I had looooong coffee chats with my best pal talking about Irrational numbers and the diference between other numbers. Well, both of us agree in this different point of view:

Irrational numbers are relations, as functions, in a way, what way? Well, think about "if you want a perfect circle, give me a perfect pi", but circles are diferent to the other figures (4 sides, 5, 6... 100, 200) but... How many more sides do you have, more like a circle it look like. If you followed me so far, connecting all this ideas here is the pi formula:

So, pi is a function, but one that never ends! because of the ∞ parameter, but I like to think that you can have "instance" of pi, if you change the ∞ parameter for a very big Int, you will have a very big pi instance.

Same with e, give me a huge parameter, I will give you a huge e.

Putting all the ideas together:

As we have memory limitations, the language and libs provide to us huge instance of irrational numbers, in this case, pi and e, as final result, you will have long aproach to get 0, like the examples provided by @Chris Jester-Young

`exp`

, then it loses its "poetry". – Chris Jester-Young Sep 23 '11 at 0:41notagree that`exp(pi * i) + 1 = 0`

. It's only the pure mathematical form that's accepted as true. The question is an exploration of how "leaky" that is in floating-point terms. – Chris Jester-Young Sep 23 '11 at 0:45`exp`

by its floating-point basis, which brings the`exp`

form into the domain of floating-point. Obviously, in floating-point terms,`exp(pi * i) + 1 != 0`

. Thus your change to use`exp`

, going by your logic of changing to`exp`

in the first place, would falsify the first sentence of the post. – Chris Jester-Young Sep 23 '11 at 0:59