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Numerical Prefixes
In this page, I discuss a curious set of unusual words: adjectives and nouns for numerical values or multiples. What do you call a group of eleven musicians? An athletic competition with six events? An event that recurs every twenty years? It can be very difficult to figure out what sort of prefix to use, and there are plenty of exceptions to the rules. Because many of these words aren’t found in dictionaries (particularly as the relevant numbers get larger), having some general principles can help. Thus, where other word lists of the Phrontistery are simply listed in “word: definition” form, this page will try to show you, in tabular format, how to construct your own terms from the basic principles, and to give you a better grasp of this tricky topic. Let’s begin!
In general, these words are made by combining a prefix derived from Latin or Greek number words and a suffix indicating the type or category of the thing being counted. If you know a lot of word etymologies, you can usually figure out whether a word takes a Latin or Greek numerical prefix if you can tell whether the suffix you want to use is Latin or Greek in origin. However, if you can’t work out the etymology, it’s probably best to just look at the lists below, which indicate which prefixes are used with which suffixes. Besides, there are exceptions to this general rule.
Latin prefixes (uni, bi, tri …) are normally used for the following categories.
- mathematical bases “-al”
- adjectives of relation “-nary”
- groups of musicians “-tet”
- words for multiples of something “-uple”
- number of years between two events “-ennial”
- number of sides of something “-lateral”
- words for large numbers / exponents “-illion”
- less common categories: number of leaflets or petals on a leaf or flower “-foliate”, chemical valencies “-valent”; division into parts “-partite” or “-fid”.
In this first table, I’ve listed the Latin words for 1 through 12 along with the appropriate prefix that is derived from it. For each of the above categories, check the appropriate column and find the word list. In cases where the word couldn’t be found in regular dictionaries, I’ve extrapolated from the other words and used appropriate prefixes and endings to construct the correct form. In such hypothetical cases, the word is marked with an asterisk and put it in italics.
TABLE 1: LATIN-PREFICED NUMERICAL WORDS
| Numeral | Prefix | Base | Relation | Music | Multiple | Yearly | Sides | Exponent | |
|---|---|---|---|---|---|---|---|---|---|
| 1 | unus | uni | N/A | unary | (solo) | (single) | (annual) | unilateral | (million) |
| 2 | duo | bi/duo | binal | binary | duet | duple/double | biennial | bilateral | billion |
| 3 | tres, tria | tri | trial, tertial | trinary, ternary | trio | triple/treble | triennial | trilateral | trillion |
| 4 | quattuor | quadri/quart | quartal | quaternary | quartet | quadruple | quadriennial | quadrilateral | quadrillion |
| 5 | quinque | quinque/quint | quintal | quinary, quinquenary | quintet | quintuple | quinquennial | quinquelateral | quintillion |
| 6 | sex | sex(t), se | sextal | senary/sexenary | sextet | sextuple | sexennial | *sexilateral | sextillion |
| 7 | septem | sept | septimal | septenary | septet | septuple | septennial | septilateral | septillion |
| 8 | octo | oct | octal, octaval | octonary | octet | octuple | octennial | octilateral | octillion |
| 9 | novem | nonus/novem | nonal | nonary | nonet | nonuple, noncuple | novennial | *nonilateral | nonillion |
| 10 | decem | dec(a), de | decimal | denary | dectet | decuple | decennial | *decilateral | decillion |
| 11 | undecim | undec, unde | undecimal | undenary | *undectet | *undecuple | undecennial | *undecilateral | undecillion |
| 12 | duodecim | duodec, duode | duodecimal | duodenary | *duodectet | duodecuple | duodecennial | *duodecilateral | duodecillion |
So far, so good. We can see that there are a few exceptions to the general rule, particularly for the numbers 1 and 2, and in some cases such as “quinary / quinquenary” where multiple forms exist. Since I’m not being hardline about “proper” forms, I’m including all the forms normally used, even when they don’t strictly follow the rules. Up to 12, the Latin prefixes hold up pretty well; most of the forms exist; only “sexilateral”, of all the hypotheticals, is less than nine. My theory is that it sounds too lewd to have been adopted as the term for something with six sides. Well enough, then. Let’s turn to the Greek prefixes (mono, di, tri …), which are used for the following categories:
- number of sides of plane figures “-gon”
- number of faces of solid figures “-hedron”
- number of angles in a shape or line “-angle”
- number of rulers in a government “-archy”
- number of meters in a poetic verse”-meter”
- number of objects in a group “-ad”
- number of events in an athletic competition “-athlon”
- less common categories: numbers of syllables in words “-syllabic”; sets of books or other works “-logy”; number of fingers “-dactylic”; number of languages spoken “-glot”; number of parts “-merous”; number of columns “-style”; amount of carbon in many chemical molecules “-ane”, “-ene”, “-yne”.
And now, Table 2 shows us the Greek numeral words and prefixes in conjunction with the appropriate suffixes for the above categories.
TABLE 2: GREEK-PREFIXED NUMERICAL WORDS
| Numeral | Prefix | Polygon | Polyhedron | Angle | Ruler | Meter | Group | Event | |
|---|---|---|---|---|---|---|---|---|---|
| 1 | en | mono | N/A | N/A | N/A | monarch | N/A | monad | N/A |
| 2 | dyo/duo/di | di/dy | N/A | N/A | N/A | diarch, dyarch | dimeter | dyad | biathlon |
| 3 | treis, tria | tri | triangle | N/A | triangle | triarch | trimeter | triad | triathlon |
| 4 | tessera | tetra | tetragon | tetrahedron | quadrangle | tetrarch | tetrameter | tetrad | tetrathlon |
| 5 | pente | penta | pentagon | pentahedron | pentangle | pentarch | pentameter | pentad | pentathlon |
| 6 | hexa | hex | hexagon | hexahedron | hexangle | hexarch | hexameter | hexad | *hexathlon |
| 7 | hepta | hept | heptagon | heptahedron | heptangle | heptarch | heptameter | heptad | heptathlon |
| 8 | okto | oct | octagon | octohedron | octangle | octarch | octameter | octad | *octathlon |
| 9 | ennea | ennea | enneagon, nonagon | enneahedron | *enneangle | *ennearch | *enneameter | ennead | *enneathlon |
| 10 | deka | dec(a) | decagon | decahedron | decangle | decarch | decameter | decad(e) | decathlon |
| 11 | hendeka | hendec(a) | hendecagon, undecagon | hendecahedron | *hendecangle | hendecarch | *hendecameter | *hendecad | *hendecathlon |
| 12 | dodeka | dodec(a) | dodecagon | dodecahedron | *dodecangle | dodecarch | *dodecameter | dodecad(e) | *dodecathlon |
The situation with the Greek terms is a little more complex than with the Latin, but not excessively so. Latin prefixes are used for some words for polygons, although the Greek prefix is to be preferred. “Biathlon” should, by all rights, be “diathlon”, “triangle” is used for a plane figure as well as angles (instead of ‘triagon’), and there are very few terms for 1 and 2. Of course, this is partly because there’s no such thing as a two-faced polyhedron, and not much point in describing a single athletic event as a “monathlon” …
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