Wednesday, June 5, 2019

Coincidence Counting With NAI Scintillation Detectors

Coincidence Counting With NAI Scintillation DetectorsABSTRACTCoincidence counting is a technique employed in nuclear medicine for PET imaging. This technique utilizes a antielectron verbaliseting radionuclide that is injected into patients to track biochemical and physiological processes. The positron annihilates with an electron and emit two 0.511MeV da Gamma rays which are detected simultaneously by two scintillation demodulators. In the experiment, two da Gamma ray sources, 60Co and 22Na were used with a NaI scintillation counter. A single channel analyzer (SCA) was used to count the effect of voltage pulses whose height fell within the opening width. The absolute competency and internal capacity was sireed as a portion of space. Real and haphazard coincidences were determined from the spectrum obtained with varying access width and adit delay for each source. The optimum entrance width obtained was 5sec for both sources with gate delays of 1.2sec and 0.2sec for 22 Na and 60Co respectively. The authentic coincidences for 22Na and 60Co were arrange to be 200.1 2.3 and 76.5 1.7 respectively. The hit-or-miss coincidences obtained were 25.1 3.4 and 13.4 2.6 for 22Na and 60Co respectively. This was determined by using the LINEST thing. The helping thus of random to authentic coincidences obtained in this experiment was 12.54 1.85 % and 17.52 3.81 % for 22Na and 60Co respectively. It was deduced that the uncertainty in determining a random coincidence was melloweder in 60Co than in 22Na. the order of magnitude of the uncertainty is as a result of fluctuations in the instrumentation. Hence the Na system is more efficient for coincidence counting and so it is useful in the PET system.INTRODUCTIONCoincident counting is a radiological measuring technique that is utilised in the nuclear medicine in the PET play out whereby two photons emitted from an publication are detected simultaneously by a ring of demodulators. Sodium Fluoride (F18- NaF) is the positron-emitting radionuclide employed in PET for gussy up imaging 1. Upon molder, the positron are emitted which travels for a short distance and under Comptons scattering thitherby loosing most of its energy. It then undergoes annihilation with an electron and emit two high energy 0.511MeV photons. The 0.511MeV photons are emitted 180 degrees apart and interact with the PET detector rings at opposite sites. 2 The detectors are made up of scintillation crystals bring together with photomultiplier tubes powered by a high voltage which produces a pulse with a height proportional to the gamma-ray energy. A SCA counts the number of voltage pulses whose height waterfall within a predetermined window of photon energies.Coincidence measurement is utilised when a single detector crowd outnot produce all the information expected, as gamma rays are randomly produced, hence the need to set several detectors. Real coincidences occur when two photons are emitted in coincidence from the same annihilation event and are detected simultaneously within a certain judgment of conviction frame set by the gate width. Random coincidences occur when two photons emitted from opposite events are detected simultaneously within the time frame of the gate width. 3 The gate width determines the time window within which the simultaneous emission of the gammas are detected. The optimum gate width therefore will ensure that the maximum number of real coincidences are detected to minimise the events of random coincidences. In the perfection situation when the gate width is energy the real coincidences can be observed, and with an increase in gate width the random coincidences can be observed.In the PET scan, this will ensure force of the coincidence system. The need for the gate delay is to enable the second pulse to be detected within the time frame of the gate width and this is usually a minute time frame. It takes into account the minute fluctuations that occur at ti me of pulses. By alternating the gate delay and gate width, the rate of coincidence can be determined.In this experiment the two sources used were 60Co and 22Na. 60Co emit two gamma rays upon beta decay at energies 1.3325Mev and 1.1732MeV with 60Ni daughter nuclide. The 22Na undergoes a beta decay and electron capture decay with the emission of a 1.275MeV gamma photons and two 0.511Mev upon interactions with the detector material. The positron from the beta decay of 22Na annihilates an electron of the detector and emit the two gammas at 0.511Mev energies at 1800. The coincidence counting system records just a certain portion of events depending on the solid angle as a feed of distance. Coincidence counting as a operate of distance is maximum in the middle and zero at the edge 4.The photons can undergo several interactions in the detector before they are detected and that render the detector inefficient and so there is the need for its efficiency to be determined. The efficiency c an be classed into two as absolute and inhering efficiencies and they are defined as autocratic efficiency abs = Number of pulses recorded 3 Number of radiation quanta emitted by source inwrought efficiency int = Number of pulses recorded 3 Number of radiation quanta incident on detectorThese efficiencies are related byint = abs * (4/) 3where is the solid angle of the mingled with source and detector. The solid angle is low-level on the distance amidst source and detector (d) and the radius of the detector (r) and it is determined by the this equation, = 2 1 d 3d2 + r2To determine the efficiency of the coincidence system, the absolute efficiency for real and random coincidences were excessively determined for both sources based on the equations below.abs for real coincidences for 22Na = abs * intabs for random coincidences for 22Na = (abs)2 * Activity * Intensity * Timeabs for real coincidences for 60Co = abs * absabs for random coincidences for 60Co = (abs)2 * Activity * In tensity * Time systemTwo NaI detectors coupled with photomultipliers with high voltages and preamplifiers were used for this experiment. The inputs were connected to spectroscopic and SCA amplifiers. Detector 1 was first corrected for background by counting for 5 minutes. The 22Na gamma ray source was varied with distance and the absolute efficiency of the detector was determined as a result. Detector 2 was introduced and set at a distance of 10cm apart from Detector 1. 