28.5 Relativistic momentum

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Calculate relativistic momentum.
Explain why the only mass it makes sense to talk about is rest mass.

Action photo from a college football game. — Momentum is an important concept for these football players from the University of California at Berkeley and the University of California at Davis. Players with more mass often have a larger impact because their momentum is larger. For objects moving at relativistic speeds, the effect is even greater. (credit: John Martinez Pavliga)

In classical physics, momentum is a simple product of mass and velocity. However, we saw in the last section that when special relativity is taken into account, massive objects have a speed limit. What effect do you think mass and velocity have on the momentum of objects moving at relativistic speeds?

Momentum is one of the most important concepts in physics. The broadest form of Newton’s second law is stated in terms of momentum. Momentum is conserved whenever the net external force on a system is zero. This makes momentum conservation a fundamental tool for analyzing collisions. All of Work, Energy, and Energy Resources is devoted to momentum, and momentum has been important for many other topics as well, particularly where collisions were involved. We will see that momentum has the same importance in modern physics. Relativistic momentum is conserved, and much of what we know about subatomic structure comes from the analysis of collisions of accelerator-produced relativistic particles.

The first postulate of relativity states that the laws of physics are the same in all inertial frames. Does the law of conservation of momentum survive this requirement at high velocities? The answer is yes, provided that the momentum is defined as follows.

Relativistic momentum

Relativistic momentum $p$ is classical momentum multiplied by the relativistic factor $γ$ .

p = γmu,

where $m$ is the rest mass of the object, $u$ is its velocity relative to an observer, and the relativistic factor

γ = \frac{1}{\sqrt{1 - \frac{u^{2}}{c^{2}}}} .

Note that we use $u$ for velocity here to distinguish it from relative velocity $v$ between observers. Only one observer is being considered here. With $p$ defined in this way, total momentum $p_{tot}$ is conserved whenever the net external force is zero, just as in classical physics. Again we see that the relativistic quantity becomes virtually the same as the classical at low velocities. That is, relativistic momentum $γmu$ becomes the classical $mu$ at low velocities, because $γ$ is very nearly equal to 1 at low velocities.

Relativistic momentum has the same intuitive feel as classical momentum. It is greatest for large masses moving at high velocities, but, because of the factor $γ$ , relativistic momentum approaches infinity as $u$ approaches $c$ . (See [link] .) This is another indication that an object with mass cannot reach the speed of light. If it did, its momentum would become infinite, an unreasonable value.

In this figure a graph is shown on a coordinate system of axes. The x-axis is labelled as speed u meter per second. On x-axis velocity of the object is shown in terms of the speed of light starting from zero at origin to one point zero c where c is the speed of light. The y-axis is labelled as momentum p rel kilogram meter per second. On y-axis relativistic momentum is shown in terms of kilogram meter per starting from zero at origin to four point zero. The graph in the given figure is concave up and moving upward along the vertical line at x is equal to one point zero c. This graph shows that relativistic momentum approaches infinity as the velocity of an object approaches the speed of light. — Relativistic momentum approaches infinity as the velocity of an object approaches the speed of light.

Misconception alert: relativistic mass and momentum

The relativistically correct definition of momentum as $p = γmu$ is sometimes taken to imply that mass varies with velocity: $m_{var} = γm$ , particularly in older textbooks. However, note that $m$ is the mass of the object as measured by a person at rest relative to the object. Thus, $m$ is defined to be the rest mass, which could be measured at rest, perhaps using gravity. When a mass is moving relative to an observer, the only way that its mass can be determined is through collisions or other means in which momentum is involved. Since the mass of a moving object cannot be determined independently of momentum, the only meaningful mass is rest mass. Thus, when we use the term mass, assume it to be identical to rest mass.

Relativistic momentum is defined in such a way that the conservation of momentum will hold in all inertial frames. Whenever the net external force on a system is zero, relativistic momentum is conserved, just as is the case for classical momentum. This has been verified in numerous experiments.

In Relativistic Energy , the relationship of relativistic momentum to energy is explored. That subject will produce our first inkling that objects without mass may also have momentum.

What is the momentum of an electron traveling at a speed $0.985 c$ ? The rest mass of the electron is $9 . 11 \times 10^{- 31} kg$ .

Answer

p = γ mu = \frac{mu}{\sqrt{1 - \frac{u^{2}}{c^{2}}}} = \frac{(9 . 11 \times 10^{- 31} kg) (0.985) (3.00 \times 10^{8} m/s)}{\sqrt{1 - \frac{(0.985 c)^{2}}{c^{2}}}} = 1.56 \times 10^{- 21} kg \cdot m/s

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Section summary

The law of conservation of momentum is valid whenever the net external force is zero and for relativistic momentum. Relativistic momentum $p$ is classical momentum multiplied by the relativistic factor $γ$ .
$p = γmu$ , where $m$ is the rest mass of the object, $u$ is its velocity relative to an observer, and the relativistic factor $γ = \frac{1}{\sqrt{1 - \frac{u^{2}}{c^{2}}}}$ .
At low velocities, relativistic momentum is equivalent to classical momentum.
Relativistic momentum approaches infinity as $u$ approaches $c$ . This implies that an object with mass cannot reach the speed of light.
Relativistic momentum is conserved, just as classical momentum is conserved.

Conceptual questions

How does modern relativity modify the law of conservation of momentum?

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Is it possible for an external force to be acting on a system and relativistic momentum to be conserved? Explain.

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Problem exercises

Find the momentum of a helium nucleus having a mass of $6 . 68 \times 10^{–27} kg$ that is moving at $0.200 c$ .

$4 . 09 \times 10^{–19} kg \cdot m/s$

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What is the momentum of an electron traveling at $0.980 c$ ?

