User:A51.archaeologist
Sohte aramas pahn idihng ehng uhk kehn ihdehng ehu peliehn lahmalahm.
ᴛʜɪs ᴅᴀʏ’s ᴛʜᴇ ᴏɴᴇ ʀᴇᴍᴇᴍʙᴇʀᴅ As ᴛʜᴇʏ ʜᴀᴅ ɴᴏᴛ ʏᴇᴛ ʙᴇɢᴜɴ ᴛᴏ ɢᴇᴛ ɪᴛ ʀɪɢʜᴛ.
Calendar[change | change source]
Letters A-Z (26) times (14) months is 364, with a seperate New Year's Eve. I like to use ADA, wherein the current year is 1,0022 ("Myriad 2, year 22").
Example of Babylonian language[change | change source]
Ee-nah kah-ti say-rey-toom, rah-bee-ah-noo, shah loop-shoo eez-tayn. Bah-shoo see-nah shay-rey-too, ach-hoom ah-ha, on-noom sheez-boo, on-noo sah-moo. Eep-shoo nah-pphalloo ah-nah shay-rayt shah, moo mah may-shoo, lee-boom, ooh loo, wvay-doom ay-zay-boo mah-tee-mah ayl-lee-ah-too lah-shushoo, El.
Goldbach's Conjecture[change | change source]
In German, the restated definition of Goldbach's Conjecture is:
- Jede gerade Zahl, die größer als 2 ist, ist Summe zweier Primzahlen.
Using the elevated form of the adjective for 2, as in, Vater zweier Kinder ("father of two children"), means two that differ: zweir, not zwein or zwei. Take the sentence, Die Zahl 22 besteht aus zwei Zweien. ("The number 22 is made of two 2s.")
Goldbach's puzzle to Euler is a plain one, since he explicitly indicates: 1, 2, and 3 are prime numbers. Perhaps the fact of their being the only 3 consecutive primes was what inspired him. Primes were a new idea, and Goldbach drew tables to illustrate his thoughts.
1's primeness is not always recognized, "because it has no factors but itself, and 'a prime number is "one that has 'only itself and 1' as factors"'"; rather than one having no factors but itself and 1.
- Prime numbers have no factors different from themselves or 1.
This, Goldbach himself was stating, by use of 4 as an example. He said 4 instead of 2, because 2 cannot be broken into two different components; just 1 and 1. Besides, no proper definition of prime numbers says they cannot be composite like 2. It is only rather casual definitions of compositionality which say, in error, that composed numbers cannot be also prime. 2's rather special. This conjecture is a corollary with 3 and higher primes' being always separable into an even and an odd, to 2's being the only and thus highest even prime.