22Na was positioned in the middle and the counting was set to 5 minutes. The gate width and gate delay were varied and their spectrum observed. The experiment was reiterate for the second gamma ray source, 60Co.The optimum gate delay was determined and varied with the gate width to obtain the optimum gate width. A unidimensional graph of count rate against gate width was obtained that showed the real and random coincidences based on the slope gradient obtained. The percentage ratio of the random to real coincidenc es were determined and the uncertainty associated with the experiment was also determined.RESULTS/DISCUSSIONThe background spectrum was corrected in the count reading for both sources. The background radiation is as a result of scattered radiation associated with the experiment.The absolute efficiency of the detector was determined for both sources as shown in Figure 1 and Figure 2 and hedge 1a 1b and evade 2a 2b for 22Na and 60Co respectively. The absolute efficiency was obtained using the formula dogmatic efficiency = Sum of count Intensity x ActivityFigure 1 Absolute efficiency as a function of the distance between the 22Na source and detectorFigure 2 Absolute efficiency as a function of distance between the 60Co source and detectorThe 22Na revealed a gradual decrease in efficiency with increasing distance, whereas 60Co revealed a rapid drop in efficiency as a function of distance. 60Co revealed lower absolute efficiencies since the measure of the number of pulses obtained by the 60Co was less than the number of photons emitted by the gamma ray source. This could have been collect to Compton scattering reducing the number of photons actually detected as a pulse. The 22Na however revealed quite high absolute efficiencies and so can be support that the detector was efficient in detecting the 22Na than the 60Co.The intrinsic efficiency was determined using the equation below.int = abs * (4/)The solid angle was determined for the detector when the distance between both detectors was varied between 5cm to 20cm and the radius of the detector was measured as 10cm.This is shown in Tables 3 and 4 and Figures 3 and 4 for 22Na and 60Co respectively.Figure 3 Intrinsic efficiency as a function of distance between the 22Na source and detectorFigure 4 Intrinsic efficiency as a function of distance between the 60Co source and detectorThe intrinsic efficiency for 60Co was lower than 22Na. It can be deduced that the number of 60Co photons incident on the detector was m ore than the number of pulses recorded. Hence signifying that the detector was not efficient in detecting the 60Co. The 22Na however displayed high intrinsic efficiency almost approximating the maximum value for intrinsic efficiency. The intrinsic efficiency were found to be fluctuating with the highest creation 0.9898 and 0.3872 with a solid angle of 1.3029 at 13cm distance from detector for 22Na and 60Co respectively. This is as result of the detectors geometry detecting the photons at different solid angles. The solid angle determines how much of the photons can be detected as a function of distance. The overlap of the delusion bars signifies the uniformity of the errors.The probability of a 0.511MeV gamma travelling in the direction of the detector and creation absorbed by it, will imply that the second 0.511MeV will also travel in the correct direction. Both detectors detecting the two 0.511MeV gammas can be determined to yield the absolute efficiency for real coincidences. This can be deduced from the notion that photons travelling in the right direction will be absorbed in the right direction by both detectors. The results of absolute efficiencies for real and random coincidences for 22Na and 60Co is shown in Table 5 6 and Figure 5, 6, 7 8. The efficiencies for both sources decreased with distance and it was lower for 60Co. The absolute efficiency for random coincidences was however for both sources than the absolute efficiency for real coincidences. It can thus be inferred that the absolute efficiencies for real coincidences for both 22Na and 60Co yields less probability of spotting of real coincidence with 60Co as compared to the 22Na. The absolute efficiencies for random coincidences was however comparable for both sources as the probability of detecting the second event within the gate width is possible for both sources.Figure 5 Absolute efficiency for real coincidences as a function of distance for 22NaFigure 6 Absolute efficiency for random coincidences as a function of distance for 22NaFigure 7 Absolute efficiency for real coincidences as a function of distance for 60CoFigure 8 Absolute efficiency for random coincidences as a function of distance for 60CoThe gate delay was varied with gate width to obtain the optimum values of delay and width. The optimum gate delay was obtained as 1.2sec and 0.2sec