39509
So do I... By the way, each primenumber except 2 and 3 can be represented as 6A+1 or 6A-1 (where A is integer), but is every 6A±1 number a primenumber?
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So do I... By the way, each primenumber except 2 and 3 can be represented as 6A+1 or 6A-1 (where A is integer), but is every 6A±1 number a primenumber?
39511
nope
San-man kyū-sen go-hyaku ni-jū ichi
Jack Bauer, i don't know, if that is another language which i don't understand. maybe u meant 39521? in this case u were right
now me: 39541
Quotebut is every 6A±1 number a primenumber?
just some examples: try A=20 or A=24 or A=31
Jack used transliterated Japanese in his post
My number: 39551 - neun und dreizig tausend funf hundert ein und funfzig
Yes your examples are correct
- Wanderer -
uhm, oookeeeeeeyyy
39563 - тридцать девять тысячь пятьсот шестьдесят три
right?
when the difference between 2 prime-numbers is more than 8 u will find a missing A. nevertheless it is interesting to find prime-numbers just by simple algorithms.
39569
One small spelling mistake (тысячь -> тысяч), but the rest is right
- Wanderer -
39581
this small mistake doesn't really count since it is nearly impossible to pronounce a well understandable ь after the ч without injuring the own tongue, at least for me
39607
Actually there is no difference in pronunciation :wacko: Sorry about your tongue injury!
- Wanderer -
39619
ahm, no worries
39623
39631
Welcome back on here Wanderer
That's what I should say to you, Michael
39659
Works both ways
You also didn't reply for months from what it shows.
39667
Yeah, my bad...
39671
- 39679 -
- 39703 -
- 39709 -
- 39719 -
(TBH I used this one http://de.wikibooks.org/wiki/P…r_Primzahlen_(2_-_100.000))
- 39727 -
(i use my excel-sheet where i wrote a macro to calculate some prime-numbers )