Before I formally recreate the root chart for guppy regiment numbers, we recap the Saibian's original page for the guppy regiment root chart, but the original chart is incomplete. Here, we recap the full list as follows:
RECAP: Hyper-E Naming System Root Chart: GUPPY REGIMENT
BASE GOOGOLISM'S/ROOTS
[1] eyelash mite (20,000)
[2] dust mite (50,000)
[3] cheese mite (80,000)
[4] clover mite (200,000)
[5] pipsqueak (10,000,000)
[6] little squeaker/squeaker (50,000,000,000)
[7] small fry (10^15)
[8] guppy (10^20)
[9] minnow (10^25)
[10] goby (10^35)
[11] gogol (10^50)
[12] jumbo shrimp/prawn (10^65)
[13] lightweight (10^75)
[14] ogol (10^80)
[15] tiny twerpuloid/twerpuloid (10^85)
[16] googol (10^100)
[17] eceton (10^303)
SIZE MODIFIERS
[18] speck (Definition: (n)-speck = n/10,000,000,000 )
[19] crumb (Definition: (n)-crumb = n/100,000 )
[20] chunk (Definition: (n)-chunk = n/10 )
[21] bunch (Definition: (n)-bunch = 10*n )
[22] crowd (Definition: (n)-crowd = 100,000*n)
[23] swarm (Definition: (n)-swarm = 10,000,000,000*n)
BASE MODIFIERS
[24] bit (base 2)
[25] byte (base 8)
[26] binary (base 2)
[27] ternary (base 3)
[28] quaternary (base 4)
[29] quinary (base 5)
[30] octal (base 8)
[31] duodecimal (base 12)
[32] hexadecimal (base 16)
[33] vigesimal (base 20)
[34] sexagesimal (base 60)
POWER MODIFIERS
[35] dyadia (^2)
[36] triadia (^3)
[37] tetradia (^4)
[38] ding / pentadia (^5)
[39] chime / dekadia (^10)
[40] bell / penantadia (^50)
[41] toll / hectadia (^100)
[42] gong / chiliadia (^1000)
[43] myriadia (^10,000) ex. googolmyriadia = 10^1,000,000 = milliplexion
[44] bong / chilichilidia (^1,000,000)
[45] throng / tritichiliadia (^1,000,000,000)
[46] gandingan / tetertichiliadia (^1,000,000,000,000)
LATIN REPEAT OPERATORS
[47] du (x2)
[48] tri (x3)
[49] quadri (x4)
[50] quinti (x5)
[51] sexti (x6)
[52] septi (x7)
[53] octi (x8)
[54] noni (x9)
[55] deci (x10)
[56] viginti (x20)
[57] triginti (x30)
[58] quadraginti (x40)
[59] quinquaginti (x50)
[60] sexaginti (x60)
[61] septuaginti (x70)
[62] octoginti (x80)
[63] nonaginti (x90)
[64] centi (x100)
[65] milli (x1000)
Misc. OPERATOR(s)
[66] plex/plexi (Definition: (n)-plex = 10^n)
[67] logue (Definition: (n)-logue = 10^^n)
[68] minutia (Definition: (n)-minutia = 1/n)
GREEK NUMBER ROOTS
[69] mono
[70] dia
[71] tria
[72] tetra
[73] penta
[74] hexa
[75] hepta
[76] octa
[77] enna
[78] deka
[79] endeka
[80] dodeka
[81] triadeka
[82] tetradeka
[83] pentadeka
[84] hexadeka
[85] heptadeka
[86] octadeka
[87] ennadeka
[88] icosa
[89] trianta
[90] teranta
[91] penanta
[92] exata
[93] eptata
[94] ogdata
[95] entata
[96] hecta
[97] chilia
[98] myria
BASIC FORMS
G = Googolism
S = Size Modifier
B = Base Modifier
X = Power Modifier/ Argument Modifier
X: = Greek Power Modifier
#P = Plex operator applied # times
#L = logue operator with # as input
A = Any combination of the other root-types
Allowed forms:
{1} G / G-B / B-G ex. googolbit , ternary-googol
{2} G-S / B-G-S googolcrumb size(n)
{3} G-X / B-G-X googoltoll pow(n)
{4} G-S-X / B-G-S-X googolcrumbtoll pow(size(n))
{5} G-X-S / B-G-X-S googoltollcrumb size(pow(n))
{6} G-#P / B-G-#P googolplex , guppyplex plex(n)
{7} G-#P-S / B-G-#P-S googolplexicrumb size(plex(n))
{8} G-S-#P / B-G-S-#P googolcrumbplex plex(size(n))
{9} G-#P-X / B-G-#P-X googolplexigong plex(pow(n))
{10} G-#P-X: / G-#P-X: googolplexichiliadia pow(plex(n))
= (10^10^100)^1000 = 10^10^103
