Difference between revisions of "Introduction to Detection of Gamma Radiation"

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=== Gamma Emission comes from Excited States ===
 
=== Gamma Emission comes from Excited States ===
  
When a nucleus decays by emitting an alpha or beta particle the daughter product will frequently be in an excited state. The excess energy (related to the daughter's ground state) is usually released as gamma radiation. The deexitation of such excited states does not always occur directly to the ground state, but can go via lower-lying excited states. Frequently the deexcitation scheme can be quite comples, as illustrated in the figure (copied from Table of Isotopes, eight edition)  
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When a nucleus decays by emitting an alpha or beta particle the daughter product will frequently be in an excited state. The excess energy (related to the daughter's ground state) is usually released as gamma radiation. The deexitation of such excited states does not always occur directly to the ground state, but can go via lower-lying excited states. Frequently the deexcitation scheme can be quite comples, as illustrated in the figure below (copied from Table of Isotopes, eight edition), which shoes gamma transitions from excited states in <sup>108</sup>Pd, after beta decay of <sup>108</sup>Rh.
  
 
[[Image:108Rh beta disintegration.jpg|500px]]  
 
[[Image:108Rh beta disintegration.jpg|500px]]  
  
<br>
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Due to the (usually) partial beta-feeding of the excited levels and the many different deexcitation paths the intensity of the emitted gamma rays will vary - from nearly 100% downto very small fractions of a percent. This must be taken into account when you analyse a gamma spectrum, the visibility  of the different gamma rays (i.e. how clearly it shows up in the spectrum) depend on it's emission rate. <br>
  
<br>
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=== Detection of Gamma Rays ===
  
*Emission of electromagnetic radiation (gamma rays). The energy of a gamma lies between 10 keV and 104 MeV, given by E = hv<br>
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To understand what you see when measuring gamma rays, you need to understand how gamma rays interact with matter. This is briefly explained below. Refer to your course book and lecture notes for more details.  
*Transfer of the excitation energy to an electron, where the electron is called a conversion electron.<br>
 
*Absorption of photons in matter<br>
 
  
A photon can interact with matter in three different ways. <br>
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A photon (gamma ray) can interact with matter in three different ways:
  
#The first way is called the photoelectric effect, where the gamma energy is transferred in its entirety to an electron in one of the inner shells of an atom or ion in the absorption material. The electron emitted has a kinetic energy corresponding to the gamma energy minus the binding energy of the electron. The electron velocity decreases via electrostatic interactions with absorbator electrons and protons, and thus gives off its kinetic energy to the absorber. <br>
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#'''The photoelectric effect''', where the gamma energy is transferred in its entirety to an electron in one of the inner shells of an atom in the absorption material. The electron emitted has a kinetic energy corresponding to the gamma energy minus it's binding energy. The ejected (primary) electron is shot away at great speed. It's velocity decreases via electrostatic interactions with the absorbator's electrons, and thus gives off its kinetic energy to the absorber in thousends of small steps. <br>
#The second way a photon can interact with matter is called Compton scatter.&nbsp;Parts of the gamma energy is emitted to an (unbound) electron and this electron energy is deposited in the absorber (Compton electron). The loss of energy from the photons interaction increases its wavelength, and therby changes its direction. The scattered gamma can either leave the absorber or interact again. If a gamma quant from Compton scattering reacts again, it will happen so quickly that it would be impossible to observe each of the two steps. <br>
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#The second way a photon can interact with matter is called '''Compton scattering'''. Parts of the gamma energy is transfered to out electron of the absorbator's atoms. Again the energy of the electron (Compton electron) is deposited in the absorber . The remaing energy after the Compton interaction result in a new photon. The photon can either leave the absorber or interact at some other part of it. If the photon from the Compton scattering also interacts, it will happen so quickly that normal electronics will not be able to distinguis the two events, but will record them as one event with energy equal to their sum. <br>
#Pair formation is the third way of interaction. When a photon has higher energy than 1022 MeV an electron/positron pair may spontaneously form. The total kinetic energy of the two elementary particles are equal to the energy of the gamma minus 1022 MeV. The electron vil transfer its energy as described under the last part of 1. As the positron is slowed down the chance it will interact with an electron increases before it eventually does and both particles disappear and turns into 2 quants of 511 keV, called anhiliation energy.&nbsp; &nbsp; <br>
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#'''Pair formation''' is the third way of interaction. When a photon has higher energy than 1022 MeV an electron/positron pair may spontaneously form. The total kinetic energy of the two elementary particles are equal to the energy of the gamma minus 1022 MeV. Again the electron and positron will transfer its kinetic energy to the absorber through Columb interactions. However, as the positron is an antiparticle to electrons it will immediately interact with an electron and anhillate when it's kinetic energy is spent (then it has time "to look around" and discover that it's electrons everywhere, which is not good news for survival...!). The anhillation creates two photons of 511 keV each, moving in opposite directions. The 511 keV photons can either escape the absorpber (detector) or interact with it. This will give rise to "double escape", "single escape" or "full energy equivalent" events in associated gamma spectra.  
  
