# every whole number is a natural number

“Every whole number is a natural number.” It is a statement that the world’s religions use to proclaim that the number of the universe is the same as the number of atoms in the universe is. So, for example, the “number of the universe” of the Hindu is equal to the “number of atoms in the universe”, which is equal to the “number of the universe” of the Buddhist.

This is a bit like the famous Chinese Proverb “A natural number is the sum of its divisors.” And the whole number is the sum of its divisors. If you can prove this simple proposition, you can prove the whole number is a natural number. And if you can prove this proposition, you can prove the whole number is a natural number.

This is a bit like trying to figure out how to play musical notes when playing a piano and playing a guitar. Not only that, it is a bit like trying to figure out where to put the strings in what is called the Bithrum of the C major.

The Bithrum of C major says that every whole number is a natural number. It is just a matter of trying different sounds for each of the 4 notes. If you can prove this proposition, you can prove the whole number is a natural number. And if you can prove this proposition, you can prove the whole number is a natural number.

If this is true, then every natural number is also the sum of two integers, which is a very common and useful fact. But if it’s true, then every natural number is also the sum of a whole number and a integer, which is a bit more tricky. In fact, if this is true, then every natural number is also the sum of two integers, which is exactly what it sounds like. Of course, proving this isn’t just something for the mathematicians.

But in this case you can also prove by induction that every integer and every whole number is the sum of two integers. In fact, if you’ve already proved that every natural number is a sum of two integers, you can prove that every whole number is a sum of two integers. And if you’ve already proved that every integer is a sum of two integers, you can prove that every whole number is a sum of two integers.

So what? We’ve known that every natural number is the sum of two integers since time immemorial, right? Well, the proof is that every natural number is the sum of two integers that are not divisible by 7. That’s a pretty simple and short proof.

The most important thing here is that it’s impossible to prove that every natural number is a sum of two integers. I can’t get past the fact that every number is a sum of two integers as well, so the proof is that every natural number is the sum of two integers. So all you got to do is prove that every natural number is a sum of two integers.

This is a very important question. If we are only concerned with the numbers and not the numbers themselves, then we should expect that every natural number is a sum of two integers. So, I think that this should be an interesting and important question for the author.