Lambda calculus help

So i'm totally stuck on this one part of a problem. It would be awesome if someone could help.........

Show that the term ZZ where Z is λz.λx. x(z z x) satisfies the requirement for fixed point combinators that ZZM =β M(ZZM).

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–  Alex Nov 23 '10 at 1:33
Try math.stackexchange.com. This question isn't exactly relevant to programming directly. –  Noldorin Nov 23 '10 at 1:34
sorry. This was homework from a comp sci class, thought it would fit here. –  user516849 Nov 23 '10 at 1:37
@Noldorin: Why not? The lambda calculus is a programming language, why wouldn't questions about it be on topic here? I would expect the average mathematician to know significantly less about the lambda calculus than the average computer scientist. –  sepp2k Nov 23 '10 at 20:08
@Noldorin: You can express computations in the lambda calculus and a computer program can interpret and execute them. That makes it a programming language in my book. It might not be practically useful (for one thing all you ever get back are functions), but neither is e.g. brainfuck, but no one disputes that that's a programming language. –  sepp2k Nov 23 '10 at 21:17
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`````` Z Z M = (λz.λx. x(z z x)) Z M > (λx. x(Z Z x)) M > M (Z Z M)