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Given the following grammar, why is Z said to be not nullable

X -> Y | a
Y -> c | epsilon
Z -> X Y Z | d
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A non-terminal is nullable if an only if it can derive the empty string. It's easy to prove by induction on derivation length that all derivations from Z are non-empty. –  rici Mar 27 at 19:04
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up vote 2 down vote accepted

Because it does not contain epsilon (null). For example, Y is nullable because Y can be defined as epsilon. As is X, because X is defined as either Y or a. If we set Y to epsilon, then X is also epsilon.

Interestingly, if Z were defined as only X Y, then there is the possibility for Z to also be nullable, because X and Y can both be set to epsilon (as above) thus making Z epsilon, but because Z must end in Z, which eventually must end in the terminal d (why?), Z is not nullable.

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