Some may not find the cyclic patterns as interesting as numbers that equal their own numerology value, aka fixed points of the algorithm number-->word-->number. So I made a script to find such numbers in various languages.
In English, if you use the assignment a=1, b=2, ... z=26, then there are two numbers that equal their numerology value when written out. They are :
- 251 = two hundred fifty-one
- 259 = two hundred fifty-nine
In Spanish using the assignment a=1, ... n=14, ñ=15, o=16, ... z=27 there are none.
In French, using the same alphabet and numerology assignment as English and ignoring accents marks, there are three:
- 222 = deux cent vingt-deux
- 232 = deux cent trente-deux
- 258 = deux cent cinquante-huit
In Portuguese, using the same alphabet and assignment as English and ignoring accent marks, there is one:
* * * * * * * *
Revisiting the cycles, if you do the numbers in French, there is a very long cycle of number --> word --> number...
- 302 = trois cent deux --> 177
177 = cent soixante-dix-sept --> 246
246 = deux cent quarante-six --> 245
245 = deux cent quarante-cinq --> 236
236 = deux cent trente-six --> 230
230 = deux cent trente --> 178
178 = cent soixante-dix-huit --> 244
244 = deux cent quarante-quatre --> 275
275 = deux cent soixante-quinze --> 295
295 = deux cent quatre-vingt-quinze --> 342
342 = trois cent quarante-deux --> 274
274 = deux cent soixante-quatorze --> 326
326 = trois cent vingt-six --> 247
247 = deux cent quarante-sept --> 253
253 = deux cent cinquante-trois --> 281
281 = deux cent quatre-vingt-un --> 285
285 = deux cent quatre-vingt-cinq --> 293
293 = deux cent quatre-vingt-treize --> 333
333 = trois cent trente-trois --> 286
286 = deux cent quatre-vingt-six --> 302 (back where you started)