August 26th, update information (2).
- kyonissho
- Aug 26
- 2 min read
Article:
from
No.3188. Planck Constant in Trigonometric Functions.
to
No.3188. Planck Constant in Trigonometric Functions for Reverse Mathematics.
Update:
from
Misjudgement:
(cos^-1(ħ) = π/2 | ħ = reduced Planck constant Dirac's constant
cos(ħ) = 1 | cos^-1(ħ) : cos(ħ) = 90° : 0°
sin^-1(ħ) = 1.054571726x10^(-34) | Dirac's constant itself,
sin(ħ) = 1.054571726x10^(-34) | sin^-1(ħ) : sin(ħ) = 1 : 1
tan^-1(ħ) = 1.054571726x10^(-34) | tan^1(ħ), tan(ħ), sin^-1(ħ)
tan(ħ) = 1.054571726x10^(-34) | and sin(ħ) = the constant.
Very impressive, powerful and practicable constant.)
Correct judgement:
Above calculation was derived because of ħ ≒ 0 by my calculator. Although a enough small number, but it is great proportion constant, may make coordinates far from trigonometric function's center.
to
cos^-1(ħ) = π/2 | ħ = reduced Planck constant Dirac's constant
cos(ħ) = 1 | cos^-1(ħ) : cos(ħ) = 90° : 0°
sin^-1(ħ) = 1.054571726x10^(-34) | Dirac's constant itself,
sin(ħ) = 1.054571726x10^(-34) | sin^-1(ħ) : sin(ħ) = 1 : 1
tan^-1(ħ) = 1.054571726x10^(-34) | tan^1(ħ), tan(ħ), sin^-1(ħ)
tan(ħ) = 1.054571726x10^(-34) | and sin(ħ) = the constant.
Very impressive, powerful and practicable constant.
It is ...
ħ ≒ 0 is a enough small number, but ħ is the great proportion constant, and ħ may make coordinates far from trigonometric function's center.
...
Consideration:
Almost all movements into the imaginary time, which was tackled by Minkowski, Einstein and great scholars, are yet remaining with not searched.
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