This may be a simple question, but I'm intrigued and am not having much luck looking it up. At least in the US and other major countries, you have a units place, tens place, then hundreds place. After a comma, you go to thousands, ten thousands, hundred thousands.
So why was it set up like that? What's the logic behind it? I'm creating my own number system for fun, and I'm wondering "what's to stop me from having 4 or 7 main value places?".
Best Answer
It's certainly true that this is an instance of "chunking", but I think that writing numerals that way follows the way we name the numbers in the first place. Consider $123,456,789$. Each $3$-digit block is read as a stand-alone three digit number, followed by an appropriate big-number word: "One hundred twenty three.... million," then "four hundred fifty six... thousand," and finally "seven hundred eighty nine."
Thus, the question is really, why did we stop making new words for each place value after "thousand"? Rather than sticking with "myriad", a somewhat disused word for $10^4$, we call it "ten thousand", and then $10^5$ is "one hundred thousand", with no new word being introduced until "a thousand thousand", which we call a "million".
I suspect - and this is entirely speculative - that this happened because, in the time when this aspect of language was being developed, there wasn't much use for numbers as big as $10,000$, so they were described in terms of smaller numbers, rather than being named independently. Looking at the etymology of the word "million", it originally would have meant "a great thousand", which sounds a little less silly than "a thousand thousand". Note that, after that, the words for additional multiples of $1000$ use prefixes for $2$ (bi-llion), $3$ (tri-llion), etc.