Hot answers tagged context-free-grammar
It means that L is the language of strings w consisting of symbols 'a', 'b'' and 'c', where the length of the string w equals to 3 times the number of symbol 'a' present in the string w. The productions for this grammars should be such that if it add one 'a' then it also adds two 'b', or two 'c', or one 'b'; one 'c'. Check below grammar: S → ^ | ...
You can do the following boolexp --> boolexp NAND boolterm boolexp --> boolterm boolterm --> (boolexp) boolterm --> True | False In case of a NAND b NAND c you get the only derivation boolexp(a NAND b) NAND boolterm(c)
I your first grammar, You can derive epsilon from S. So the empty word belong to the described language. Therefore you must have a epsilon in the second equivalent grammar. Now in a normal form grammar, when there is a derivation S -> epsilon, then S can't appear on the right of a derivation. So the rule S -> BSA | SA | epsilon is not allowed is a ...
Only top voted, non community-wiki answers of a minimum length are eligible