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Learning Objectives

By the end of this section, you will be able to do the following:

Define and discuss nuclear decay
State the conservation laws
Explain parent and daughter nucleus
Calculate the energy emitted during nuclear decay

The information presented in this section supports the following AP® learning objectives and science practices:

5.B.8.1 The student is able to describe emission or absorption spectra associated with electronic or nuclear transitions as transitions between allowed energy states of the atom in terms of the principle of energy conservation, including characterization of the frequency of radiation emitted or absorbed. (S.P. 1.2, 7.2)
5.C.1.1 The student is able to analyze electric charge conservation for nuclear and elementary particle reactions and make predictions related to such reactions based upon conservation of charge. (S.P. 6.4, 7.2)
5.C.2.1 The student is able to predict electric charges on objects within a system by application of the principle of charge conservation within a system. (S.P. 6.4)
5.G.1.1 The student is able to apply conservation of nucleon number and conservation of electric charge to make predictions about nuclear reactions and decays such as fission, fusion, alpha decay, beta decay, or gamma decay. (S.P. 6.4)

Nuclear decay has provided an amazing window into the realm of the very small. Nuclear decay gave the first indication of the connection between mass and energy, and it revealed the existence of two of the four basic forces in nature. In this section, we explore the major modes of nuclear decay; and, like those who first explored them, we will discover evidence of previously unknown particles and conservation laws.

Some nuclides are stable, apparently living forever. Unstable nuclides decay, that is, they are radioactive, eventually producing a stable nuclide after many decays. We call the original nuclide the parent and its decay products the daughters. Some radioactive nuclides decay in a single step to a stable nucleus. For example, $^{60} Co$ is unstable and decays directly to $^{60} Ni,$ which is stable. Others, such as $^{238} U,$ decay to another unstable nuclide, resulting in a decay series in which each subsequent nuclide decays until a stable nuclide is finally produced. The decay series that starts from $^{238} U$ is of particular interest, since it produces the radioactive isotopes $^{226} Ra$ and $^{210} Po,$ which the Curies first discovered (see Figure 14.10). Radon gas is also produced $(^{222} Rn$ in the series), an increasingly recognized naturally occurring hazard. Since radon is a noble gas, it emanates from materials, such as soil, containing even trace amounts of $^{238} U$ and can be inhaled. The decay of radon and its daughters produces internal damage. The $^{238} U$ decay series ends with $^{206} Pb,$ a stable isotope of lead.

A graph is shown in which decay of alpha and beta is shown. Also half lives of each isotope are shown. Uranium decays in one mode but some isotopes decay by more than one mode. Finally a stable isotope of lead results.

Figure 14.10 The decay series produced by

^{238} U,

the most common uranium isotope. Nuclides are graphed in the same manner as in the chart of nuclides. The type of decay for each member of the series is shown, as well as the half-lives. Note that some nuclides decay by more than one mode. You can see why radium and polonium are found in uranium ore. A stable isotope of lead is the end product of the series.

Note that the daughters of $α$ decay shown in Figure 14.10 always have two fewer protons and two fewer neutrons than the parent. This seems reasonable, since we know that $α$ decay is the emission of a $^{4} He$ nucleus, which has two protons and two neutrons. The daughters of $β$ decay have one less neutron and one more proton than their parent. Beta decay is a little more subtle, as we shall see. No $γ$ decays are shown in the figure, because they do not produce a daughter that differs from the parent.

Alpha Decay

In alpha decay, a $^{4} He$ nucleus simply breaks away from the parent nucleus, leaving a daughter with two fewer protons and two fewer neutrons than the parent (see Figure 14.11). One example of $α$ decay is shown in Figure 14.10 for $^{238} U .$ Another nuclide that undergoes $α$ decay is $^{239} Pu .$ The decay equations for these two nuclides are

14.13

^{238} U \to^{234} {Th}_{92}^{234} +^{4} He

and

14.14

^{239} Pu \to^{235} U +^{4} He .

The image shows conditions before and after alpha decay. Before alpha decay the nucleus is labeled parent and after decay the nucleus is labeled daughter.

Figure 14.11 Alpha decay is the separation of a

^{4} He

nucleus from the parent. The daughter nucleus has two fewer protons and two fewer neutrons than the parent. Alpha decay occurs spontaneously only if the daughter and

^{4} He

nucleus have less total mass than the parent.