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(a) Find the momentum of a $1 . 00 \times 10^{9} kg$ asteroid heading towards the Earth at $30.0 km/s$ . (b) Find the ratio of this momentum to the classical momentum. (Hint: Use the approximation that $γ = 1 + (1 / 2) v^{2} / c^{2}$ at low velocities.)

(a) $3 . 000000015 \times 10^{13} kg \cdot m/s$ .

(b) Ratio of relativistic to classical momenta equals 1.000000005 (extra digits to show small effects)

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(a) What is the momentum of a 2000 kg satellite orbiting at 4.00 km/s? (b) Find the ratio of this momentum to the classical momentum. (Hint: Use the approximation that $γ = 1 + (1 / 2) v^{2} / c^{2}$ at low velocities.)

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What is the velocity of an electron that has a momentum of $3.04 \times 10^{–21} kg⋅m/s$ ? Note that you must calculate the velocity to at least four digits to see the difference from $c$ .

$2.9957 \times 10^{8} m/s$

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Find the velocity of a proton that has a momentum of $4 . 48 \times {–10}^{- 19} kg⋅m/s .$

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(a) Calculate the speed of a $1.00- μ g$ particle of dust that has the same momentum as a proton moving at $0.999 c$ . (b) What does the small speed tell us about the mass of a proton compared to even a tiny amount of macroscopic matter?

(a) $1 . 121 \times 10^{–8} m/s$

(b) The small speed tells us that the mass of a proton is substantially smaller than that of even a tiny amount of macroscopic matter!

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(a) Calculate $γ$ for a proton that has a momentum of $1.00 kg⋅m/s .$ (b) What is its speed? Such protons form a rare component of cosmic radiation with uncertain origins.

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Questions & Answers

how did you get 1640

Noor Reply

If auger is pair are the roots of equation x2+5x-3=0

Peter Reply

Wayne and Dennis like to ride the bike path from Riverside Park to the beach. Dennis’s speed is seven miles per hour faster than Wayne’s speed, so it takes Wayne 2 hours to ride to the beach while it takes Dennis 1.5 hours for the ride. Find the speed of both bikers.

MATTHEW Reply

420

Sharon

from theory: distance [miles] = speed [mph] × time [hours] info #1 speed_Dennis × 1.5 = speed_Wayne × 2 => speed_Wayne = 0.75 × speed_Dennis (i) info #2 speed_Dennis = speed_Wayne + 7 [mph] (ii) use (i) in (ii) => [...] speed_Dennis = 28 mph speed_Wayne = 21 mph

George

Let W be Wayne's speed in miles per hour and D be Dennis's speed in miles per hour. We know that W + 7 = D and W * 2 = D * 1.5. Substituting the first equation into the second: W * 2 = (W + 7) * 1.5 W * 2 = W * 1.5 + 7 * 1.5 0.5 * W = 7 * 1.5 W = 7 * 3 or 21 W is 21 D = W + 7 D = 21 + 7 D = 28

Salma

Devon is 32 32 years older than his son, Milan. The sum of both their ages is 54 54. Using the variables d d and m m to represent the ages of Devon and Milan, respectively, write a system of equations to describe this situation. Enter the equations below, separated by a comma.

Aaron Reply

find product (-6m+6) ( 3m²+4m-3)

SIMRAN Reply

-42m²+60m-18

Salma

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bill

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bill

-24m+3+3mÁ^2

Susan

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Amira

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Aphelele

Bajemah

-6m(3mA²+4m-3)+6(3mA²+4m-3) =-18m²A²-24m²+18m+18mA²+24m-18 Rearrange like items -18m²A²-24m²+42m+18A²-18

Salma

complete the table of valuesfor each given equatio then graph. 1.x+2y=3

Jovelyn Reply

x=3-2y

Salma

y=x+3/2

Salma

Enock

given that (7x-5):(2+4x)=8:7find the value of x

Nandala

3x-12y=18

Kelvin

please why isn't that the 0is in ten thousand place

Grace Reply

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Stephen

A meditation garden is in the shape of a right triangle, with one leg 7 feet. The length of the hypotenuse is one more than the length of one of the other legs. Find the lengths of the hypotenuse and the other leg

Marry Reply

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Abubakar

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state in which quadrant or on which axis each of the following angles given measure. in standard position would lie 89°

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Method

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Enock

what the last part of the problem mean?

Roger

The Jones family took a 15 mile canoe ride down the Indian River in three hours. After lunch, the return trip back up the river took five hours. Find the rate, in mph, of the canoe in still water and the rate of the current.

cameron Reply

Shakir works at a computer store. His weekly pay will be either a fixed amount, $925, or $500 plus 12% of his total sales. How much should his total sales be for his variable pay option to exceed the fixed amount of $925.

mahnoor Reply

I'm guessing, but it's somewhere around $4335.00 I think

Lewis

12% of sales will need to exceed 925 - 500, or 425 to exceed fixed amount option. What amount of sales does that equal? 425 ÷ (12÷100) = 3541.67. So the answer is sales greater than 3541.67. Check: Sales = 3542 Commission 12%=425.04 Pay = 500 + 425.04 = 925.04. 925.04 > 925.00

Munster

difference between rational and irrational numbers

Arundhati Reply

When traveling to Great Britain, Bethany exchanged $602 US dollars into £515 British pounds. How many pounds did she receive for each US dollar?

Jakoiya Reply

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Jazmine trained for 3 hours on Saturday. She ran 8 miles and then biked 24 miles. Her biking speed is 4 mph faster than her running speed. What is her running speed?

Zack Reply

d=r×t the equation would be 8/r+24/r+4=3 worked out

Sheirtina

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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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