Not for the faint of art. |
Complex Numbers A complex number is expressed in the standard form a + bi, where a and b are real numbers and i is defined by i^2 = -1 (that is, i is the square root of -1). For example, 3 + 2i is a complex number. The bi term is often referred to as an imaginary number (though this may be misleading, as it is no more "imaginary" than the symbolic abstractions we know as the "real" numbers). Thus, every complex number has a real part, a, and an imaginary part, bi. Complex numbers are often represented on a graph known as the "complex plane," where the horizontal axis represents the infinity of real numbers, and the vertical axis represents the infinity of imaginary numbers. Thus, each complex number has a unique representation on the complex plane: some closer to real; others, more imaginary. If a = b, the number is equal parts real and imaginary. Very simple transformations applied to numbers in the complex plane can lead to fractal structures of enormous intricacy and astonishing beauty. |
As has been my custom on Sundays, I randomly picked an older blog entry to take another look at. This time, we're going back all the way to May of 2008, with a really very short one: "O Bai teh Wai..." You may have noticed a lot of the early ones were short. I'm pretty sure that's partly because this was before Newsfeed was introduced here. In a way, it's good, because there's a record of what I was thinking in 2008. But it's also bad, because there's a record of what I was thinking in 2008. The entry contains a naked link (x-link hadn't been invented yet, either). I suggest you don't click on it. It's nothing like whatever I'd found 16 years ago. I have a vague memory of "lolcatbible" being a translation of, you know, that book into lolcat pidgin. But I could be wrong, confusing it with the Pirate Bible and the Brick Testament. Doesn't matter. It's not there anymore. As I noted in that long-ago entry: I mean, really. Lolcats should have been done by now. Srsly. Lolcats certainly aren't done, though they've evolved (that evolution sometimes even involves better spelling and grammar). That site, though... that's done. But, as with my embarrassing blog entries from the noughties, most things on the internet never truly die. With a cat's curiosity, I searched for "lolcat bible," and found this WIkipedia entry. Oh hai. In teh beginnin Ceiling Cat maded teh skiez An da Urfs, but he did not eated dem.... |