If you examine the periodic table of the elements, you will find that Th has $Z = 90,$ two fewer than U, which has $Z = 92 .$ Similarly, in the second decay equation, we see that U has two fewer protons than Pu, which has $Z = 94 .$ The general rule for $α$ decay is best written in the format $_{Z}^{A} X_{N} .$ If a certain nuclide is known to $α$ decay—generally this information must be looked up in a table of isotopes, such as in Table A1—its $α$ decay equation is

14.15

_{Z}^{A} X_{N} \to_{Z - 2}^{A - 4} Y_{N - 2} +_{2}^{4} {He}_{2} (α decay)

where Y is the nuclide that has two fewer protons than X, such as Th having two fewer than U. So if you were told that $^{239} Pu$ $α$ decays and were asked to write the complete decay equation, you would first look up which element has two fewer protons—an atomic number two lower—and find that this is uranium. Then since four nucleons have broken away from the original 239, its atomic mass would be 235.

It is instructive to examine conservation laws related to $α$ decay. You can see from the equation $_{Z}^{A} X_{N} \to_{Z - 2}^{A - 4} Y_{N - 2} +_{2}^{4} {He}_{2}$ that total charge is conserved. Linear and angular momentum are conserved, too. Although conserved angular momentum is not of great consequence in this type of decay, conservation of linear momentum has interesting consequences. If the nucleus is at rest when it decays, its momentum is zero. In that case, the fragments must fly in opposite directions with equal-magnitude momenta so that total momentum remains zero. This results in the $α -$ particle carrying away most of the energy, as a bullet from a heavy rifle carries away most of the energy of the powder burned to shoot it. Total mass–energy is also conserved: the energy produced in the decay comes from conversion of a fraction of the original mass. As discussed in Exercise 12.16, the general relationship is

14.16

E = (Δ m) c^{2} .

Here, $E$ is the nuclear reaction energy—the reaction can be nuclear decay or any other reaction—and $Δ m$ is the difference in mass between initial and final products. When the final products have less total mass, $Δ m$ is positive, and the reaction releases energy (is exothermic). When the products have greater total mass, the reaction is endothermic $(Δ m$ is negative) and must be induced with an energy input. For $α$ decay to be spontaneous, the decay products must have smaller mass than the parent.

Example 14.2 Alpha Decay Energy Found from Nuclear Masses

Find the energy emitted in the $α$ decay of $^{239} Pu .$

Strategy

Nuclear reaction energy, such as released in α decay, can be found using the equation $E = (Δ m) c^{2} .$ We must first find $Δ m,$ the difference in mass between the parent nucleus and the products of the decay. This is easily done using masses given in Exercise 17.31.

Solution

The decay equation was given earlier for $^{239} Pu;$ it is

14.17

^{239} Pu \to^{235} U +^{4} He .

Thus the pertinent masses are those of $^{239} Pu,$ $^{235} U,$ and the $α -$ particle or $^{4} He,$ all of which are listed in Exercise 17.31. The initial mass was $m (^{239} Pu) = 239 . 052157 u .$ The final mass is the sum $m (^{235} U) + m (^{4} He) =235 . 043924 u + 4.002602 u = 239.046526 u .$ Thus

14.18

\begin{array}{l} Δ m & = & m (^{239} Pu) - [m (^{235} U) + m (^{4} He)] \\ = & 239.052157 u - 239.046526 u \\ = & 0.0005631 u. \end{array}

Now we can find $E$ by entering $Δ m$ into the equation

14.19

E = (Δ m) c^{2} = (0 .005631 u) c^{2} .

We know $1 u = 931.5 MeV/ c^{2},$ and so

14.20

E = (0.005631) (931.5 MeV / c^{2}) (c^{2}) = 5.25 MeV .

Discussion

The energy released in this $α$ decay is in the $MeV$ range, about $10^{6}$ times as great as typical chemical reaction energies, consistent with many previous discussions. Most of this energy becomes kinetic energy of the $α -$ particle or $^{4} He$ nucleus, which moves away at high speed. The energy carried away by the recoil of the $^{235} U$ nucleus is much smaller in order to conserve momentum. The $^{235} U$ nucleus can be left in an excited state to later emit photons— $γ$ rays. This decay is spontaneous and releases energy, because the products have less mass than the parent nucleus. The question of why the products have less mass will be discussed in Figure 14.18. Note that the masses given in Exercise 17.31 are atomic masses of neutral atoms, including their electrons. The mass of the electrons is the same before and after $α$ decay, and so their masses subtract out when finding $Δ m .$ In this case, there are 94 electrons before and after the decay.