<br>
 
 
The intensisity of a monoenergetic gamma ray decreases exponentially in matter, according to the following equation:
 
 
<span class="texhtml">''I'' = ''I''<sub>0</sub>''e''<sup> - μ''x''</sup></span><sup></sup>
 
 
where <span class="texhtml">μ</span> is the absorption coeffecient and x is the thickness of the absorbator.
 
 
If we set <math>I= \frac{I_{0}}{2}</math> into the above equation, we get the following:
 
 
<math>d_{1/2} = \frac{ln2}{\mu}</math>
 
 
<br><br>
 
  
 
[[Category:Radiation_protection]]
 
[[Category:Radiation_protection]]

Latest revision as of 12:07, 14 October 2012

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Gamma Emission comes from Excited States

When a nucleus decays by emitting an alpha or beta particle the daughter product will frequently be in an excited state. The excess energy (related to the daughter's ground state) is usually released as gamma radiation. The deexitation of such excited states does not always occur directly to the ground state, but can go via lower-lying excited states. Frequently the deexcitation scheme can be quite comples, as illustrated in the figure below (copied from Table of Isotopes, eight edition), which shoes gamma transitions from excited states in 108Pd, after beta decay of 108Rh.

108Rh beta disintegration.jpg

Due to the (usually) partial beta-feeding of the excited levels and the many different deexcitation paths the intensity of the emitted gamma rays will vary - from nearly 100% downto very small fractions of a percent. This must be taken into account when you analyse a gamma spectrum, the visibility of the different gamma rays (i.e. how clearly it shows up in the spectrum) depend on it's emission rate.

Detection of Gamma Rays

To understand what you see when measuring gamma rays, you need to understand how gamma rays interact with matter. This is briefly explained below. Refer to your course book and lecture notes for more details.

A photon (gamma ray) can interact with matter in three different ways:

  1. The photoelectric effect, where the gamma energy is transferred in its entirety to an electron in one of the inner shells of an atom in the absorption material. The electron emitted has a kinetic energy corresponding to the gamma energy minus it's binding energy. The ejected (primary) electron is shot away at great speed. It's velocity decreases via electrostatic interactions with the absorbator's electrons, and thus gives off its kinetic energy to the absorber in thousends of small steps.
  2. The second way a photon can interact with matter is called Compton scattering. Parts of the gamma energy is transfered to out electron of the absorbator's atoms. Again the energy of the electron (Compton electron) is deposited in the absorber . The remaing energy after the Compton interaction result in a new photon. The photon can either leave the absorber or interact at some other part of it. If the photon from the Compton scattering also interacts, it will happen so quickly that normal electronics will not be able to distinguis the two events, but will record them as one event with energy equal to their sum.
  3. Pair formation is the third way of interaction. When a photon has higher energy than 1022 MeV an electron/positron pair may spontaneously form. The total kinetic energy of the two elementary particles are equal to the energy of the gamma minus 1022 MeV. Again the electron and positron will transfer its kinetic energy to the absorber through Columb interactions. However, as the positron is an antiparticle to electrons it will immediately interact with an electron and anhillate when it's kinetic energy is spent (then it has time "to look around" and discover that it's electrons everywhere, which is not good news for survival...!). The anhillation creates two photons of 511 keV each, moving in opposite directions. The 511 keV photons can either escape the absorpber (detector) or interact with it. This will give rise to "double escape", "single escape" or "full energy equivalent" events in associated gamma spectra.