Type of radiation charged particles photonen neutronen Uncharged particles Charged particles electrons (β - ) He 2+ (α), H + (p) D + (d) Recoil nuclides Fission fragments Interaction of ionizing radiation with matter can be described at the molecular level (molecular process) or as macroscopic effects ( decrease, absorption, scattering, etc.) 1
Practical consequences of the interaction with matter Radiation: deceleration, decrease of energy Matter: physical, chemical, and/or biological effects Important parameters: particle mass, charge speed, kinetic energy spin matter atom mass Atom number Z number of e - per volume density ionization potential 2
Synopsis of interactions with the electron shell charged particles photons scattering, ionization photo effect compton effect 3
Synopsis of interactions with the atomic nucleus charged particles photons scattering, Bremsstrahlung, nuclear reaction pair formation nuclear reaction 4
Ionizing radiation Direct ionizing radiation: α, β -, β +, Energy is high enough to ionize by collision Indirect ionizing radiation: n, γ Ionization as a consequents of nuclear reactions in the absorbing matter In the context of radiation absorption, two definitions are important: linear stopping power and linear energy transfer also important Without Bremsstrahlung S I and L I are equal, otherwise there will be a substantial difference 5
Ionizing radiation Charged particles: deceleration by inelastic scattering Ionization and Excitation 6
Ionizing radiation By collision with electrons, the incident particle ionizes matter The mean energy to remove an electron is called the W-factor W-factor for air is 33.85eV/IP When the charged particle travels through matter, it makes an energy dependent number of ionization / length this is called specific ionization (SI) The mean energy loss per path length (LET) can determined by: LET = SI W LET = Linear Energy Transfer 7
Ionizing radiation The lower the energy, the higher the SI since probability of interaction with shell electron increases Bragg Peak 8
Ionizing radiation Example 241 Am was in smoke detectors E α = 5.48 MeV specific ionization (SI) = 3.4 10 4 IP/cm LET = 3.4 10 4 33.8 = 1.2 MeV/cm Range = = = 4.8 cm This is the maximum range, the SI increases dramatically at the end of the path. 9
Ionizing radiation SI is a characteristic feature of a specific material, since the e - -density changes. To compare different materials, the relative stopping power is useful. RSP = R air /R abs (R = Range) RSP values for some materials and particles 10
Ionizing radiation Ranges in air for different particles and energies 11
Interaction of electrons with matter The most important interaction of electrons with matter is inelastic scattering with electrons from the shells. ionization Since not every collision leads to ionization, the average energy loss for ionization is larger than the minimal I e of the atoms Bethe and Bloch proposed a simple formula for energy loss along a track, considering the nature of the absorber 12
Interaction of electrons with matter m e = rest mass of an electron ε 0 = dielectric constant (vacuum) ν = velocity of the electron T = mean ionization density of the matterial e - are light particles, relativistic effects have to be considered E = 100 kev E = 1000 kev v = 0.55 c v = 0.94 c m = 1.2 m o m = 3 m o for lower energies, the relativistic effects can be neglected 13
Interaction of electrons with matter The formula predict a minimum value de dx at a certain energy......depending only on the mass of the particle The slower the particle the more ionization per length. 14
Interaction of electrons with matter Typical β - decay shows a continuous energy distribution, hence it has many low energy electrons The Bethe-Bloch formula is an exponential formula Empirically, it can be described: Ψ(x) = Ψ(0) e -µ x with µ = konst or N(x) = N 0 e -µ x with µ = linear absorption coefficient (see x-ray crystallography) 15
Interaction of electrons with matter The absorption of electrons decreases linearly Often, instead of path x one takes mass-equivalent range d = δ x then with µ/δ = mass absorption coefficient µ is a function of the electron energy and the material it allows to calculate the maximum range of electrons in a material it allows to calculate the thickness of materials for shielding 16
Interaction of electrons with matter Example: equivalent range of e - in Al one can easily calculate the path for reducing the e - -flux to 50% x 1/2 = ln2 µ and d 1/2 = (ln2)/(µ/8) x 1/2 can be determined experimentally and µ be calculated for a particular material 17
Interaction of electrons with matter Semiempirical relationship between µ, δ and E max Semiempirical relationships for connecting range with electron energy (0.15 < E β < 0.8 MeV) 18
Interaction of electrons with matter Maximum ranges of different β-emitters 19
Interaction of charged particles with matter How much energy can be lost in a single collision? Of particular interest: collision with a shell electron Maximum energy transfer incoming particle : mass M i, speed V i1 electron : mass m e speed 0 after collision : M i, v 2, m e, v e Energy: ½ M i v 12 = ½ M i v 22 + ½ m e v e 2 momentum: M i v 1 = M i v 2 + m e v e (non-relativistic) 20
Maximum energy transfer (MET) speed of reflected particle MET Q max = nicht relativistisch If M i = m e (electron on electron) then Q max = E This explains why light particles have a zigzag pass in matter Example: α-particle colliding with an e - m e = 9.109 10-31 kg mα = 6.646 10-27 kg 5.468 10-4 u 4.0026 u Q max /E = = 0.00054 = 0.05 %!! heavy particles travel straight 21
