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The four-factor formula, also known as Fermi's four factor formula is used in nuclear engineering to determine the multiplication of a nuclear chain reaction in an infinite medium. The formula is^[1]

k_{\infty} = η f p ε

Symbol	Name	Meaning	Formula
$η$	Reproduction Factor (Eta)	The number of fission neutrons produced per absorption in the fuel.	$η = \frac{ν σ_{f}^{F}}{σ_{a}^{F}}$
$f$	The thermal utilization factor	Probability that a neutron that gets absorbed does so in the fuel material.	$f = \frac{Σ_{a}^{F}}{Σ_{a}}$
$p$	The resonance escape probability	Fraction of fission neutrons that manage to slow down from fission to thermal energies without being absorbed.	$p \approx e x p (- \frac{\sum_{i = 1}^{N} N_{i} I_{r, A, i}}{{(\overline{ξ} Σ_{p})}_{m o d}})$
$ϵ$	The fast fission factor	$\frac{total number of fission neutrons}{number of fission neutrons from just thermal fissions}$	$ε \approx 1 + \frac{1 - p}{p} \frac{u_{f} ν_{f} P_{F A F}}{f ν_{t} P_{T A F} P_{T N L}}$

The six factor formula defines each of these terms in much more detail.

Multiplication

The multiplication factor, k, is defined as (see Nuclear chain reaction):

k = \frac{number of neutrons in one generation}{number of neutrons in preceding generation}

If k is greater than 1, the chain reaction is supercritical, and the neutron population will grow exponentially.
If k is less than 1, the chain reaction is subcritical, and the neutron population will exponentially decay.
If k = 1, the chain reaction is critical and the neutron population will remain constant.

In an infinite medium, neutrons cannot leak out of the system and the multiplication factor becomes the infinite multiplication factor, $k = k_{\infty}$ , which is approximated by the four-factor formula.

References

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+The four-factor formula, also known as Fermi's '''four factor formula''' is used in [[nuclear engineering]] to determine the multiplication of a [[nuclear chain reaction]] in an infinite medium. The formula is<ref name=Duderstadt>{{cite book |last=Duderstadt |first=James |coauthors=Hamilton, Louis |title=Nuclear Reactor Analysis |year=1976 |publisher=John Wiley & Sons, Inc |isbn=0-471-22363-8 }}</ref>
+<center><math>k_{\infty} = \eta f p \varepsilon</math></center>
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+{| class="wikitable" border="1" cellpadding="8" cellspacing="0"
+! Symbol
+! Name
+! Meaning
+! Formula
+|-
+|<math>\eta</math>
+| Reproduction Factor (Eta)
+| The number of fission [[neutron]]s produced per absorption in the fuel.
+| <math> \eta = \frac{\nu \sigma_f^F}{\sigma_a^F} </math>
+|-
+| <math>f</math>
+| The thermal utilization factor
+| Probability that a neutron that gets absorbed does so in the fuel material.
+| <math>f = \frac{\Sigma_a^F}{\Sigma_a}</math>
+|-
+| <math>p</math>
+| The resonance escape probability
+| Fraction of fission neutrons that manage to slow down from fission to thermal energies without being absorbed.
+| <math>p \approx \mathrm{exp} \left( -\frac{\sum\limits_{i=1}^{N} N_i I_{r,A,i}}{\left( \overline{\xi} \Sigma_p \right)_{mod}} \right)</math>
+|-
+| <math>\epsilon</math>
+| The fast fission factor
+| <center><math>\frac{\mbox{total number of fission neutrons}}{\mbox{number of fission neutrons from just thermal fissions}}</math></center>
+| <math>\varepsilon \approx 1 + \frac{1-p}{p}\frac{u_f \nu_f P_{FAF}}{f \nu_t P_{TAF} P_{TNL}}</math>
+|-
+|}
+The [[six factor formula]] defines each of these terms in much more detail.
+==Multiplication==
+The multiplication factor, k, is defined as (see [[Nuclear chain reaction]]): <center><math>k = \frac{\mbox{number of neutrons in one generation}}{\mbox{number of neutrons in preceding generation}}</math></center>
+If k is greater than 1, the chain reaction is ''supercritical,'' and the neutron population will grow exponentially. <br />
+If k is less than 1, the chain reaction is ''subcritical,'' and the neutron population will exponentially decay. <br />
+If k = 1, the chain reaction is ''critical'' and the neutron population will remain constant.
+In an infinite medium, neutrons cannot leak out of the system and the multiplication factor becomes the infinite multiplication factor, <math>k = k_{\infty}</math>, which is approximated by the four-factor formula.
+==See also==
+* [[Six factor formula]]
+* [[Critical mass]]
+* [[Nuclear chain reaction]]
+* [[Nuclear reactor]]
+==References==
+{{reflist}}
+[[Category:Nuclear technology]]
+[[Category:Radioactivity]]

Ordered dithering: Difference between revisions

Revision as of 12:19, 15 September 2013

Multiplication

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References

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