3401edt: Difference between revisions

Revision as of 11:36, 26 August 2024 view source Lériendil (talk \| contribs) autopatrolled, Interface administrators, Sysops 7,619 edits Created page with "{{Stub}} {{Infobox ET}} {{Harmonics in equal\|3401\|3\|1\|intervals=prime}} 3401edt is notable for being the denominator of a convergent to log<sub>3</sub>(7/3), after 13edt..."		Revision as of 11:37, 26 August 2024 view source Lériendil (talk \| contribs) autopatrolled, Interface administrators, Sysops 7,619 edits No edit summary Newer edit →
Line 3:		Line 3:
	{{Harmonics in equal\|3401\|3\|1\|intervals=prime}}		{{Harmonics in equal\|3401\|3\|1\|intervals=prime}}

	3401edt is notable for being the denominator of a convergent to log<sub>3</sub>(7/3), after [[13edt]], [[35edt]], and [[153edt]], and the last before [[108985edt]], and therefore has an extremely accurate approximation to [[7/3]]. In fact, 3401edt demonstrates 16-strong 7-3 [[telicity]], even stronger than that of 153edt.		3401edt is notable for being the denominator of a convergent to log<sub>3</sub>(7/3), after [[13edt]], [[35edt]], and [[153edt]], and the last before [[108985edt]], and therefore has an extremely accurate approximation to [[7/3]], only about 5 ''micro''cents flat. In fact, 3401edt demonstrates 16-strong 7-3 [[telicity]], even stronger than that of 153edt.