Alpharabian schisma: Difference between revisions
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The '''Alpharabian schisma''', is an [[11-limit]] [[unnoticeable comma]] with a ratio of '''618121839509504/617673396283947''' and a monzo of [18 -31 0 0 9⟩. At roughly 1.26 [[cent]]s in size, it is only just a little bit smaller than the better known [[schisma]]. It is the amount by which as stack of five [[243/242|rastma]]s falls short of an [[8192/8019]] inframinor second, as well as the amount by which a stack of three [[1331/1296]] semilimmic ultraprimes exceeds the [[Pythagorean kleisma]]. | The '''Alpharabian schisma''', is an [[11-limit]] [[unnoticeable comma]] with a ratio of '''618121839509504/617673396283947''' and a monzo of [18 -31 0 0 9⟩. At roughly 1.26 [[cent]]s in size, it is only just a little bit smaller than the better known [[schisma]]. It is the amount by which as stack of five [[243/242|rastma]]s falls short of an [[8192/8019]] inframinor second, as well as the amount by which a stack of three [[1331/1296]] semilimmic ultraprimes exceeds the [[Pythagorean kleisma]]. | ||
[[Category:Commas | [[Category:Commas named after polymaths]] | ||
Latest revision as of 20:41, 5 November 2024
| Interval information |
The Alpharabian schisma, is an 11-limit unnoticeable comma with a ratio of 618121839509504/617673396283947 and a monzo of [18 -31 0 0 9⟩. At roughly 1.26 cents in size, it is only just a little bit smaller than the better known schisma. It is the amount by which as stack of five rastmas falls short of an 8192/8019 inframinor second, as well as the amount by which a stack of three 1331/1296 semilimmic ultraprimes exceeds the Pythagorean kleisma.