neutron’s kinetic energy in keV?

Take the ratio of relativistic rest energy, E=γmc2E=γmc2mc2, to relativistic momentum, p=γmup=γmu size 12{p=γ ital “mu”} {}, and show that in the limit that mass approaches zero, you find E/p=cE/p=c size 12{E/p=c} {}.

E=γmc2E=γmc2mc2 and

P=γmuP=γmu, so

As the mass of particle approaches zero, its velocity uu will approach cc, so that the ratio of energy to momentum in this limit is

which is consistent with the equation for photon energy.

**Construct Your Own Problem**

Consider a space sail such as mentioned in [link]. Construct a problem in which you calculate the light pressure on the sail in N/m2N/m2 size 12{“N/m” rSup { size 8{2} } } {} produced by reflecting sunlight. Also calculate the force that could be produced and how much effect that would have on a spacecraft. Among the things to be considered are the intensity of sunlight, its average wavelength, the number of photons per square meter this implies, the area of the space sail, and the mass of the system being accelerated.

**Unreasonable Results**

A car feels a small force due to the light it sends out from its headlights, equal to the momentum of the light divided by the time in which it is emitted. (a) Calculate the power of each headlight, if they exert a total force of 2.00×10−2 N2.00×10−2 N size 12{2 “.” “00” times “10” rSup { size 8{ – 2} } ” N”} {} backward on the car. (b) What is unreasonable about this result? (c) Which assumptions are unreasonable or inconsistent?

(a)

3.00×106 W3.00×106 W size 12{3 “.” “00” times “10” rSup { size 8{6} } ” W”} {}

(b) Headlights are way too bright.

(c) Force is too large.

## Glossary

- photon momentum
- the amount of momentum a photon has, calculated by p=hλ=Ecp=hλ=Ec size 12{p = { {h} over {λ} } = { {E} over {c} } } {}

- Compton effect
- the phenomenon whereby x rays scattered from materials have decreased energy