Atomic Number Equation Based on Larson’s Triplets

David Halprin

Where Z represents the Atomic Number, and (a, b, c) is the number triplet representing the atoms:

a(a~1)(2a~1)+b(b+1)(2b+1) |

Z+2= (1) If a=b then this reduces to 2 742—20(26 +1) (2) Ifa=b+1 then it reduces to eisai 2b(b+1)(2b+1) | 3) a=b a=b+tl a a b Range of c Z Range of Z -l to 4 c+2 1 to6 2 -4 to 4 c+ 10 6 to 14 3 2 -4 to 9 c+18 14 to 27 3 -8 to 9 c+ 36 28 to 45 4 3 -8 to 16 c+ 54 46 to 70 4 -15 to 16 c+ 86 71 to 102 5 4 -15 to -1 c+118 103 to 117

Equation (1) is exactly representative of Dewey’s algorithm.

Equations (2) and (3) are just simplifications of Equation (1) when a = b and a= b + | respectively.

Some specific examples:

Larsonium! 5-4-(1) substituted into Equation (3) gives Z = 117 as expected, however there is an interesting aside to consider, despite its counter-intuitive appearance and it requires some interpretation

within RS too.

1 Not an “official” name for the element; also identified as Farnsium in Futurama episode, “Near-Death Wish.”

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Atomic Number Equation Based on Larson 8 Triplets

Atom / Atomic Number Particle a-b-c Z 0-0-(1) -3

Electron 1-0-(1) z Rotational base ees ca 0-0-0 2

0-0-1 -|

Positron 1-0-1 -1 Neutrino 1-1-(1) -] Neutron 1-1-0 0 Deuteron 1-1-0 0 Alpha Particle 1-1-0 0 Deuterium 1-1-1 1