{10} plex(pow(size(n))) (B)-G-S-X-#P googolcrumbtollplex = 10^10^9500
{11} plex(size(pow(n))) (B)-G-X-S-#P googoltollcrumbplex = 10^10^9995
{12} pow(size(plex(n))) (B)-G-#P-S-X: googolplexicrumbhectadia = (10^(10^100-5))^100 = 10^(10^102-500)
{13} pow(plex(size(n))) (B)-G-S-#P-X: googolcrumbplexihectadia = (10^10^95)^100 = 10^10^97
{14} size(plex(pow(n))) (B)-G-#P-X-S googolplexigong-crumb = 10^(10^100,000-5)
{15} size(pow(plex(n))) (B)-G-#P-X:-S googolplexihectadia-crumb = 10^(10^102-5)
{16} #L trialogue
{17} A-#L googologue , googolplexilogue , googolduplexilogue , etc.
*Note: The order of the Size Modifier and Power modifier matters. This would lead to things like googolcrumbtoll or googoltollcrumb. Not too bad sounding.
There is two possible interpretations depending on which order the operators are applied.
googolcrumb = 10^95 , so googolcrumbtoll might be 10^9500
On the other hand...
googoltoll = 10^10,000 so googoltollcrumb = 10^9,995
Despite this the values are in the same ballpark roughly.
The Base operator must always be applied last. It's a feature which may either be turned on or off.
1st-dim x 2nd-dim x 3rd dim x 4th dim x 5th dim
17 base googolisms x 7 size modes x 10 base modes x 30 power modes x 21 plex modes = 749,700
Now, let's hang on. How I start creating the more extensive root chart for guppy regiment with much broader coverage, including roots for intermediate numbers above 100, and the new roots that Saibian did not define before. First, we create the new base roots as follows:
Original roots:
[1.1] eyelash mite = 20,000 (used to replace 100 with 4 in the rightmost argument and 2 in the other arguments in post-guppy regiment numbers)
[1.2] dust mite = 50,000 (used to replace 100 with 4 in the rightmost argument and 5 in the other arguments in post-guppy regiment numbers)
[1.3] cheese mite = 80,000 (used to replace 100 with 4 in the rightmost argument and 8 in the other arguments in post-guppy regiment numbers)
[1.4] clover mite = 200,000 (used to replace 100 with 5 in the rightmost argument and 2 in the other arguments in post-guppy regiment numbers)
[1.5] pipsqueak = 10,000,000
[1.6] little squeaker = 50,000,000,000 (used to replace 100 with 10 in the rightmost argument and 5 in the other arguments in post-guppy regiment numbers)
[1.7] (small) fry = 10^15 = 1,000,000,000,000,000
[1.8] guppy = 10^20 = 100,000,000,000,000,000,000
[1.9] minnow = 10^25 = 10,000,000,000,000,000,000,000,000
[1.10] goby = 10^35 = 100,000,000,000,000,000,000,000,000,000,000,000
[1.11] gogol = 10^50
[1.12] jumbo shrimp, prawn = 10^65
[1.13] lightweight = 10^75
[1.14] ogol = 10^80
[1.15] (tiny) twerpuloid = 10^85
[default] googol = 10^100
[1.16] eceton, eceto- = 10^303
My new roots:
[1.17] big twerpuloid = 10^110
[1.18] small house = 10^125
[1.19] big house = 10^140
[1.20] mansion = 10^150
[1.20] apartment = 10^160
[1.21] big waterfall = 10^180
[1.22] hill = 10^200
[1.23] mountain = 10^225
[1.24] (mountain) range = 10^250
[1.25] continent = 10^280
[1.26] planet = 10^320
In post-guppy regiment numbers, if the base googolisms don't involve the mantissa leading the "E", just replace the default argument of 100 with the corresponding exponent in the base guppy regiment roots. For example, greaminnow (greagol + minnow) is equal to E25#25#25 and terrible tethrashrimp/terrible tethraprawn (terrible tethrathoth + jumbo shrimp/prawn) is equal to E65(#^^#)^^#65.
