Reciprocal distribution

The probability density function (pdf) of the reciprocal distribution is

${\displaystyle f(x;a,b)={\frac {1}{x[\log _{e}(b)-\log _{e}(a)]}}\quad {\text{ for }}a\leq x\leq b{\text{ and }}a>0.}$

Here, ${\displaystyle a}$ and ${\displaystyle b}$ are the parameters of the distribution, which are the lower and upper bounds of the support, and ${\displaystyle \log _{e}}$ is the natural log function (the logarithm to base e). The cumulative distribution function is

${\displaystyle F(x;a,b)={\frac {\log _{e}(x)-\log _{e}(a)}{\log _{e}(b)-\log _{e}(a)}}\quad {\text{ for }}a\leq x\leq b.}$

The reciprocal distribution is of considerable importance in numerical analysis as a computer’s arithmetic operations transform mantissas with initial arbitrary distributions to the reciprocal distribution as a limiting distribution.[1]