Proof that nVidia makes you gay

http://www.youtube.com/watch?v=v2HJUSdfu24

If you use nVidia GPUs, you're probably already gay and don't even realize it.

From what I've heard, most big US hi-tech companies are very LGBT friendly.

95% of all humans are bisexual and you most probably havent realised that you are too.

>>3
Doh, people can turn gay if a fag corrupts them. Especially at young ages.

>>3
Stop spreading those Zionist/Cultural Marxist lies!

>>2
From what I've heard, most big US hi-tech companies are very LGBT friendly.
Don't you see? Most big US hi-tech companies are run and owned by Jews. Of course they're going to want to leverage the corporate culture to spread their Zionist agenda of faggotry to undermine society.

I'm bi and I use ATI5970.
Which is appropriate because it has two GPUs.

>>7
lol fag

Yep

>>7

haha, cute

Mathematical topics typically emerge and evolve through interactions among many researchers. Set theory, however, was founded by a single paper in 1874 by Georg Cantor: "On a Characteristic Property of All Real Algebraic Numbers"

Multiplication is associative (κ·μ)·ν = κ·(μ·ν).

The original formulation of infinitesimal calculus by Isaac Newton and Gottfried Leibniz used infinitesimal quantities. In the twentieth century, it was shown that this treatment could be put on a rigorous footing through various logical systems, including smooth infinitesimal analysis and nonstandard analysis. In the latter, infinitesimals are invertible, and their inverses are infinite numbers. The infinities in this sense are part of a hyperreal field; there is no equivalence between them as with the Cantorian transfinites. For example, if H is an infinite number, then H + H = 2H and H + 1 are distinct infinite numbers. This approach to non-standard calculus is fully developed in Howard Jerome Keisler's book (see below).

The momentum of set theory was such that debate on the paradoxes did not lead to its abandonment. The work of Zermelo in 1908 and Abraham Fraenkel in 1922 resulted in the set of axioms ZFC, which became the most commonly used set of axioms for set theory.

Paul Cohen invented the method of forcing while searching for a model of ZFC in which the axiom of choice or the continuum hypothesis fails. Forcing adjoins to some given model of set theory additional sets in order to create a larger model with properties determined (i.e. "forced") by the construction and the original model.

Every set has a choice function

Well-ordering theorem: Every set can be well-ordered. Consequently, every cardinal has an initial ordinal.