User blog:MachineGunSuper/My problem with pi

Problem 1
Here's one thing: Imagine PI without the decimal point. Now, that number would obviously be infinite. And that it never repeats itself. If you made a number so, so large wouldn't it contain all the possible arrangements for the digits? Same is for pi without the decimal, it would eventually use up all the possible combinations. The only thing that can save it would be partially repeating numbers.

What I meant is that after some time, let's say the number 7 repeated 2 times. Then something else would come, after wich it repeats 3 times. Then another thing, after wich it repeats 4 times and so on... I know that some people would agree that it never repeats and that it will be unique forever, but some people might find that as a pattern and call that repeating. Even though the digits themselves don't repeat. What do you think? I mean, OBVIOUSLY, pi isn't repeating, but there is NO way, after some time a pattern must come, like the one mentioned above.

Let's say that this is some googol digits into pi: 77145789977746678907777789004345677777....

My opinion is that the digits that aren't in bold will eventually repeat, but the sevens will repeat, each time having more quantity. This is some sort of axiom, I call it the Repeating Pattern PI. Now of course, it probably has another name, but I like to call it like that. It is the belief that Pi will run out of digits, and it will have to repeat some, then add one that repeats but each time more times.

Problem 2
This problem is much, much less important but it will upset people that want the EXACT, EXACT value of things.

While I don't care about it that much, sometimes I think that it is all wrong, and it is aproximatelly right. And that is problems with PI .

Eg. 10π does not have an actual exact value. Instead it is an aproximation. And the more commom case is when finding out the surface area of a cirlce/the volume of a sphere. πr2 /4 πr2