for both 22Na and 60Co respectively and was used for the experiment. A linear graph of count rate as a function of gate width was obtained and a fixed gate width was obtained as shown in Figure 5 and 6 and table 7 and 8Figure 5 A linear graph of count rate as a function of gate width applying a 1.2sec gate delay for 22NaFigure 6 A linear graph of count rate as a function of gate width by applying a 0.2sec gate delay for 60CoReal coincidences occur on the intercept of the linear slope gradient, whereas random coincidences can be found with the slope.For 22Na the optimum gate width obtained was 5sec. The graph of count rate as a function of gate width yielded a slope gradient of y = 5.019x + 200.15. By applying the optimum gate width and correcting for the gate delay, the real and random coincidences were determined using the LINEST function. The real coincidences was found to be 200 2.3 whereas the random coincidences was found to be 25.1 3.4. The percentage thus of random to real coincidences obtained in this experiment was 12.54 1.85 %. This gives the value of pure coincidences that are not dependent on gate width.For 60Co, the optimum gate width was 5sec. The graph of count rate as a function of gate width yielded a slope gradient of y = 2.6801x + 76.483. When the optimum gate width was applied whilst correcting for the minute gate delay, the real and random coincidences were determined using the LINEST function. The real coincidences was found to be 76.5 1.7 whereas the random coincidences was found to be 13.4 2.6. The percentage of random to real coincidences obtained in this experiment was 17.52 3.81 %.The above results was compared with the measured values obtained from the graph. The intercept gave the real coincidences as 200.15 and 76.48 for 22Na and 60Co respectively. The point of data convergence on the straight line gave the optimum gate width and the count equivalent was found as 225.28 and 90.02 for 22Na and 60Co respectively. The difference between this value and the real coincidences yielded the random coincidences as 25.13 and 13.56 in 22Na and 60Co respectively. Hence the percentage ratio of the random and real coincidences was obtained as 12.49% and 17.73%. This is equivalent to the values obtained from the calculated coincidences with the differences being due to uncertainties.The uncertainties with this experiment were with the NaI detector which contributed to scatter around the cover. The count rates resulted in some uncertainties as well and has been sown in table 8 for both detectors. The solid angle presented an uncertainty as the measurements fo r the detector could incur a large margin of errors.From all the results synthesized for both sources it could be gathered that the 22Na was an efficient source for coincidence counting compared to the 60Co. This is as a result of the geometry of the detectors as the Co system does not show a coincidence system and so there is more likelihood of a random coincidence than a real coincidence as compared to the Na system. This concludes that the 22Na will be efficient in a PET system, hence the reason for positron emitting radioisotopes being used in the PET system to ensure the maximum number of coincidences are being detectedCONCLUSIONThe experiment was performed to examine the coincidence counting in two gamma ray sources and to determine the real and random coincidences as a function of gate width.The optimum gate width obtained was 5sec for both sources with gate delays of 1.2sec and 0.2sec for 22Na and 60Co respectively. The real coincidences for 22Na and 60Co were found to be 20 0.1 2.3 and 76.5 1.7 respectively. The random coincidences obtained were 25.1 3.4 and 13.4 2.6 for 22Na and 60Co respectively. This was determined by using the LINEST function. The measured count rates was also determined from the graph and resulted in real coincidences for 22Na and 60Co respectively as 200.15 and76. 48 and random coincidences of 25.13 and 13.56. The percentage thus of random to real coincidences obtained in this experiment was 12.54 1.85 % and 17.52 3.81 % for 22Na and 60Co respectively. This gave the quality of the uncertainty in the coincidence system. It was deduced that the uncertainties in determining a random was high in 60Co than in 22Na hence the Na system is more efficient for coincidence counting and very useful in the PET system.REFERENCES1 The detection of bone metastases in patients with high-risk prostate cancer99mTc-MDP planar bone scintigraphy, single- and multi-field-of-view SPECT,18F-fluoride PET, and18F-fluoride PET/CT.Even-Sapir et al, J Nucl Med(2006)47287972 The Physics of Medical Imaging, ed. S. Webb. IoP publishing3 Radiation and Detection Measurement, Glen N Knoll, 3rd Edition4 Coincidence Counting, E. K. A. Advanced Physics Laboratory, Physics 3081, 4051APPENDIXESTable 1a Counts rate as a function of distance between source and detector for 22NaTable 1b Absolute efficiency as a function of distance between source and detector for 22NaTable 2a Counts rate as a function of distance between source and detector for 60CoTable 2b Absolute efficiency as a function of distance between source and detector for 60CoTable 3 Intrinsic efficiency as a function of distance between source and detector of 22NaTable 4 Intrinsic efficiency as a function of distance between source and detector for 60CoTable 5 abs for real and random coincidences as a function of distance for 22NaDistance(cm)abs4intabs for real coincidencesabs for random coincidences50.099403.47312.570.359670.099448.7255100.050911.840312.570.3476370.050912.8015130 .040151.3029

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