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Basic Nuclear Properties | Modern Physics PDF Download

Introduction

An ordinary hydrogen atom has as its nucleus a single proton, whose charge is +e and whose mass is 1836 times that of the electron. All other elements have nuclei that contain neutrons as well as protons. As its name suggests, the neutron is uncharged; its mass is slightly greater than that of the proton. Neutrons and protons are jointly called nucleons. The atomic number of an element is the number of protons in each of its nuclei, which is the same as the number of electrons in a neutral atom of the element. Thus atomic number of hydrogen is 1, of helium 2, of lithium 3, and of uranium 92. All nuclei of a given element do not necessarily have equal numbers of neutrons. For instance, although over 99.9 percent of hydrogen nuclei are just single protons, a few also contain a neutron, and a very few two neutrons, along with the protons. The varieties of an element that differ in the numbers of neutrons their nuclei contain are called isotopes. 

The isotope of hydrogenThe isotope of hydrogen

The conventional symbols for nuclear species, or nuclides, follow the pattern AZ X,           where
X = Chemical symbol of the element
Z =  Atomic number of the element
=  Number of protons in the nucleus
A = Mass number of the nuclide
= Number of nucleons in the nucleus

Nuclear Terminology  

  • Isotopes
    If two nuclei have same atomic number Z (proton), then they are called as isotopes.
    Example:
    Basic Nuclear Properties | Modern Physics
  • Isotones 
    If two nuclei have same neutron number N (proton), then they are called as isotones. Example:
    Basic Nuclear Properties | Modern Physics
  • Isobars
    If two nuclei have same mass number A, then they are called as isobars.
    Example:
    Basic Nuclear Properties | Modern Physics
  • Mirror nuclei
    Nuclei with same mass number A but with proton and neutron number interchanged and their difference is ±1.
    Example:
    Basic Nuclear Properties | Modern Physics

Atomic Masses: Atomic masses refer to the masses of neutral atoms, not of bare nuclei. Thus an atomic mass always includes the masses of Z electrons. Atomic masses are expressed in mass units (u), which are so defined that the mass of a 126 C atom is exactly 12u. The value of mass unit is 1u = 1.66054 x 10-27kg ≈ 931.4 MeV.
Some rest masses in various units are:
Basic Nuclear Properties | Modern Physics

Size and Density

Majority of atomic nuclei have spherical shape and only very few show departure from spherical symmetry. For spherically symmetrical nuclei, nuclear radius is given by  
R = R0A1/3
where A is the mass number and R0 = (1.2 ± 0.1) x 10-15 m ≈ 1.2 fm.
R varies slightly from one nucleus to another but is roughly constant for A > 20.
The radius of 12C nucleus is  
R = (1.2)(12)1/3 ≈ 1.2 fm
Example 1: The radius of Ge nucleus is measured to be twice the radius of Basic Nuclear Properties | Modern Physics. How many nucleons are there in Ge nucleus?

R = R0(A)1/3 ⇒ RGe = 2RBe ⇒ R0(A)1/3 = 2R0(9)1/3 ⇒ A = 72

Nuclear Density 
Assuming spherical symmetry, volume of nucleus is given by
Basic Nuclear Properties | Modern Physics
Mass of one proton = 1.67 × 10-27 kg, Nuclear Mass = A × 1.67 × 10-27 kg.
Basic Nuclear Properties | Modern Physics
Basic Nuclear Properties | Modern Physics
Basic Nuclear Properties | Modern Physics
= 1044 Nucleons/m3    

Spin and Magnetic Moment 

Proton and neutrons, like electrons, are fermions with spin quantum numbers of s = 1/2.
This means they have spin angular momenta Basic Nuclear Properties | Modern Physics of magnitude
Basic Nuclear Properties | Modern Physics
and spin magnetic quantum number of ms = ± 1/2.
As in the case of electrons, magnetic moments are associated with the spins of protons and neutrons. In nuclear physics magnetic moments are expressed in nuclear magnetons, (μN), where
Nuclear magneton
Basic Nuclear Properties | Modern Physics
= 3.152 x 10-8 eV/T where mp is the proton mass.
In atomic physics we have defined Bohr magneton Basic Nuclear Properties | Modern Physics where me is the electron mass.
The nuclear magneton is smaller than the Bohr magneton by the ratio of the proton mass to the electron mass which is 1836.
Basic Nuclear Properties | Modern Physics
The spin magnetic moments of the proton and neutron have components in any direction of  
Proton  μpz = ±2.793 μN
Neutron  Basic Nuclear Properties | Modern Physics 
There are two possibilities for the signs of μpz and μnz, depending on whether ms is Basic Nuclear Properties | Modern Physics The ± sign is used for μpz because Basic Nuclear Properties | Modern Physics is in the same direction as the spin Basic Nuclear Properties | Modern Physics whereas Basic Nuclear Properties | Modern Physics

Spin magnetic moment  and spin angular momentum  directions for neutron and protons.Spin magnetic moment Basic Nuclear Properties | Modern Physics and spin angular momentum Basic Nuclear Properties | Modern Physics directions for neutron and protons.

