The relationship of Counting number field & Prime numbers

SophiaRivera007 · January 11th, 2017, 10:27 PM

Counting number field (1,2,3,....) results into consequences such as for example prime numbers. Prime numbers are located in the counting number filed (1,2,3,4,5,6,7,8,9,10,11,...). The bolded numbers are primes. So we can assume that the counting number field has a great relationship to PN that needs to study to know the deep nature of prime numbers.So for you, what could be there relationship?

Joppy · January 11th, 2017, 10:32 PM

Quote:

Originally Posted by SophiaRivera007 $View Post$

So for you, what could be there relationship?

Tough question!

romsek · January 11th, 2017, 11:18 PM

Quote:

Originally Posted by SophiaRivera007 $View Post$

Counting number field (1,2,3,....) results into consequences such as for example prime numbers. Prime numbers are located in the counting number filed (1,2,3,4,5,6,7,8,9,10,11,...). The bolded numbers are primes. So we can assume that the counting number field has a great relationship to PN that needs to study to know the deep nature of prime numbers.So for you, what could be there relationship?

There was a guy on here a couple of weeks ago fresh out of prison who's buddy had it all worked out.

He was looking for info on how his buddy could publish so I'm sure you'll be reading about it soon!

AshBox · January 15th, 2017, 09:35 PM

Here is something more interesting than just criticising.
The formula,

n2 + n + 41 where n is 0,1,2,3, 4 ..........

produces all prime numbers as far as n=39 and more prime numbers than any other quadratic formula as we run through the counting numbers.
This was due to Euler.

romsek · January 15th, 2017, 09:57 PM

Quote:

Originally Posted by AshBox $View Post$

Here is something more interesting than just criticising.
The formula,

n2 + n + 41 where n is 0,1,2,3, 4 ..........

produces all prime numbers as far as n=39 and more prime numbers than any other quadratic formula as we run through the counting numbers.
This was due to Euler.

I was serious!

help man in prison

January 11th, 2017, 10:27 PM	#1
SophiaRivera007 Newbie Joined: Dec 2016 From: United Kingdom Posts: 14 Thanks: 1	The relationship of Counting number field & Prime numbers Counting number field (1,2,3,....) results into consequences such as for example prime numbers. Prime numbers are located in the counting number filed (1,2,3,4,5,6,7,8,9,10,11,...). The bolded numbers are primes. So we can assume that the counting number field has a great relationship to PN that needs to study to know the deep nature of prime numbers.So for you, what could be there relationship?
$SophiaRivera007 is offline$

January 15th, 2017, 09:35 PM	#4
AshBox Member Joined: Oct 2016 From: labenon Posts: 33 Thanks: 4	Here is something more interesting than just criticising. The formula, n2 + n + 41 where n is 0,1,2,3, 4 .......... produces all prime numbers as far as n=39 and more prime numbers than any other quadratic formula as we run through the counting numbers. This was due to Euler. Thanks from SophiaRivera007
$AshBox is offline$

Thread Tools
$Show Printable Version$ Show Printable Version $Email this Page$ Email this Page
Display Modes
$Linear Mode$ Linear Mode $Hybrid Mode$ Switch to Hybrid Mode $Threaded Mode$ Switch to Threaded Mode

Similar Threads
Thread	Thread Starter	Forum	Replies	Last Post
What is Relationship between $\zeta(s)$ and Simple Prime-Power Counting Function?	SteveC	Number Theory	0	November 5th, 2016 04:41 PM
An equation of prime counting function.	jim198810	Number Theory	6	March 26th, 2015 07:31 PM
geometry of numbers argument, show that an odd prime number	maximus101	Number Theory	2	November 9th, 2012 07:43 AM
Additive theory of number and prime twins numbers	ibougueye	Number Theory	8	February 7th, 2012 03:33 PM
Proof involving a field and prime numbers	Dudealadude	Abstract Algebra	1	January 28th, 2012 02:03 AM