Beta Decay

There are actually three types of beta decay. The first discovered was ordinary beta decay and is called $β^{-}$ decay or electron emission. The symbol $β^{-}$ represents an electron emitted in nuclear beta decay. Cobalt-60 is a nuclide that $β^{-}$ decays in the following manner

14.21

^{60} Co \to^{60} Ni + β^{-} + neutrino.

The neutrino is a particle emitted in beta decay that was unanticipated and is of fundamental importance. The neutrino was not even proposed in theory until more than 20 years after beta decay was known to involve electron emissions. Neutrinos are so difficult to detect that the first direct evidence of them was not obtained until 1953. Neutrinos are nearly massless, have no charge, and do not interact with nucleons via the strong nuclear force. Traveling approximately at the speed of light, they have little time to affect any nucleus they encounter. This is, owing to the fact that they have no charge and they are not EM waves, they do not interact through the EM force. They do interact via the relatively weak and very short range weak nuclear force. Consequently, neutrinos escape almost any detector and penetrate almost any shielding. However, neutrinos do carry energy, angular momentum—they are fermions with half-integral spin—and linear momentum away from a beta decay. When accurate measurements of beta decay were made, it became apparent that energy, angular momentum, and linear momentum were not accounted for by the daughter nucleus and electron alone. Either a previously unsuspected particle was carrying them away, or three conservation laws were being violated. Wolfgang Pauli made a formal proposal for the existence of neutrinos in 1930. The Italian-born American physicist Enrico Fermi (1901–1954) gave neutrinos their name, meaning little neutral ones, when he developed a sophisticated theory of beta decay (see Figure 14.12). Part of Fermi’s theory was the identification of the weak nuclear force as being distinct from the strong nuclear force and in fact responsible for beta decay.

Figure 14.12 Enrico Fermi was nearly unique among 20^th-century physicists—he made significant contributions both as an experimentalist and a theorist. His many contributions to theoretical physics included the identification of the weak nuclear force. The fermi (fm) is named after him, as are an entire class of subatomic particles (fermions), an element (Fermium), and a major research laboratory (Fermilab). His experimental work included studies of radioactivity, for which he won the 1938 Nobel Prize in Physics, and creation of the first nuclear chain reaction. (United States Department of Energy, Office of Public Affairs)

The neutrino also reveals a new conservation law. There are various families of particles, one of which is the electron family. We propose that the number of members of the electron family is constant in any process or any closed system. In our example of beta decay, there are no members of the electron family present before the decay, but after, there is an electron and a neutrino. So electrons are given an electron family number of $+ 1 .$ The neutrino in $β^{-}$ decay is an electron’s antineutrino, given the symbol ${\bar{ν}}_{e},$ where $ν$ is the Greek letter nu, and the subscript e means this neutrino is related to the electron. The bar indicates this is a particle of antimatter. All particles have antimatter counterparts that are nearly identical except that they have the opposite charge. Antimatter is almost entirely absent on Earth, but it is found in nuclear decay and other nuclear and particle reactions as well as in outer space. The electron’s antineutrino ${\bar{ν}}_{e},$ being antimatter, has an electron family number of $–1 .$ The total is zero, before and after the decay. The new conservation law, obeyed in all circumstances, states that the total electron family number is constant. An electron cannot be created without also creating an antimatter family member. This law is analogous to the conservation of charge in a situation where total charge is originally zero, and equal amounts of positive and negative charge must be created in a reaction to keep the total zero.

If a nuclide $_{Z}^{A} X_{N}$ is known to $β^{-}$ decay, then its $β^{-}$ decay equation is

14.22

{}_{Z}^{A} X_{N} \to {}_{Z + 1}^{A} Y_{N - 1} + β^{-} + {\bar{ν}}_{e} (β^{-} decay),

where Y is the nuclide having one more proton than X (see Figure 14.13). So if you know that a certain nuclide $β^{-}$ decays, you can find the daughter nucleus by first looking up $Z$ for the parent and then determining which element has atomic number $Z + 1 .$ In the example of the $β^{-}$ decay of $^{60} Co$ given earlier, we see that $Z = 27$ for Co and $Z = 28$ is Ni. It is as if one of the neutrons in the parent nucleus decays into a proton, electron, and neutrino. In fact, neutrons outside of nuclei do just that—they live only an average of a few minutes and $β^{-}$ decay in the following manner.

14.23

n \to p + β^{-} + {\bar{ν}}_{e} .

