Difference between revisions of "Soldner's Constant"
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Soldner's constant (also called the Ramanujan-Soldner constant) is defined to be the unique zero of the [[logarithmic integral]]. It is usually given the symbol $\mu$ and we have | Soldner's constant (also called the Ramanujan-Soldner constant) is defined to be the unique zero of the [[logarithmic integral]]. It is usually given the symbol $\mu$ and we have | ||
$$\mu = 1.45136923488338105028396848589202744949\ldots.$$ | $$\mu = 1.45136923488338105028396848589202744949\ldots.$$ | ||
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| + | [[Category:SpecialFunction]] | ||
Revision as of 19:00, 24 May 2016
Soldner's constant (also called the Ramanujan-Soldner constant) is defined to be the unique zero of the logarithmic integral. It is usually given the symbol $\mu$ and we have $$\mu = 1.45136923488338105028396848589202744949\ldots.$$
