|
2003-06-25, 03:56
|
#34 | |||
|
Jun 2003
25 Posts |
Quote:
Quote:
It doesn't sound bad so far...... Quote:
What I've been thinking was that maybe we could do the division until the remainder is 1, and that would mean, the number is almost certainly a prime. If you took a look at my links, you have probably seen that if the composite numbers have a pattern, in front of the pattern there is one or more digits, and ONLY THEN does the pattern start. For example 70: 0 142857 142857 142857 142857 But most of these numbers are even numbers anyway. 39 has a pattern, but it adds up to 6, not 9. etc. But prime numbers don't have anything before the pattern..... Because of this, we could do the division, and watch for the point when the remainder is 1. I show you what I think. Here is No. 79 It is prime, and the residue has a pattern, but it doesn't add up to 9: 0.0126582278481 Here is the good old fashioned way of dividing 1 by 79 :) Under the division the residues. (I hope it will look OK.) 1/79 = 0.0126582278481 100 _210 __520 ___460 ____650 _____180 ______220 _______620 ________670 _________380 __________640 ____________80 ______________1 I thought we could watch for the remainder of 1. That wouldn't be too bad, because the residue is most of the time smaller than the number itself. It might be twice as much work, but it still could be done. I hope :) This is exciting, even if it doesn't work out ;) Eva |
|||
|
|
|
2003-06-25, 04:23
|
#35 |
|
Jun 2003
25 Posts |
Just to add something:
As far as I can see, the sum of the digits of the repeating part of the prime numbers is always divisible by 9, even if the digits don't add up to 9 pairwise. That's why I think we might be able to find a general rule for all the primes. Other composits don't have this quality. Or their digits adds up pairwise to 6, 8, etc. There is a definite regularity to the primes. Eva |
|
|
|
|
2003-06-30, 21:14
|
#36 |
Jun 2003
Pa.,U.S.A.
22×72 Posts |
inverse multiplicative
I like to look at primes in terms of Wilson,s theorem where to
a factorial +1 , a number that is indivisible , multiplies, as perhaps the place to look for the inverse of a prime, as a specific. |
|
|
|
|
2003-07-02, 12:54
|
#37 |
|
Jun 2003
25 Posts |
Re: inverse multiplicative
It sounds interesting, but I must admit I don't know anything about this.
Would you mind explaining it in a few words? |
|
|
|
|
2003-07-02, 14:55
|
#38 | |
"Richard B. Woods"
Aug 2002
Wisconsin USA
22·3·641 Posts |
Quote:
|
|
|
|
|
 |
Similar Threads
|
||||
| Thread | Thread Starter | Forum | Replies | Last Post |
| Windows 10 in Ubuntu, good idea, bad idea, or...? | jasong | jasong | 8 | 2017-04-07 00:23 |
| Idea (as always) | Dubslow | Forum Feedback | 7 | 2016-12-02 14:26 |
| idea ? | science_man_88 | Homework Help | 0 | 2010-04-23 16:33 |
| An Idea | ThomRuley | Lone Mersenne Hunters | 5 | 2003-07-15 05:51 |
| Just a little idea... | Xyzzy | PrimeNet | 5 | 2003-06-30 03:19 |
