Specific activity: Difference between revisions

Latest revision as of 22:52, 7 December 2025

Template:Short description Script error: No such module "about". Script error: No such module "Unsubst". Template:Infobox physical quantity Template:Infobox physical quantity

Specific activity (symbol a) is the activity per unit mass of a radionuclide and is a physical property of that radionuclide.^[1]^[2] It is usually given in units of becquerel per kilogram (Bq/kg), but another commonly used unit of specific activity is the curie per gram (Ci/g).

In the context of radioactivity, activity or total activity (symbol A) is a physical quantity defined as the number of radioactive transformations per second that occur in a particular radionuclide.^[3] The unit of activity is the becquerel (symbol Bq), which is defined equivalent to reciprocal seconds (symbol s⁻¹). The older, non-SI unit of activity is the curie (Ci), which is Script error: No such module "val". radioactive decays per second. Another unit of activity is the rutherford, which is defined as Script error: No such module "val". radioactive decays per second.

The specific activity should not be confused with level of exposure to ionizing radiation and thus the exposure or absorbed dose, which is the quantity important in assessing the effects of ionizing radiation on humans.

Since the probability of radioactive decay for a given radionuclide within a set time interval is fixed (with some slight exceptions, see changing decay rates), the number of decays that occur in a given time of a given mass (and hence a specific number of atoms) of that radionuclide is also a fixed (ignoring statistical fluctuations).

Formulation

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Relationship between λ and T_1/2

Radioactivity is expressed as the decay rate of a particular radionuclide with decay constant λ and the number of atoms N:

$- \frac{d N}{d t} = λ N .$

The integral solution is described by exponential decay:

$N = N_{0} e^{- λ t},$

where N₀ is the initial quantity of atoms at time t = 0.

Half-life T_1/2 is defined as the length of time for half of a given quantity of radioactive atoms to undergo radioactive decay:

$\frac{N_{0}}{2} = N_{0} e^{- λ T_{1 / 2}} .$

Taking the natural logarithm of both sides, the half-life is given by

$T_{1 / 2} = \frac{\ln 2}{λ} .$

Conversely, the decay constant λ can be derived from the half-life T_1/2 as

$λ = \frac{\ln 2}{T_{1 / 2}} .$

Calculation of specific activity

The mass of the radionuclide is given by

$m = \frac{N}{N_{A}} [mol] \times M [g/mol],$

where M is molar mass of the radionuclide, and N_A is the Avogadro constant. Practically, the mass number A of the radionuclide is within a fraction of 1% of the molar mass expressed in g/mol and can be used as an approximation.

Specific radioactivity a is defined as radioactivity per unit mass of the radionuclide:

$a [Bq/g] = \frac{λ N}{M N / N_{A}} = \frac{λ N_{A}}{M} .$

Thus, specific radioactivity can also be described by

$a = \frac{N_{A} \ln 2}{T_{1 / 2} \times M} .$

This equation is simplified to

$a [Bq/g] \approx \frac{4.17 \times 1 0^{23} [{mol}^{- 1}]}{T_{1 / 2} [s] \times M [g/mol]} .$

When the unit of half-life is in years instead of seconds:

$\begin{aligned} a [Bq/g] & = \frac{4.17 \times 1 0^{23} [{mol}^{- 1}]}{T_{1 / 2} [year] \times 365 \times 24 \times 60 \times 60 [s/year] \times M} \\ \approx \frac{1.32 \times 1 0^{16} [{mol}^{- 1} \cdot s^{- 1} \cdot year]}{T_{1 / 2} [year] \times M [g/mol]} . \end{aligned}$

Example: specific activity of Ra-226

For example, specific radioactivity of radium-226 with a half-life of 1600 years is obtained as

$a_{Ra-226} [Bq/g] = \frac{1.32 \times 1 0^{16}}{1600 \times 226} \approx 3.7 \times 1 0^{10} [Bq/g] .$

This value derived from radium-226 was defined as unit of radioactivity known as the curie (Ci).

Calculation of half-life from specific activity

Experimentally measured specific activity can be used to calculate the half-life of a radionuclide.