Image shows parent nucleus before beta decay and daughter nucleus after beta decay.

Figure 14.13 In

β^{-}

decay, the parent nucleus emits an electron and an antineutrino. The daughter nucleus has one more proton and one less neutron than its parent. Neutrinos interact so weakly that they are almost never directly observed, but they play a fundamental role in particle physics.

We see that charge is conserved in $β^{-}$ decay, since the total charge is $Z$ before and after the decay. For example, in $^{60} Co$ decay, total charge is 27 before decay, since cobalt has $Z = 27 .$ After decay, the daughter nucleus is Ni, which has $Z = 28,$ and there is an electron, so that the total charge is also $28 + (–1)$ or 27. Angular momentum is conserved, but not obviously—you have to examine the spins and angular momenta of the final products in detail to verify this. Linear momentum is also conserved, again imparting most of the decay energy to the electron and the antineutrino, since they are of low and zero mass, respectively. Another new conservation law is obeyed here and elsewhere in nature. The total number of nucleons $A$ is conserved. In $^{60} Co$ decay, for example, there are 60 nucleons before and after the decay. Note that total $A$ is also conserved in $α$ decay. Also note that the total number of protons changes, as does the total number of neutrons, so that total $Z$ and total $N$ are not conserved in $β^{-}$ decay, as they are in $α$ decay. Energy released in $β^{-}$ decay can be calculated given the masses of the parent and products.

Example 14.3 $β^{-}$ Decay Energy from Masses

Find the energy emitted in the $β^{-}$ decay of $^{60} Co .$

Strategy and Concept

As in the preceding example, we must first find $Δ m,$ the difference in mass between the parent nucleus and the products of the decay, using masses given in Exercise 17.31. Then the emitted energy is calculated as before, using $E = (Δ m) c^{2} .$ The initial mass is just that of the parent nucleus, and the final mass is that of the daughter nucleus and the electron created in the decay. The neutrino is massless, or nearly so. However, since the masses given in Exercise 17.31 are for neutral atoms, the daughter nucleus has one more electron than the parent, and so the extra electron mass that corresponds to the $β^{-}$ is included in the atomic mass of Ni. Thus,

14.24

Δ m = m (^{60} Co) - m (^{60} Ni).

Solution

The $β^{-}$ decay equation for $^{60} Co$ is

14.25

_{27}^{60} {Co}_{33} \to_{28}^{60} {Ni}_{32} + β^{-} + {\bar{ν}}_{e} .

As noticed

14.26

Δ m = m (^{60} Co) - m (^{60} Ni).

Entering the masses found in Exercise 17.31 gives

14.27

Δ m = 59 . 933820 u - 59.930789 u = 0.003031 u .

Thus

14.28

E = (Δ m) c^{2} = (0.003031 u) c^{2} .

Using $1 u = 931.5 MeV / c^{2},$ we obtain

14.29

E = (0.003031) (931.5 MeV / c^{2}) (c^{2}) = 2 . 82 MeV.

Discussion and Implications

Perhaps the most difficult thing about this example is convincing yourself that the $β^{-}$ mass is included in the atomic mass of $^{60} Ni .$ Beyond that are other implications. Again the decay energy is in the MeV range. This energy is shared by all of the products of the decay. In many $^{60} Co$ decays, the daughter nucleus $^{60} Ni$ is left in an excited state and emits photons $(γ$ rays). Most of the remaining energy goes to the electron and neutrino, since the recoil kinetic energy of the daughter nucleus is small. One final note: the electron emitted in $β^{-}$ decay is created in the nucleus at the time of decay.

The second type of beta decay is less common than the first. It is $β^{+}$ decay. Certain nuclides decay by the emission of a positive electron. This is antielectron or positron decay (see Figure 14.14).

Image shows parent nucleus before beta plus decay and daughter nucleus after beta plus decay, which results in a positively charged electron called a positron.

Figure 14.14

β^{+}

decay is the emission of a positron that eventually finds an electron to annihilate, characteristically producing gammas in opposite directions.

