Remember pi from your high school math classes? Well just in case you’ve forgotten, pi is the ratio between the distance around a circle (its circumference) and the distance across a circle (its diameter). A perfectly round, perfectly planar circle is about 3.14 times farther around than it is across. But it’s not *exactly* 3.14 times longer. In fact, there’s no way to write the *exact* relationship, because pi is irrational.

I don’t mean to say that pi isn’t logical or reasonable; I mean that pi cannot be expressed as the *ratio* of two integers. The numbers 18, 5/9, and -54.5 are all *rational* because they can all be written as fractions with whole numbers (positive or negative) in the numerator and the denominator. All rational numbers have a few traits in common: when written in decimal form, the digits after the decimal either come to an end (as in -54.5) or repeat the same pattern infinitely (as in 5/9, which is the same as 0.555555…).

Pi isn’t like that. There are no two integers you can think of that, when written as a fraction, will be exactly equal to pi. The fraction 22/7 is *fairly* close to pi, but not exactly equal.

And it’s not just that mathematicians have not *yet* been successful in finding the magic fraction that precisely captures the value of pi; it is utterly impossible to do so. The absolute irrationality of pi was first proved in 1761 by Johann Heinrich Lambert. But I digress.

What about the rest of this meme? Is it really possible to find every picture, every word, every social security number buried within the digits of pi? To be honest…nobody really knows.

Imagine that you had a random number generator – I mean a *truly* random number generator (you get them at the same place you buy frictionless pulleys and absolute zero meat lockers). Let’s say you set the generator to run day and night, churning out digits to fill the decimal places of a number that is to be infinitely long. In other words, eighty squillion years from now, when the last proton decays into a burst of energy and all other matter is gone, this random number generator will still be cranking out digits (having somehow avoided decaying itself…I’m still working out the logistics on that one). Invoke your God-like powers to travel to the end of space and time, where existence is an abstraction, and examine the infinite sequence of random digits. Yes, in this infinitely long sequence of randomly generated digits, you will truly find *every* conceivable series of digits. Want to find the telephone number of your first crush? Got it. All of Shakespeare’s plays, translated into Klingon and then represented in binary? Got it. A digital recreation of the Mona Lisa as it would look if it were painted by Andy Warhol? Got it. It’s all there, hidden somewhere within the infinite possibilities, if you know where to look.

Although the digits in pi are not randomly generated, the digits *are* expected to turn up in about the same manner as if they *were* randomly generated. In other words, in the first million digits of pi, you’d expect to see approximately 100,000 ones, 100,000 twos, 100,000 threes, and so on. And so far, that has held true, but we cannot claim to know that it will *always* be true. That’s the nature of infinity; even if we know one googol of pi’s digits, we still know essentially zero percent of them. There is always some possibility that, for reasons yet unknown (and perhaps unknowable), the digit seven will suddenly stop appearing in pi somewhere after the 44 quadrillionth digit. And if it does, then any sequence containing the digit seven that has not yet appeared…will never appear. In fact, it’s possible that all but two digits could stop occurring in pi, and pi could still go on forever without repeating. And although these may sound like mathematical abstractions – outcomes that will never occur – we cannot say for sure.

I would like this meme better if it contained some hedge words like “probably” or “maybe”, but it doesn’t. It’s presented as a sexy math fact – a quotably nifty truth that might not actually be true. It has that “gee whiz” appeal, but it does little to prepare one for the brain-busting unknowableness of the infinite, with its endless possibilities. And for my money, it’s aimed in the wrong direction. To me, it’s a far *less* interesting possibility that pi might contain every imaginable number sequence, and a far *more* interesting possibility that it might not.