Difference between revisions of "Iff"
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[[IFF]] stands for [[If and only if]]. This common, yet reserved mathematical term was likely have been first published by John Kelly's General Topology. A short mention by Kelly himself on the use of [[Iff]] is | [[IFF]] stands for [[If and only if]]. This common, yet reserved mathematical term was likely have been first published by John Kelly's General Topology. A short mention by Kelly himself on the use of [[Iff]] is shown in this article<ref>https://mathshistory.st-andrews.ac.uk/Extras/Kelley_General_Topology/</ref>. | ||
=References= | |||
Latest revision as of 06:28, 11 July 2021
IFF stands for If and only if. This common, yet reserved mathematical term was likely have been first published by John Kelly's General Topology. A short mention by Kelly himself on the use of Iff is shown in this article[1].