> > > long ago slave boss was tasked with calculating the square root of > > > infinity > > > > > > sadly he was told that this is simple and the square root of infinity > > > is simply infinity! > > > > > > when asking why this is, he is now told that it's because infinity > > > times infinity is still infinity, so ... > > > > > > but he disagrees !! > > > > > > he says obviously infinity squared is a _two dimensional infinity_ -- > > > an infinity that is much larger in that it extends in two full > > > dimensions, infinitely, rather than simply being a one-dimensional > > > infinity quantity of something in a line. > > > > > > now, the challenge, he may say, is to calculate the square root of a > > > one-dimensional infinity ! what is this, you might ask? > > > > > > well, slave boss has finally, maybe a decade later, figured this out: > > > > > > the square root of a one-dimensional infinity, is the square root of > > > one-dimensionalness, multiplied by the square root of infiniteness. > > > > > > where "the square root of one-dimensionalness" is an abstract quantity > > > (like the imaginary number) that when squared yields a one-dimensional > > > attribute of something, and "the square root of infiniteness" is > > > another abstract quantity (like the imaginary number (or root 5?)) > > > that when squared, yields the smallest infinite amount -- > > > > there is guess that this _may_ not be correct; a chance exists that it > > could be simply something somebody made up-- > > slave boss possible math notes > > hmmm sqrt(fruit) * log(plank) / house ^ sky
integral(from this side, to the other side, of chicken, over road)