Where decay constant λ is related to specific radioactivity a by the following equation:

$λ = \frac{a \times M}{N_{A}} .$

Therefore, the half-life can also be described by

$T_{1 / 2} = \frac{N_{A} \ln 2}{a \times M} .$

Example: half-life of Rb-87

One gram of rubidium-87 and a radioactivity count rate that, after taking solid angle effects into account, is consistent with a decay rate of 3200 decays per second corresponds to a specific activity of Script error: No such module "val".. Rubidium atomic mass is 87 g/mol, so one gram is 1/87 of a mole. Plugging in the numbers:

$\begin{aligned} T_{1 / 2} = \frac{N_{A} \times \ln 2}{a \times M} & \approx \frac{6.022 \times 1 0^{23} {mol}^{- 1} \times 0.693}{3200 s^{- 1} \cdot g^{- 1} \times 87 g/mol} \\ \approx 1.5 \times 1 0^{18} s \approx 47 billion years . \end{aligned}$

Other calculations

Script error: No such module "Message box". Template:Radiation units.svg For a given mass $m$ (in grams) of an isotope with atomic mass $m_{a}$ (in g/mol) and a half-life of $t_{1 / 2}$ (in s), the radioactivity can be calculated using:

$A_{Bq} = \frac{m}{m_{a}} N_{A} \frac{\ln 2}{t_{1 / 2}}$

With $N_{A}$ = Script error: No such module "val"., the Avogadro constant.

Since $m / m_{a}$ is the number of moles ( $n$ ), the amount of radioactivity $A$ can be calculated by:

$A_{Bq} = n N_{A} \frac{\ln 2}{t_{1 / 2}}$

For instance, on average each gram of potassium contains 117 micrograms of ⁴⁰K (all other naturally occurring isotopes are stable) that has a $t_{1 / 2}$ of Script error: No such module "val". = Script error: No such module "val".,^[4] and has an atomic mass of 39.964 g/mol,^[5] so the amount of radioactivity associated with a gram of potassium is 30 Bq.

Examples

Isotope	Half-life	Mass of 1 curie	Specific Activity (a) (activity per 1 kg)
²³²Th	Script error: No such module "val". years	9.1 tonnes	4.07 MBq (110 μCi or 4.07 Rd)
²³⁸U	Script error: No such module "val". years	2.977 tonnes	12.58 MBq (340 μCi, or 12.58 Rd)
²³⁵U	Script error: No such module "val". years	463 kg	79.92 MBq (2.160 mCi, or 79.92 Rd)
⁴⁰K	Script error: No such module "val". years	140 kg	262.7 MBq (7.1 mCi, or 262.7 Rd)
¹²⁹I	Script error: No such module "val". years	5.66 kg	6.66 GBq (180 mCi, or 6.66 kRd)
⁹⁹Tc	Script error: No such module "val". years	58 g	629 GBq (17 Ci, or 629 kRd)
²³⁹Pu	Script error: No such module "val". years	16 g	2.331 TBq (63 Ci, or 2.331 MRd)
²⁴⁰Pu	6563 years	4.4 g	8.51 TBq (230 Ci, or 8.51MRd)
¹⁴C	5730 years	0.22 g	166.5 TBq (4.5 kCi, or 166.5 MRd)
²²⁶Ra	1601 years	1.01 g	36.63 TBq (990 Ci, or 36.63 MRd)
²⁴¹Am	432.6 years	0.29 g	126.91 TBq (3.43 kCi, or 126.91 MRd)
²³⁸Pu	88 years	59 mg	629 TBq (17 kCi, or 629 MRd)
¹³⁷Cs	30.17 years	12 mg	3.071 PBq (83 kCi, or 3.071 GRd)
⁹⁰Sr	28.8 years	7.2 mg	5.143 PBq (139 kCi, or 5.143 GRd)
²⁴¹Pu	14 years	9.4 mg	3.922 PBq (106 kCi, or 3.922 GRd)
³H	12.32 years	104 μg	355.977 PBq (9.621 MCi, or 355.977 GRd)
²²⁸Ra	5.75 years	3.67 mg	10.101 PBq (273 kCi, or 10.101 GRd)
⁶⁰Co	1925 days	883 μg	41.884 PBq (1.132 MCi, or 41.884 GRd)
²¹⁰Po	138 days	223 μg	165.908 PBq (4.484 MCi, or 165.908 GRd)
¹³¹I	8.02 days	8 μg	4.625 EBq (125 MCi, or 4.625 TRd)
¹²³I	13 hours	518 ng	71.41 EBq (1.93 GCi, or 71.41 TRd)
²¹²Pb	10.64 hours	719 ng	51.43 EBq (1.39 GCi, or 51.43 TRd)

Applications

The specific activity of radionuclides is particularly relevant when it comes to select them for production for therapeutic pharmaceuticals, as well as for immunoassays or other diagnostic procedures, or assessing radioactivity in certain environments, among several other biomedical applications.^[6]^[7]^[8]^[9]^[10]^[11]

