User blog:Nayuta Ito/ExE prefixes and suffixes explained

n is any number, and x is any Greek number (e.g. mono, di, tri, quadri, quinti).

stems
eyelash mite=20,000

dust mite=50,000

cheese mite=80,000

clover mite=200,000

pipsqueak=10^7

little squeaker=squeaker=5*10^10

small fry=10^15

guppy=10^20

minnow=10^25

goby=10^35

gogol=10^50

jumbo shrimp=prawn=10^65

lightweight=10^75

ogol=10^80

tiny twerpuloid=10^85

googol=10^100

eceton=10^303

giggol=E100#1=$$10\uparrow\uparrow 100$$

grangol=E100#100=$$(10\uparrow)^{100}100$$

gaggol=E1#1#100

greagol=E100#100#100 (or grangol-novemnonaginti-dex)

grangol=E100#100#100#100

gorgegol=E100#100#100#100#100

gulgol=E100#100#100#100#100#100

gaspgol=E100#100#100#100#100#100#100

ginorgol=E100#100#100#100#100#100#100#100

gargantuul=E100#100#100#100#100#100#100#100#100

googoldol=E100#100#100#100#100#100#100#100#100#100

multiplication or smaller
(n)-speck=n*10^-10

(n)-crumb=n*10^-5

(n)-chunk=n*10^-1

(n)-bunch=n*10^1

(n)-crowd=n*10^5

(n)-swarm=n*10^10

(these 6 suffixes above are called size-modifiers)

(n)-minutia=n^-1=1/n

(n)-bit or binary-(n) means to change all the 10s in the power tower into 2s. Something like 100 or 1000 does not take the effect. Therefore, googolplexibit is 2^2^100.

(n)-byte or octal-(n) is base 8.

Ternary is base 3. Quaternary is base 4. Quinary is base 5. Duodecimal is base 12. Hexadecimal is base 16. Vigesimal is base 20. Sexagesimal is base 60.

exponentiation
For these eight suffixes, it's difficult to explain. Basically "change the 100 into the number" helps, but stem comes directly before the suffixes, for example, bell means (5000/100)th power. And it always comes the last because it changes all the base of the numbers.

Ding is 500. Chime is 1000. Bell is 5000. Toll is 10000. Gong is 100000. Bong is 10^8. Throng is 10^11. Gandingan is 10^14.

Gandingan is aka quadrigong. Quintigong is 10^17, Sextigong is 10^20,...,x-gong is 10^(3x+2),...(The ExE site has the description of "milli-milligong," whose x is million)

(n)-plex=10^n=En

Duplex, triplex, quadriplex, and so on. (The site has milli-milliplex) (n-xplex is En#x)

(n)-plexion is (n)-illion-plex.

Of course it has duplexion, triplexion, and so on.

fz(n) is n^n. (This is not from ExE and only used for #469)

up-arrow level
(x)-logue is x^^x.

If n can be written as Ea#(array), n-dex is Ea#(Ea#(array)). The array can be any length.

(note: googol-x-plex-y-dex is E100#(x+1)#(y+1))

x-taxis=E1#1#x (as strong as pentation)

(n)-threx is Ea#b#(array) to Ea#b#(Ea#b#(array)). If the number is like E100, consider it as E100#1#1.

Any perfect power can have threx.

x-petaxis=E1#1#1#x (as strong as hexation)

tetrex and exaxis, Ea#b#c#(Ea#b#c#(array)).

pentex and eptaxis for the fifth entry.

hex and octaxis for the sixth entry.

heptex and ennaxis for the seventh entry.

octex and dekaxis for the eighth entry.

ennex and endekaxis for the ninth entry.

decex and dodekaxis for the tenth entry.

For the names of E100##n (1=10)-(1's place)-(10's place) is the name of E100##n.

E100##100 is googonhectol but what is further is unknown.

higher
"great" adds "#2" to the last. Or "E100##" to the first.

(Now I think I have zipped every number up to #1141 into this short blog)