The antielectron is often represented by the symbol $e^{+},$ but in beta decay it is written as $β^{+}$ to indicate the antielectron was emitted in a nuclear decay. Antielectrons are the antimatter counterpart to electrons, being nearly identical, having the same mass, spin, and so on, but having a positive charge and an electron family number of $–1$ When a positron encounters an electron, there is a mutual annihilation in which all the mass of the antielectron-electron pair is converted into pure photon energy. The reaction, $e^{+} + e^{-} \to γ + γ,$ conserves electron family number as well as all other conserved quantities. If a nuclide $_{Z}^{A} X_{N}$ is known to $β^{+}$ decay, then its $β^{+}$ decay equation is

14.30

_{Z}^{A} X_{N} \to {}_{Z - 1}^{A} Y_{N + 1} + β^{+} + ν_{e} (β^{+} decay),

where Y is the nuclide having one less proton than X to conserve charge and $ν_{e}$ is the symbol for the electron’s neutrino, which has an electron family number of $+1$ Since an antimatter member of the electron family (the $β^{+}$ ) is created in the decay, a matter member of the family (here, the $ν_{e}$ ) must also be created. Given, for example, that $^{22} Na$ $β^{+}$ decays, you can write its full decay equation by first finding that $Z = 11$ for $^{22} Na,$ so that the daughter nuclide will have $Z = 10,$ the atomic number for neon. Thus the $β^{+}$ decay equation for $^{22} Na$ is

14.31

_{11}^{22} {Na}_{11} \to_{10}^{22} {Ne}_{12} + β^{+} + ν_{e} .

In $β^{+}$ decay, it is as if one of the protons in the parent nucleus decays into a neutron, a positron, and a neutrino. Protons do not do this outside of the nucleus, and so the decay is due to the complexities of the nuclear force. Note again that the total number of nucleons is constant in this and any other reaction. To find the energy emitted in $β^{+}$ decay, you must again count the number of electrons in the neutral atoms, since atomic masses are used. The daughter has one less electron than the parent, and one electron mass is created in the decay. Thus, in $β^{+}$ decay,

14.32

Δ m = m (parent) - [m (daughter) + {2 m}_{e}],

since we use the masses of neutral atoms.

Electron capture is the third type of beta decay. Here, a nucleus captures an inner-shell electron and undergoes a nuclear reaction that has the same effect as $β^{+}$ decay. Electron capture is sometimes denoted by the letters EC. We know that electrons cannot reside in the nucleus, but this is a nuclear reaction that consumes the electron and occurs spontaneously only when the products have less mass than the parent plus the electron. If a nuclide $_{Z}^{A} X_{N}$ is known to undergo electron capture, then its electron capture equation is

14.33

_{Z}^{A} X_{N} + e^{-} \to {}_{Z - 1}^{A} Y_{N + 1} + ν_{e} (electron capture, or EC) .

Any nuclide that can $β^{+}$ decay can also undergo electron capture and often does both. The same conservation laws are obeyed for EC as for $β^{+}$ decay. It is good practice to confirm these for yourself.

All forms of beta decay occur because the parent nuclide is unstable and lies outside the region of stability in the chart of nuclides. Those nuclides that have relatively more neutrons than those in the region of stability will $β^{-}$ decay to produce a daughter with fewer neutrons, producing a daughter nearer the region of stability. Similarly, those nuclides having relatively more protons than those in the region of stability will $β^{-}$ decay or undergo electron capture to produce a daughter with fewer protons, nearer the region of stability.

Gamma Decay

Gamma decay is the simplest form of nuclear decay—it is the emission of energetic photons by nuclei left in an excited state by some earlier process. Protons and neutrons in an excited nucleus are in higher orbitals, and they fall to lower levels by photon emission—analogous to electrons in excited atoms. Nuclear excited states have lifetimes typically of only about $10^{- 14}$ s, an indication of the great strength of the forces pulling the nucleons to lower states. The $γ$ decay equation is simply

14.34

_{Z}^{A} X_{N}^{*} \to {}_{Z}^{A} X_{N} + γ_{1} + γ_{2} + . . . (γ decay)

where the asterisk indicates the nucleus is in an excited state. There may be one or more $γ$ s emitted, depending on how the nuclide de-excites. In radioactive decay, $γ$ emission is common and is preceded by $γ$ or $β$ decay. For example, when $^{60} Co$ $β^{-}$ decays, it most often leaves the daughter nucleus in an excited state, written $^{60} Ni* .$ Then the nickel nucleus quickly $γ$ decays by the emission of two penetrating $γ s.$

14.35

^{60} Ni* \to^{60} Ni + γ_{1} + γ_{2}

These are called cobalt $γ$ rays, although they come from nickel. It is again constructive to verify the conservation laws for gamma decay. Finally, since $γ$ decay does not change the nuclide to another species, it is not prominently featured in charts of decay series, such as that in Figure 14.10.