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India | Mathematics | Volume 4 Issue 12, December 2015 | Pages: 1219 - 1220
Farey to Cantor
Abstract: The Farey fractions lie in [0, 1]. Similarly the Cantor middle- set lie in [0, 1]. Here we try to construct the Cantor middle- set from Farey sequence.
Keywords: Farey Sequence, Non-Reducible Farey Sequence, Non Reducible Farey -Subsequence, Cantor Sequence
How to Cite?: A. Gnanam, C. Dinesh, "Farey to Cantor", Volume 4 Issue 12, December 2015, International Journal of Science and Research (IJSR), Pages: 1219-1220, https://www.ijsr.net/getabstract.php?paperid=NOV152170, DOI: https://dx.doi.org/10.21275/NOV152170
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