29.4 Photon momentum (Page 2/5)

College physics Page 2 / 5

p = \frac{h}{λ},

where $h$ is Planck’s constant and $λ$ is the photon wavelength. (Note that relativistic momentum given as $p = γ mu$ is valid only for particles having mass.)

Collision of an electron with a photon of energy E equal to h f is shown. The electron is represented as a spherical ball and the photon as an ellipse enclosing a wave. After collision the energy of the photon becomes E prime equal to h f prime and the final energy of an electron K E sub e is equal to E minus E prime. The direction of electron and photon before and after collision is represented by arrows. — The Compton effect is the name given to the scattering of a photon by an electron. Energy and momentum are conserved, resulting in a reduction of both for the scattered photon. Studying this effect, Compton verified that photons have momentum.

We can see that photon momentum is small, since $p = h / λ$ and $h$ 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.

Electron and photon momentum compared

(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: $p = \frac{h}{λ}$ . 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:

p = \frac{h}{λ} .

Entering the given photon wavelength yields

p = \frac{6 . 63 \times 10^{–34} J \cdot s}{500 \times 10^{–9} m} = 1 . 33 \times 10^{–27} kg \cdot m/s .

Solution for (b)

Since this momentum is indeed small, we will use the classical expression $p = mv$ to find the velocity of an electron with this momentum. Solving for $v$ and using the known value for the mass of an electron gives

v = \frac{p}{m} = \frac{1 . 33 \times 10^{–27} kg \cdot m/s}{9 . 11 \times 10^{–31} kg} = 1460 m/s \approx 1460 m/s .

Solution for (c)

The electron has kinetic energy, which is classically given by

{KE}_{e} = \frac{1}{2} {mv}^{2} .

Thus,

{KE}_{e} = \frac{1}{2} (9 . 11 \times 10^{–3} kg) (1455 m/s)^{2} = 9.64 \times 10^{–25} J .

Converting this to eV by multiplying by $(1 eV) / (1 . 602 \times 10^{–19} J)$ yields

{KE}_{e} = 6.02 \times 10^{–6} eV .

The photon energy $E$ is

E = \frac{hc}{λ} = \frac{1240 eV \cdot nm}{500 nm} = 2 . 48 eV,

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] .)

Questions & Answers

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Source: OpenStax, College physics. OpenStax CNX. Jul 27, 2015 Download for free at http://legacy.cnx.org/content/col11406/1.9

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