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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A real computer is physically impossible.

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

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.

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 3:19allreal 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