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Problem: Prove that if k is an inaccessible cardinal, then V(sub k) satisfies all the axioms of ZFC.

Question: How?

V(k) is our set, and we are to show somehow that each axiom asserts the existence of a set that is a member of V(k)?

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 I'm afraid this question is too narrow for the scope of this site. You will have better luck asking it at math.stackexchange.com – Andres Caicedo Dec 15 2010 at 2:13
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 Please read the FAQ mathoverflow.net/faq - Mathoverflow is a site for asking research-level questions, and not for help with homework, as this question appears to me to be. – David Roberts Dec 15 2010 at 2:14
Sorry! I hadn't read that. I will delete this – kittykat687 Dec 15 2010 at 20:35

closed as off topic by Andres Caicedo, Qiaochu Yuan, Andy Putman, Ben Webster Dec 15 2010 at 2:23

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