Maximum energy transfer (MET) Examples for protons H Proton Kinetic Energy E (MeV) 0.1 1 10 100 10 3 10 4 10 5 10 6 10 7 Q max (MeV) 0.00022 0.0022 0.0219 0.229 3.33 136 1.06 x 10 4 5.38 x 10 5 9.21 x 10 6 Maximum percentage energy transfer 100Q max /E 0.22 0.22 0.22 0.23 0.33 1.4 10.6 53.8 92.1 22
Bremsstrahlung Besides inelastic scattering at the electron shell, inelasting scattering at the nucleus is the most important interaction. Which results in the emission of Bremsstrahlung 23
Bremsstrahlung The stopping power of atoms or materials does not only depend on ionization but also on direct electron-target nucleus interactions This energy loss generates photons, so called Bremsstrahlung total stopping power From Bethe-Formula, the ratio between collision and radiation is The higher the energy, the more Bremsstrahlung The higher the atomic number, the more Bremsstrahlung 24
Bremsstrahlung The stopping efficiency by Bremsstrahlung increases by z 2, but the stopping by ionization only by z. The formation of Bremsstrahlung increases with the energy of the electron The following formula gives this ratio Example: Pb shielded source of 90 Y(E max = 2.28MeV) produces 10% Bremsstrahlung 25
Bremsstrahlung 26
Bremsstrahlung Example: Pb shielded source of 90 Y(E max = 2.28MeV) produces 10% Bremsstrahlung Don t shield β-emitters with lead!! 27
Bremsstrahlung The Bremsstrahlung is used to produce synchrotron radiation Synchrotron Lichtquelle Schweiz SLS 28
Interaction of γ-radiation and x-rays with matter Photons do not steadily lose energy as they penetrate matter The distance the photons can travel before they interact with an atom is governed statistically by a probability, which depends on the specific medium and on the photon energy Photo Effect Three principle modes of interaction Compton Effect Pair Formation 29
Photo effect incoming γ-quant interaction between γ - quanta and electrons of the inner shells emission of a photoelectron (ionization) dominates with low photon energies absorption of the γ -quant photoelectron Electron of the shell higher energy level radiation electron gap filled by an outer-sphere electron (X-ray fluorescence, secondary radiation) lower energy level γ-quant 30
Photo effect The photoelectron contains the complete energy of the γ quant minus an energy ϕ that the electron expends in escaping the atom T = hν ϕ Every γ-rays emitting nucleus emits γ-quanta with a distinct energies (fingerprint) γ spectroscopy http://en.wikipedia.org/wiki/file:gammaspektrum_uranerz.jpg 31
Photo effect The photo effect depends strongly on the atomic number Z and the energy hν of the photons probabilit y = Z4 ( hν ) 3 32
Compton effect Incoming γ-quant scattered γ-quant compton electron interaction between γ -quanta and e - of the outer electron shells (Compton electrons) emission of a Compton electron (ionization) γ -quant loses energy (shift to longer wavelengths, Compton shift) the Compton shift only depends on the scattered angle, not on the wave length of the incident-photon resulting quant can undergo more Compton reaction or finally photo reactions 33
Compton effect Compton continuum http://en.wikipedia.org/wiki/file:gammaspektrum_uranerz.jpg The emitted Compton electrons have no defined energy (Compton continuum) 34
Pair formation E = m c Never forget: 2 A photon with an energy of at least 1.022 MeV can be converted into an e + / e - pair in the field of an atomic nucleus hν 2 c 2 m e Excess energy is kinetic energy of the products incoming γ-quant The distribution of the excess energy is continuous 35
Pair formation Pair production becomes more likely with increasing photon energy The probability also increases with the atomic number probability Z 2 36
Annihilation of positrons The produced positron immediately reacts with an electron e + + e = hν Since the total momentum before the decay is zero, two photons must be produced in order to conserve momentum The produced photons going off in opposite directions Due to 2m e c 2 = hν the photon energy is 511 kev (1.022 MeV/2) 37
Pair formation Disadvantage: The presents of 511 kev annihilation photons around any positron source is always a potential radiation hazard Advantages: Pair Formation helps to convert high energy photons (> 1.022 MeV) into photons with less energy (511 kev) easier to shield Question: How would you shield a γ-emitter? 38
Interaction of γ-radiation and x-rays with matter 2.03.2018
Interaction of neutrons with matter Neutrons have no charge and don t interact with the shell electron (no direct ionization) Interactions between neutrons and matter are interactions with nuclei (only secondary ionization processes) Classification of Neutrons Thermal Neutrons: Energy distribution according to the Maxwell Boltzmann equation Energy 0.025 ev (most probable energy in the distribution at 20 C) Slow Neutrons: Also called intermediate of resonance neutrons. Energy 0.1 MeV Fast Neutrons: Energy 20 MeV Relativistic Neutrons: Energy > 20 MeV 40
Interaction of neutrons with matter Elastic scattering Inelastic scattering slow neutron W 2 slow neutron W 2 fast neutron W 1 Backscattered nucleus W 3 fast neutron W 1 Backscattered nucleus W 3 γ-quant energy range: 10 kev - 1 MeV energy range: 1-10 MeV emission of excess energy as γ-quants 41
Interaction of neutrons with matter Qmax = 4mME n ( M + m) 2 Elastic scattering M = Mass of a neutron m = Mass of the recoil nucleus E n = Kinetic energy of the neutron slow neutron W 2 Maximum Fraction of Energy Lost, Q max / E n fast neutron W 1 Backscattered nucleus W 3 energy range: 10 kev - 1 MeV 42
Interaction of neutrons with matter Slowing-down neutrons is called neutron moderation If a neutron reaches thermal energies, it will move about randomly by elastic scattering until absorbed by a nucleus Nuclear reaction: (n,p), (n, 2n), (n, α), (n, γ) Neutron Activation Analysis 43