Question: Which is true about the complement of a CFL may or may not be a CFL ? Group of answer choices This statement has

Which is true about "the complement of a CFL may or may not be a CFL"?
Group of answer choices
This statement has been proved by providing some examples.
This statement has been proved by providing mathematical inductions.
This statement cannot be proved because of lack of funding.
This statement cannot be proved, because we cannot find smart enough people to do it.

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