Note: For neutron, magnetic moment is expected to be zero as e = 0 but Basic Nuclear Properties | Modern Physics
At first glance it seems odd that the neutron, with no net charge, has spin magnetic moment. But if we assume that the neutron contains equal amounts of positive and negative charge, a spin magnetic moment arise if these charges are not uniformly distributed. Thus we can say that neutron has physical significance of negative charges because magnetic moment is opposite to that of its intrinsic spin angular momentum. 

Angular Momentum of Nucleus 

The hydrogen nucleus Basic Nuclear Properties | Modern Physics consists of a single proton and its total angular momentum is given by Basic Nuclear Properties | Modern Physics A nucleon in a more complex nucleus may have orbital angular momentum due to motion inside the nucleus as well as spin angular momentum. The total angular momentum of such a nucleus is the vector sum of the spin and orbital angular momenta of its nucleons, as in the analogous case of the electrons of an atom.
When a nucleus whose magnetic moment has z component μz is in a constant magnetic field Basic Nuclear Properties | Modern Physics the magnetic potential energy of the nucleus is 

Magnetic energy  
Um = -μzB
The energy is negative when Basic Nuclear Properties | Modern Physics is in the same direction asBasic Nuclear Properties | Modern Physics and positive whenBasic Nuclear Properties | Modern Physics is opposite toBasic Nuclear Properties | Modern Physics. In a magnetic field, each angular momentum state of the nucleus is therefore split into components, just as in the Zeeman Effect in atomic electron states. Figure below shows the splitting when the angular momentum of the nucleus is due to the spin of a single proton.

The energy levels of a proton in a magnetic field are split into spin-up and spin-down sublevels.  The energy levels of a proton in a magnetic field are split into spin-up and spin-down sublevels.  

The energy difference between the sublevels is
ΔE = 2μpzB  
A photon with this energy will be emitted when a proton in the upper state flips its spin to fall to the lower state. A proton in the lower state can be raised to upper one by absorbing a photon of this energy. The photon frequency vL that corresponds to ΔE is
Larmor frequency for photons
Basic Nuclear Properties | Modern Physics
This is equal to the frequency with which a magnetic dipole precesses around a magnetic field. 

Stable Nuclei 

Not all combination of neutrons and protons form stable nuclei. In general, light nuclei (A < 20) contain equal numbers of neutrons and protons, while in heavier nuclei the proportion of neutrons becomes progressively greater. This is evident in figure as shown below, which is plot of N versus Z for stable nuclides.

Neutron-proton diagram for stable nuclides. Neutron-proton diagram for stable nuclides. 

The tendency for N to equal Z follows from the existence of nuclear energy levels.
Nucleons, which have spin 1/2, obey exclusion principle. As a result, each energy level can contain two neutrons of opposite spins and two protons of opposite spins. Energy levels in nuclei are filled in sequence, just as energy levels in atoms are, to achieve configurations of minimum energy and therefore maximum stability. Thus the boron isotope Basic Nuclear Properties | Modern Physics has more energy than the carbon isotope Basic Nuclear Properties | Modern Physics because one of its neutrons is in a higher energy level, and Basic Nuclear Properties | Modern Physics is accordingly unstable. If created in a nuclear reaction, a Basic Nuclear Properties | Modern Physics nucleus changes by beta decay into a stable Basic Nuclear Properties | Modern Physics nucleus in a fraction of second. 

Simplified energy level diagrams of some boron and carbon isotopes.Simplified energy level diagrams of some boron and carbon isotopes.

The preceding argument is only part of the story. Protons are positively charged and repel one another electrically. This repulsion becomes so great in nuclei with more than 10 protons or so that an excess of neutrons, which produce only attractive forces is required for stability. Thus the curve departs more and more from N = Z line as Z increases.
Sixty percent of stable nuclides have both even Z and even N; these are called “even-even” nuclides. Nearly all the others have either even Z and odd N (“even-odd” nuclides) or odd Z and even N (“odd-even” nuclides) with the numbers of both kinds being about equal. Only five stable odd-odd nuclides are known:
Basic Nuclear Properties | Modern Physics
Nuclear abundances follow a similar pattern of favoring even numbers for Z and N.
These observations are consistent with the presence of nuclear energy levels that can each contain two particles of opposite spin. Nuclei with filled levels have less tendency to pick up other nucleons than those with partially filled levels and hence were less likely to participate in the nuclear reactions involved in the formation of elements.
Nuclear forces are limited in range, and as a result nucleons interact strongly only with their nearest neighbors. This effect is referred to as the saturation of nuclear forces. Because the coulomb repulsion of protons is appreciable throughout the entire nucleus, there is a limit to the ability of neutrons to prevent the disruption of large nucleus. This limit is represented by the bismuth isotope Basic Nuclear Properties | Modern Physics which is the heaviest stable nuclide. 

