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name off | Actual Settings (SAVE settings with Ctrg-C as txt (Notepad) or SAVE as browser-Link ) | Search for potenz N and Basis and Harmonics in the first selected element Z (only one) Calculate for selected elements with potenz N(for Basis=2) = to in L = Z * Cx * Basis^N * Factor N = log(L/(Factor*Z*Cx)) / log(Basis)
and f=c/L and T=L/c with c= m/s and Comptonwavelength Cx [m]: Ce= 2.4263102389E-12 Cp= 1.32140985623E-15 Cn= 1.3195909068E-15 Plk= 1.616199E-35 orb_Mercur= 57.91E9 Cx m Basis Factor Basis B with e= 2.7182818284590 phi= 1.618034 or 2 , Factor with pi= 3.141592 2pi= 6.283185 g= 0.61803398874989 or 18 | show digits Select Units L Length Lj pc AE earthR km m dm cm mm µm nm A~ pm fm f Frequency THz GHz MHz kHz Hz mHz µHz T Time j d h min s ms µs ns ps V Volume =L^3 km^3 m^3 hL=100L dL=10L dm^3=L 10ml=cL cm^3=mL mm^3=µL m Mass =V*dens. Mt kt t kg g mg µg ng pg fg
(Reset with deleting the number) Reset 5 Basis-Harmonic-Search (Example)
| 1 Listing - Modus 2 Searching - Modus 3 Factor-Search 4 Basis(+Factor)-Search 5 Basis(+Factor)-Harmonics-Search
Value for Searching: m Length error L maximal 0.1% 0.5% 1% 2% 5% all
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Are you sure for Z=1 ? If not, please select Z (only one) .
Results with Plk Attention ! Factor 18 to L and to T, invers to f, Basis B= 6/5, 5/4, 4/3, e/2, e^(1/e), 3/2, 1.61803, 5/3, 7/4, 2, 5/2, e, 3, 7/2, 9/2, 5, 7, 9, 11,
B | F | error L[%] | | Z | N | [1m=1m] Factor2 | [1Hz=1.0Hz] | e^(1 | 18 | err=-0.48 | H | Z=1 | (32.01)N=32 | L=0.0000000 m *1.0047902=3.7880797094006E-29 m | f=7952011552139646305890000350123917312.00000 Hz | 5/4 | 18 | err=-0.226 | H | Z=1 | (58.99)N=59 | L=0.0000000 m /1.0022568=1.5152318837602E-28 m | f=1974070218449379306261678831999909888.00000 Hz | 6/5 | 18 | err=-0.00759 | H | Z=1 | (76.00)N=76 | L=0.0000000 m /1.0000759=3.0304637675204E-28 m | f=989187602006322113474544025959661568.00000 Hz | 7/4 | 18 | err=-0.0501 | H | Z=1 | (26.00)N=26 | L=0.0000000 m /1.0005010=6.0609275350409E-28 m | f=494383648529743903278241367688478720.00000 Hz | 4/3 | 18 | err=-0.451 | H | Z=1 | (52.98)N=53 | L=0.0000000 m /1.0045031=1.2121855070082E-27 m | f=246206958910294075453633648213884928.00000 Hz | 3/2 | 18 | err=-0.49 | H | Z=1 | (41.01)N=41 | L=0.0000000 m *1.0048937=4.8487420280327E-27 m | f=62131486294434897989282550438166528.00000 Hz | 6/5 | 18 | err=-0.156 | H | Z=1 | (95.01)N=95 | L=0.0000000 m *1.0015517=9.6974840560654E-27 m | f=30962426566765579781743102039949312.00000 Hz | 1.61 | 18 | err=-0.153 | H | Z=1 | (36.00)N=36 | L=0.0000000 m /1.0015285=9.6974840560654E-27 m | f=30867276703768935351833283090448384.00000 Hz | 6/5 | 18 | err=-0.319 | H | Z=1 | (114.02)N=114 | L=0.0000000 m *1.0031818=3.1031948979409E-25 m | f=969150702008317618878120273641472.00000 Hz | e/2 | 18 | err=-0.129 | H | Z=1 | (70.00)N=70 | L=0.0000000 m *1.0012849=6.2063897958819E-25 m | f=483659059880512454027932973662208.00000 Hz | 6/5 | 18 | err=-0.482 | H | Z=1 | (133.03)N=133 | L=0.0000000 m *1.0048147=9.930223673411E-24 m | f=30335254285637583190600145960960.00000 Hz | 5/4 | 18 | err=-0.208 | H | Z=1 | (118.01)N=118 | L=0.0000000 m *1.0020748=7.9441789387288E-23 m | f=3781567258912281502134585786368.00000 Hz | e^(1 | 18 | err=-0.0514 | H | Z=1 | (81.00)N=81 | L=0.0000000 m *1.0005130=2.5421372603932E-21 m | f=117989795466988673854565515264.00000 Hz | 4/3 | 18 | err=-0.241 | H | Z=1 | (105.99)N=106 | L=0.0000000 m /1.0024078=5.0842745207864E-21 m | f=58823015398213076954925498368.00000 Hz | 7/2 | 18 | err=-0.0501 | H | Z=1 | (26.00)N=26 | L=0.0000000 m /1.0005010=4.0674196166291E-20 m | f=7366890438344238747332116480.00000 Hz | 1.61 | 18 | err=-0.354 | H | Z=1 | (72.01)N=72 | L=0.0000000 m *1.0035327=3.2539356933033E-19 m | f=924577384242921121297465344.00000 Hz | 3/2 | 18 | err=-0.28 | H | Z=1 | (94.01)N=94 | L=0.0000000 m *1.0027975=1.0412594218571E-17 m | f=28871876601157807054520320.00000 Hz |
17 gelbe (+ 0 factorised) Treffer bei Basis=e^(1/e),5/4,6/5,7/4,4/3,3/2,6/5,1.61803,6/5,e/2,6/5,5/4,e^(1/e),4/3,7/2,1.61803,3/2, Cx=1.616199E-35, Factor=18, c=299792458, genau=0.5%, mod=5, Suchwort=12588054 m | 0.1%= 4 (B: 6/5, 7/4, e^(1, 7/2) __ 0.5%= 13 (B: e^(1, 5/4, 4/3, 3/2, 6/5, 1.61, 6/5, e/2, 6/5, 5/4, 4/3, 1.61, 3/2) | |
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