About the segregation law of integers.

 About the segregation law of integers. 

Can there be prime numbers in the group of integers? 

The segregation law means that all numbers can be divided into subsets. And this means that there cannot be a so-called prime number in the group of integers. The prime number is divisible only by one and itself. And that means an integer can be a prime number only if its divider is another integer. This means that, for example, 1, 2, and 3 are so-called virtual prime numbers. The reason for that is that we can divide those numbers into parts using decimal numbers. 

This means

1=0,5*2

1=0,25*4

1=0,05*20

but

1=0,0625*16 (0,25/4=0,0625) and (0,0625*16)

Let’s play with number 2

2=0,5*4

2=0,25*8

2=0,05*40

and

2=0,0625*32

And with 3

3=0,5*6

3=0,25*12

and

3=0,0625*48

So are 1,2, and 3 integers? The fact is that all numbers include one. And that means there are no real prime numbers in the group of integers. So, if we think like that, prime numbers are hiding on in the groups of decimal numbers.