Thursday, March 17, 2011

Atheists Need Better Nicknames

Thanks to the incomparable Rebecca Watson, I recently learned of a new argument for the existence of God due to Christian YouTube personality Venom Fang X. And I immediately thought, "Wow. I wish I'd thought of the the name Venom Fang X."

I mean, just look at the pathetic atheist nicknames out there:
Come on, folks! We can't compete with Venom Fang X with nicknames like these! Let's get those atheist brains in gear and come up with some good names! (But "Skepchick" is pretty cool, you've got to admit.)

Monday, March 14, 2011

Satan Is Born

I haven't had much time for blogging recently, so let me point you to this essay. The basic idea: early Judaism didn't have any concept of heaven or hell or Satan (as we understand him). All these concepts crept in through the influence of pagan religions, prominently Persian Zoroastrianism. Take a look, it's pretty cool stuff.

Friday, March 4, 2011

Swinburne Is Wrong Even When He's Right

Over at the Secular Outpost, The Coherence of Theism, in support of this claim.

You should read the argument yourself at the linked page, but as I understand it, it goes as follows:
  1. If the existence of God were a logically necessary truth, then any statement that follows logically from God's existence would also be a logically necessary truth.
  2. Thus the negation of any such statement would be  logically incoherent.
  3. When we look at these negated statements, they are not obviously incoherent.
  4. Therefore, the existence of God must not be a logically necessary truth. 
    It would certainly be convenient for us atheists if there was a nice knock-down argument against deductive proofs of God. So I would like to be able to go along with Swinburne here. Unfortunately, the argument seems to fail.

    Let's try out the same argument on a different topic. Let us suppose that the basic theorems of arithmetic are logically necessary. Now, take any statement that follows from the basic theorems: Fermat's Last Theorem, for instance. The negation of that statement is, of course, false. Here is the negation:
    The equation  an + bn = cn has a solution for some integers a, b, and c, and some integer n greater than 2.
    Now, that statement is certainly not obviously incoherent. Indeed, no one knew whether it was true or false for over 250 years. By Swinburne's argument, then, the basic truths of mathematics must not be logically necessary.

    So, why does Swinburne think that the negation of a necessarily true statement should be obviously incoherent? It beats me.

    Intuitively, it seems unlikely that any such a sweeping argument against deductive proofs of God's existence will be successful, any more than deductive disproofs of God's existence.