Now let's move further to the additive/multiplicative modifiers to ExE numbers.
Predefined roots:
[2.1] (n)-speck = n-10 in the base numeric argument (n/10,000,000,000 in guppy regiment)
[2.2] (n)-crumb = n-5 in the base numeric argument (n/100,000 in guppy regiment)
[2.3] (n)-chunk = n-1 in the base numeric argument (n/10 in guppy regiment)
[2.4] (n)-bunch = n+1 in the base numeric argument (n*10 in guppy regiment)
[2.5] (n)-crowd = n+5 in the base numeric argument (n*100,000 in guppy regiment)
[2.6] (n)-swarm = n+10 in the base numeric argument (n*10,000,000,000 in guppy regiment)
But there weren't that many. So I decided to made some additional names as follows:
[2.7] (n)-grain = n-15 in the base numeric argument
[2.8] (n)-cell = n-20 in the base numeric argument
[2.9] (n)-molecule = n-25 in the base numeric argument
[2.10] (n)-atom = n-30 in the base numeric argument
[2.11] (n)-particle = n-40 in the base numeric argument
[2.12] (n)-quark = n-50 in the base numeric argument
[2.13] (n)-load = n+15 in the base numeric argument
[2.14] (n)-mass = n+20 in the base numeric argument
[2.15] (n)-bomb = n+25 in the base numeric argument
[2.16] (n)-earth = n+30 in the base numeric argument
[2.17] (n)-star = n+40 in the base numeric argument
[2.18] (n)-galaxy = n+50 in the base numeric argument
[2.19] (n)-universe = n+100 in the base numeric argument
For example, lightweightatom = 10^(75-30) = 10^45, and graatagoldstar (graatagold + -star) = E140##140#140.
Predefined roots:
[3.1] ding (×5)
[3.2] chime (×10)
[3.3] bell (×50)
[3.4] toll (×100)
[3.5] gong (×1,000)
[3.6] bong (×1,000,000)
[3.7] throng (×1,000,000,000)
[3.8] gandingan (×1,000,000,000,000)
By ARsygo (check out at their website):
[3.9] ring (×500)
[3.10] clang (×5,000)
[3.11] blang (×5,000,000)
[3.12] thrang (×5,000,000,000)
Just like with the additive modifiers, here I create some more for my own:
[3.13] dump (×20)
[3.14] cling (×200)
[3.15] thump (×2,000)
[3.16] clash (×10,000)
[3.17] whang (×100,000)
[3.18] bling (×200,000)
[3.19] thring (×200,000,000)
Now let's mix both the additive and multiplicative modifiers!
Examples: googolmassdump = 10^((100+20)*20) = 10^(120*20) = 10^2,400; throoguppyloaddingspeck (from throogol) = E((20+15)*5-1)###((20+15)*5-1) = E(35*5-1)###(35*5-1) = E(175-1)###(175-1) = E174###174
[WIP]