I think i am close to this answer but still to confirm can we create a turing machine(At least in Principle) which can work on real number computation and give exact results?**For example finding square root of an integer.(whose output would be a real number) My logic that we can't develop such a machine is that the real numbers are uncountably infinite and for uncountably infinite languages we can't create a turing machine.

closed as not a real question by competent_tech, Code Magician, Ken White, T.Rob, Graviton Nov 28 '11 at 4:17

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  • Yet any given real number can be specified with countably many digits... – Kerrek SB Nov 28 '11 at 3:12
  • That's the point of confusion.The real numbers can be specified with countably many digits but the set of all real numbers are uncountably infinite.In language of automata,the language corresponding to real numbers is made up of uncountably infinite strings... – bashrc Nov 28 '11 at 3:19
  • But you're never working on all real numbers at once. If you allow a countably long tape (maybe two-ended, trailing off the left for the input and off the right for the output), you could compute the square root of one number I reckon. You wouldn't stop in finitely many steps, but in countably many. – Kerrek SB Nov 28 '11 at 3:21
  • and when would the machine halt (if there is any) for example if the input to the machine is 5(11111 in unary notation)? – bashrc Nov 28 '11 at 3:33
  • At time omega-naught of course :-) – Kerrek SB Nov 28 '11 at 3:36

A real computer is physically impossible.

Unlimited precision real numbers in the physical universe are prohibited by the holographic principle and the Bekenstein bound.

  • That wasn't the question and is besides the point. – Kerrek SB Nov 28 '11 at 3:23

I think the Turing machine can be made if you put some restriction on Precision (i.e. answer up to 4 or 5 decimal place). Then it is possible. Otherwise I feel it can't be made.

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