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Here are few True False questions: Somebody please answer these:

  1. Let F(0) = 1, and let F(n) = 2^F(n-1) for n>0. Then Is F Turing-Computable?

  2. No language which has an ambiguous context-free grammar can be accepted by a DPDA. Is this true ? If not which grammar is that.

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is this a Physics question ? –  Raptor Dec 7 '12 at 2:31

2 Answers 2

up vote 0 down vote accepted

For (1), ask yourself this question: could you write a computer program that could compute this function? If so, then by the Church-Turing thesis, then you know that there must be a TM that could do the same computation, so the function is computable. If not, then you know that no TM could evaluate the function either.

For (2), remember that ambiguity is a property of grammars. There can be multiple grammars for the same language.

Hope this helps!

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I guess the first one is true.

According to the Church–Turing thesis, computable functions are exactly the functions that can be calculated using a mechanical calculation device given unlimited amounts of time and storage space. Equivalently, this thesis states that any function which has an algorithm is computable.

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Thank you for the answers. However If that is the case, Every function that can be mathematically defined is Turing computable? –  Niraj Rana Dec 7 '12 at 4:29

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