References

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↑ Duursma, E. K. "Specific activity of radionuclides sorbed by marine sediments in relation to the stable element composition". Radioactive contamination of the marine environment (1973): 57–71.
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@@ Line 28: / Line 28: @@
 | derivations =
 }}
 '''Specific activity''' (symbol ''a'') is the activity [[per unit mass]] of a [[radionuclide]] and is a physical property of that radionuclide.<ref name="BreemanJong2003">{{cite journal |last1=Breeman |first1=Wouter A. P. |last2=Jong |first2=Marion |last3=Visser |first3=Theo J. |last4=Erion |first4=Jack L. |last5=Krenning |first5=Eric P. |title=Optimising conditions for radiolabelling of DOTA-peptides with <sup>90</sup>Y, <sup>111</sup>In and <sup>177</sup>Lu at high specific activities |journal=European Journal of Nuclear Medicine and Molecular Imaging |volume=30 |issue=6 |year=2003 |pages=917–920 |issn=1619-7070 |doi=10.1007/s00259-003-1142-0 |pmid=12677301|s2cid=9652140 }}</ref><ref name="de GoeijBonardi2005">{{cite journal |last1=de Goeij |first1=J. J. M. |last2=Bonardi |first2=M. L. |title=How do we define the concepts specific activity, radioactive concentration, carrier, carrier-free and no-carrier-added? |journal=Journal of Radioanalytical and Nuclear Chemistry |volume=263 |issue=1 |year=2005 |pages=13–18 |issn=0236-5731 |doi=10.1007/s10967-005-0004-6|s2cid=97433328 }}</ref>
 It is usually given in units of becquerel per kilogram (Bq/kg), but another commonly used unit of specific activity is the curie per gram (Ci/g).
-In the context of [[radioactivity]], activity or total activity (symbol ''A'') is a [[physical quantity]] defined as the number of radioactive transformations per second that occur in a particular [[radionuclide]].<ref>{{cite journal |title=SI units for ionizing radiation: becquerel |journal=Resolutions of the 15th CGPM |date=1975 |issue=Resolution 8 |access-date=3 July 2015 |url=http://www.bipm.org/en/CGPM/db/15/8/}}</ref> The unit of activity is the ''[[becquerel]]'' (symbol Bq), which is defined equivalent to [[reciprocal second]]s (symbol s<sup>−1</sup>). The older, non-SI unit of activity is the [[Curie (unit)|''curie'']] (Ci), which is {{val|3.7|e=10}} radioactive decays per second. Another unit of activity is the [[Rutherford (unit)|''rutherford'']], which is defined as {{val|1|e=6}} radioactive decays per second.
+In the context of [[radioactivity]], '''activity''' or '''total activity''' (symbol ''A'') is a [[physical quantity]] defined as the number of radioactive transformations per second that occur in a particular [[radionuclide]].<ref>{{cite journal |title=SI units for ionizing radiation: becquerel |journal=Resolutions of the 15th CGPM |date=1975 |issue=Resolution 8 |access-date=3 July 2015 |url=http://www.bipm.org/en/CGPM/db/15/8/}}</ref> The unit of activity is the ''[[becquerel]]'' (symbol Bq), which is defined equivalent to [[reciprocal second]]s (symbol s<sup>−1</sup>). The older, non-SI unit of activity is the [[Curie (unit)|''curie'']] (Ci), which is {{val|3.7|e=10}} radioactive decays per second. Another unit of activity is the [[Rutherford (unit)|''rutherford'']], which is defined as {{val|1|e=6}} radioactive decays per second.
 The specific activity should not be confused with level of exposure to [[ionizing radiation]] and thus the exposure or [[absorbed dose]], which is the quantity important in assessing the effects of ionizing radiation on humans.
@@ Line 44: / Line 45: @@
 Radioactivity is expressed as the decay rate of a particular radionuclide with decay constant ''λ'' and the number of atoms ''N'':
-: <math>-\frac{dN}{dt} = \lambda N.</math>
+<math display="block">-\frac{dN}{dt} = \lambda N.</math>
 The integral solution is described by [[exponential decay]]:
-: <math>N = N_0 e^{-\lambda t},</math>
+<math display="block">N = N_0 e^{-\lambda t},</math>
 where ''N''<sub>0</sub> is the initial quantity of atoms at time ''t'' = 0.
-[[Half-life]] '''T<sub>1/2</sub>''' is defined as the length of time for half of a given quantity of radioactive atoms to undergo radioactive decay:
+[[Half-life]] '''''T''<sub>1/2</sub>''' is defined as the length of time for half of a given quantity of radioactive atoms to undergo radioactive decay:
-: <math>\frac{N_0}{2} = N_0 e^{-\lambda T_{1/2}}.</math>
+<math display="block">\frac{N_0}{2} = N_0 e^{-\lambda T_{1/2}}.</math>
 Taking the natural logarithm of both sides, the half-life is given by
-: <math>T_{1/2} = \frac{\ln 2}{\lambda}.</math>
+<math display="block">T_{1/2} = \frac{\ln 2}{\lambda}.</math>
 Conversely, the decay constant ''λ'' can be derived from the half-life ''T''<sub>1/2</sub> as
-: <math>\lambda = \frac{\ln 2}{T_{1/2}}.</math>
+<math display="block">\lambda = \frac{\ln 2}{T_{1/2}}.</math>
 ===Calculation of specific activity===
@@ Line 68: / Line 69: @@
 The mass of the radionuclide is given by
-: <math>{m} = \frac{N}{N_\text{A}} [\text{mol}] \times {M} [\text{g/mol}],</math>
+<math display="block">{m} = \frac{N}{N_\text{A}} [\text{mol}] \times {M} [\text{g/mol}],</math>
 where ''M'' is [[molar mass]] of the radionuclide, and ''N''<sub>A</sub> is the [[Avogadro constant]]. Practically, the [[mass number]] ''A'' of the radionuclide is within a fraction of 1% of the molar mass expressed in g/mol and can be used as an approximation.
@@ Line 74: / Line 75: @@
 Specific radioactivity ''a'' is defined as radioactivity per unit mass of the radionuclide:
-: <math>a [\text{Bq/g}] = \frac{\lambda N}{M N/N_\text{A}} = \frac{\lambda N_\text{A}}{M}.</math>
+<math display="block">a [\text{Bq/g}] = \frac{\lambda N}{M N/N_\text{A}} = \frac{\lambda N_\text{A}}{M}.</math>
 Thus, specific radioactivity can also be described by
-: <math>a = \frac{N_\text{A} \ln 2}{T_{1/2} \times M}.</math>
+<math display="block">a = \frac{N_\text{A} \ln 2}{T_{1/2} \times M}.</math>
 This equation is simplified to
-: <math>a [\text{Bq/g}] \approx \frac{4.17 \times 10^{23} [\text{mol}^{-1}]}{T_{1/2} [s] \times M [\text{g/mol}]}.</math>
+<math display="block">a [\text{Bq/g}] \approx \frac{4.17 \times 10^{23} [\text{mol}^{-1}]}{T_{1/2} [\text{s}] \times M [\text{g/mol}]}.</math>
 When the unit of half-life is in years instead of seconds:
-: <math>a [\text{Bq/g}] = \frac{4.17 \times 10^{23} [\text{mol}^{-1}]}{T_{1/2}[\text{year}] \times 365 \times 24 \times 60 \times 60 [\text{s/year}] \times M} \approx \frac{1.32 \times 10^{16} [\text{mol}^{-1}{\cdot}\text{s}^{-1}{\cdot}\text{year}]}{T_{1/2} [\text{year}] \times M [\text{g/mol}]}.</math>
+<math display="block">\begin{align}
+a [\text{Bq/g}] &= \frac{4.17 \times 10^{23} [\text{mol}^{-1}]}{T_{1/2}[\text{year}] \times 365 \times 24 \times 60 \times 60 [\text{s/year}] \times M} \\[1ex]
+&\approx \frac{1.32 \times 10^{16} [\text{mol}^{-1}{\cdot}\text{s}^{-1}{\cdot}\text{year}]}{T_{1/2} [\text{year}] \times M [\text{g/mol}]}.
+\end{align}</math>
 ==== Example: specific activity of Ra-226 ====
@@ Line 92: / Line 96: @@
 For example, specific radioactivity of [[radium-226]] with a half-life of 1600 years is obtained as
-: <math chem>a_\text{Ra-226}[\text{Bq/g}] = \frac{1.32 \times 10^{16}}{1600 \times 226} \approx 3.7 \times 10^{10} [\text{Bq/g}].</math>
+<math display="block" chem>a_\text{Ra-226}[\text{Bq/g}] = \frac{1.32 \times 10^{16}}{1600 \times 226} \approx 3.7 \times 10^{10} [\text{Bq/g}].</math>
 This value derived from radium-226 was defined as unit of radioactivity known as the [[Curie (unit)|curie]] (Ci).
@@ Line 101: / Line 105: @@
 Where decay constant ''λ'' is related to specific radioactivity ''a'' by the following equation:
-: <math>\lambda = \frac{a \times M}{N_\text{A}}.</math>
+<math display="block">\lambda = \frac{a \times M}{N_\text{A}}.</math>
 Therefore, the half-life can also be described by
-: <math>T_{1/2} = \frac{N_\text{A} \ln 2}{a \times M}.</math>
+<math display="block">T_{1/2} = \frac{N_\text{A} \ln 2}{a \times M}.</math>
 ==== Example: half-life of Rb-87 ====
 One gram of [[Isotopes of rubidium|rubidium-87]] and a radioactivity count rate that, after taking [[solid angle]] effects into account, is consistent with a decay rate of 3200 decays per second corresponds to a specific activity of {{val|3.2|e=6|u=Bq/kg}}. Rubidium [[atomic mass]] is 87&nbsp;g/mol, so one gram is 1/87 of a mole. Plugging in the numbers:
-: <math>
+<math display="block">
-  T_{1/2} =
+  \begin{align}
-  \frac{N_\text{A} \times \ln 2}{a \times M} \approx \frac{6.022 \times 10^{23}\text{ mol}^{-1} \times 0.693}
+T_{1/2} =
-       {3200\text{ s}^{-1}{\cdot}\text{g}^{-1} \times 87\text{ g/mol}} \approx
+  \frac{N_\text{A} \times \ln 2}{a \times M}
-.5 \times 10^{18}\text{ s} \approx 47\text{ billion years}.
+ &\approx \frac{6.022 \times 10^{23}\text{ mol}^{-1} \times 0.693}
+       {3200\text{ s}^{-1}{\cdot}\text{g}^{-1} \times 87\text{ g/mol}} \\[1ex]
+  &\approx 1.5 \times 10^{18}\text{ s} \approx 47\text{ billion years}.
+\end{align}
 </math>
 ===Other calculations===
 {{cleanup merge|Becquerel|21=section|date=July 2023}}
+{{radiation_units.svg}}
 For a given mass <math>m</math> (in grams) of an isotope with [[atomic mass]] <math>m_\text{a}</math> (in g/mol) and a [[half-life]] of <math>t_{1/2}</math> (in s), the radioactivity can be calculated using:
-:<math>A_\text{Bq} = \frac{m} {m_\text{a}} N_\text{A} \frac{\ln 2} {t_{1/2}}</math>
+<math display="block">A_\text{Bq} = \frac{m} {m_\text{a}} N_\text{A} \frac{\ln 2} {t_{1/2}}</math>
 With <math>N_\text{A}</math> = {{val|6.02214076|e=23|u=mol-1}}, the [[Avogadro constant]].
@@ Line 128: / Line 135: @@
 Since <math>m/m_\text{a}</math> is the number of moles (<math>n</math>), the amount of radioactivity <math>A</math> can be calculated by:
-:<math>A_\text{Bq} = nN_\text{A} \frac{\ln 2} {t_{1/2}}</math>
+<math display="block">A_\text{Bq} = nN_\text{A} \frac{\ln 2} {t_{1/2}}</math>
 For instance, on average each gram of [[potassium]] contains 117&nbsp;micrograms of [[Potassium-40|<sup>40</sup>K]] (all other naturally occurring isotopes are stable) that has a <math>t_{1/2}</math> of {{val|1.277|e=9|u=years}} = {{val|4.030|e=16|u=s}},<ref>{{cite web|url=http://nucleardata.nuclear.lu.se/toi/nuclide.asp?iZA=190040 |title=Table of Isotopes decay data |publisher=[[Lund University]] |date=1990-06-01 |access-date=2014-01-12}}</ref> and has an atomic mass of 39.964&nbsp;g/mol,<ref>{{cite web|url=http://physics.nist.gov/cgi-bin/Compositions/stand_alone.pl?ele=&ascii=html&isotype=some |title=Atomic Weights and Isotopic Compositions for All Elements |publisher=[[NIST]] |access-date=2014-01-12}}</ref> so the amount of radioactivity associated with a gram of potassium is 30&nbsp;Bq.

Specific activity: Difference between revisions

Latest revision as of 22:52, 7 December 2025

Contents

Formulation

Relationship between λ and T_1/2

Calculation of specific activity

Example: specific activity of Ra-226

Calculation of half-life from specific activity

Example: half-life of Rb-87

Other calculations

Examples

Applications

References

Further reading

Navigation menu

Specific activity: Difference between revisions

Latest revision as of 22:52, 7 December 2025

Formulation

Relationship between λ and T1/2

Calculation of specific activity

Example: specific activity of Ra-226

Calculation of half-life from specific activity

Example: half-life of Rb-87

Other calculations

Examples

Applications

References

Further reading

Navigation menu

Search

Relationship between λ and T_1/2