Alpha Decay
All nuclei with Z > 83 and A > 209 spontaneously transform themselves lighter ones through the emission of one or more alpha particles, which areBasic Nuclear Properties | Modern Physics nuclei:
Basic Nuclear Properties | Modern Physics
Since an alpha particle consists of two protons and two neutrons, an alpha decay reduces the Z and N of the original nucleus by two each. If the resulting daughter nucleus has either too small or too large a neutron/proton ratio for stability, it may beta-decay to a more appropriate configuration.

Negative beta decay 
In negative beta decay, a neutron is transformed into a proton and an electron is emitted:
n0 → p+ + e- 

Positron emission
In positive beta decay, a proton becomes a neutron and a positron is emitted:
p+ → n0 + e+ 
Thus negative beta decay decreases the proportion of neutrons and positive beta decay increases it.

Electron Capture 
A process that competes with positron emission is the capture by a nucleus of an electron from its innermost shell. The electron is absorbed by a nuclear proton which is thereby transformed into neutron:
p+ + e- → n0 
Figure below shows how alpha and beta decays enable stability to be achieved.

Alpha and beta decays permit an unstable nucleus to reach a stable configuration. Alpha and beta decays permit an unstable nucleus to reach a stable configuration. 

Binding Energy 

When nuclear masses are measured, it is found that they are less than the sum of the masses of the neutrons and protons of which they are composed. This is in agreement with Einstein’s theory of relativity, according to which the mass of a system bound by energy B is less than the mass of its constituents by B / c2 (where c is the velocity of light).
The Binding energy B of a nucleus is defined as the difference between the energy of the constituent particles and of the whole nucleus. For a nucleus of atom Basic Nuclear Properties | Modern Physics 
Basic Nuclear Properties | Modern Physics
If mass is expressed in atomic mass unit 

Basic Nuclear Properties | Modern Physics
Mp : Mass of free proton,
MN : MN: Mass of free neutron,  
MH : mass of hydrogen atom          
Basic Nuclear Properties | Modern Physics : mass of the nucleus,  
Z : Number of proton,
N : Number of neutron,         

Basic Nuclear Properties | Modern Physics: mass of atom. 

Binding Energy per Nucleon

The binding energy per nucleon for a given nucleus is found by dividing its total binding energy by the number of nucleon it contains. Thus binding energy per nucleon is

Basic Nuclear Properties | Modern Physics
The binding energy per nucleon forBasic Nuclear Properties | Modern Physics is 2.224/2 = 1.112 MeV / nucleon and for Basic Nuclear Properties | Modern Physics 

it is Basic Nuclear Properties | Modern Physics
Figure below shows the binding energy per nucleon against the number of nucleons in various atomic nuclei.  
Binding energy per nucleon as function of mass number. Binding energy per nucleon as function of mass number. 

The greater the binding energy per nucleon, the more stable the nucleus is. The graph has the maximum of 8.8 MeV / nucleon when the number of nucleons is 56. The nucleus that has 56 protons and neutrons is Basic Nuclear Properties | Modern Physics an iron isotope. This is the most stable nucleus of them all, since the most energy is needed to pull a nucleon away from it. Two remarkable conclusions can be drawn from the above graph.
(i) If we can somehow split a heavy nucleus into two medium sized ones, each of the new nuclei will have more binding energy per nucleon than the original nucleus did. The extra energy will be given off, and it can be a lot. For instance, if the uranium nucleus Basic Nuclear Properties | Modern Physics is broken into two smaller nuclei, the binding energy difference per nucleon is about 0.8 MeV. The total energy given off is therefore
Basic Nuclear Properties | Modern Physics
This process is called as nuclear fission.
(ii) If we can somehow join two light nuclei together to give a single nucleus of medium size also means more binding energy per nucleon in the new nucleus. For instance, if two Basic Nuclear Properties | Modern Physics deuterium nuclei combine to form a Basic Nuclear Properties | Modern Physics helium nucleus, over 23 MeV is released. Such a process, called nuclear fusion, is also very effective way to obtain energy. In fact, nuclear fusion is the main energy source of the sun and other stars. 

