# Prove that all non-recursive languages are infinite [closed]

I am wondering this statement above [the title] is true or not.

I've read this Are all infinite languages undecidable?

which says:

If a Language is undecidable(non-recursive), there must be some strings make the TM fail to halt.SO IT MUST HAVE INFINITE OF THEM WHICH MAKE THE TM FAILS TO HALT.

How could this prove my statement[title]? Can anyone explain it to me a bit more clearly?

Thanks

ps. sorry for the confusion. Yes TM means Turing machine. And too be clear My question is : Does ALL non-recursive languages are Infinite?

## closed as off-topic by Ken White, templatetypedef, Robert HarveyNov 20 '13 at 19:31

• This question does not appear to be about programming within the scope defined in the help center.
If this question can be reworded to fit the rules in the help center, please edit the question.

• You seem to have a number of different concepts here. Are you wondering if `non-recursive == infinite` or `non-recursive == undecidable` or `infinite == undecidable` or something else entirely? Also, don't use abbreviations that people are unlikely to understand (although I'm guessing "TM" means "Turing Machine", based on the questions domain, at least). – twalberg Nov 20 '13 at 17:09
• sorry for the confusion. Yes TM means Turing machine. And too be clear My question is : Does ALL non-recursive languages are Infinite? @twalberg – geasssos Nov 20 '13 at 17:19
• Consider a language with an alphabet consisting of a single character (called A), and a single production "P -> A". The language accepts a single input, namely A, and is definitely non-recursive, and definitely non-infinite. So, no, not all non-recursive languages are infinite... – twalberg Nov 20 '13 at 17:23
• This question appears to be off-topic because it is about computability theory, which is more appropriate at cs.stackexchange.com. – templatetypedef Nov 20 '13 at 18:18