Example 1: The measured mass of deuteron atom Basic Nuclear Properties | Modern Physics Hydrogen atom Basic Nuclear Properties | Modern Physics proton and neutron is 2.01649 u ,1.00782 u , 1.00727 u  and 1.00866 u. Find the binding energy of the deuteron nucleus (unit MeV / nucleon).

Here A = 2, Z = 1, N = 1
B.E.  = ZMH + NMN -  Basic Nuclear Properties | Modern Physics
= [1x 1.00782 + 1x 1.00866 -  2.01649] x  931.5 MeV
= [0.00238] x 931.5 MeV = 2.224 MeV

Example: The binding energy of the neon isotope Basic Nuclear Properties | Modern Physics is 160.647 MeV. Find its atomic mass. 

Here A = 10, Z = 10, N = 10
Basic Nuclear Properties | Modern Physics

Example:
(a) Find the energy needed to remove a neutron from the nucleus of the calcium isotop Basic Nuclear Properties | Modern Physics
(b) Find the energy needed to remove a proton from this nucleus.
(c) Why are these energies different?
Given: atomic masses of
Basic Nuclear Properties | Modern Physics and mass
Basic Nuclear Properties | Modern Physics

(a)
Basic Nuclear Properties | Modern Physics
Total mass of the Basic Nuclear Properties | Modern Physics
Mass defect Δm = 41.970943 - 41.958622 = 0.012321u
So, B.E. of missing neutron Δm x 931.5 = 11.48MeV
(b)
Basic Nuclear Properties | Modern Physics
Total mass of the Basic Nuclear Properties | Modern Physics
Mass defect Δm = 41.919101 - 41.958622 = 0.010479u
So, B.E. of missing protron = Δm x 931.5 = 10.27MeV
(c) The neutron was acted upon only by attractive nuclear forces whereas the proton was also acted upon by repulsive electric forces that decrease its binding energy.

Salient Features of Nuclear Forces

Nucleus is bounded by nuclear forces. The basic properties of nuclear forces are
(i) It is a short range attractive force.
(ii) It is in general non-central force.
(iii) They have property of saturation i.e. each nucleon interacts only with its nearest neighbors and not with all the constituents in the nucleus. This is apparent from the fact that average B.E. per nuclear remains approximately constant i.e.
BE . ∝ A
When all interactions are possible then A(A-1)/2 interaction may take place;  
B.E. ∝ A2  is not valid.
(iv) They are charge independent i.e. n - n, p - p and n - p have same nuclear force.
(v)  They are spin dependent force as shown by deuteron.
(vi) They are exchange forces proposed by Yukawa(Meson Theory).
Despite the strength of the forces that holds nucleons together to form an atomic nucleus, many nuclides are unstable and spontaneously change into other nuclides by radioactive decay.
Basic Nuclear Properties | Modern Physics

The document Basic Nuclear Properties | Modern Physics is a part of the Physics Course Modern Physics.
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FAQs on Basic Nuclear Properties - Modern Physics

1. What is the size and density of a nucleus?
Ans. The size of a nucleus is extremely small compared to the overall size of an atom. It is typically in the range of 1 to 10 femtometers (1 femtometer = 10^-15 meters). The density of a nucleus is very high, with values around 10^17 to 10^18 kilograms per cubic meter.
2. What is the spin and magnetic moment of a nucleus?
Ans. The spin of a nucleus refers to the intrinsic angular momentum possessed by the nucleus. It is quantized and can have values of 0, 1/2, 1, 3/2, and so on. The magnetic moment of a nucleus arises due to the presence of spinning charged particles within the nucleus. It is a vector quantity and is related to the spin and charge distribution of the nucleus.
3. What is the angular momentum of a nucleus?
Ans. The angular momentum of a nucleus is the rotational momentum it possesses due to its spin and motion. It is a vector quantity and is related to the spin and angular velocity of the nucleus. The angular momentum of a nucleus is quantized and can have values that are integer multiples of Planck's constant divided by 2π.
4. What are stable nuclei?
Ans. Stable nuclei are those that do not undergo spontaneous radioactive decay. They have a balance between the number of protons and neutrons, which allows them to be relatively stable over long periods of time. Stable nuclei are important for the existence of atoms and the stability of matter.
5. What is binding energy in nuclear physics?
Ans. Binding energy in nuclear physics refers to the energy required to separate the nucleus into its individual nucleons (protons and neutrons). It is a measure of the stability of the nucleus and is equivalent to the energy released when the nucleus is formed from its constituent nucleons. Higher binding energy indicates greater stability of the nucleus.
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