# Can someone verify whether the following FIRST and FOLLOW sets are correct?

I am doing an exercise to create FIRST and FOLLOW sets for a grammar. I think what I did is correct but the answer is slightly different from mine. So need help from someone to verify this. Thank you. The grammar is :

``````    P -> L
L -> I X
X -> ; L | EPSILON
I -> A | C | W
A -> id := E
C -> if E then L O endif
O -> else L | EPSILON
W -> while E do L end
E -> E2 R
R -> Op1 E2 R | EPSILON
E2 -> T S
S -> Op2 E2 | EPSILON
T -> c | id
Op1 -> < | = | !=
Op2 -> + | -
``````

EPSILON is the real 'epsilon' And here is my answer the FIRST set for X:

``````    FIRST(; L) = {;}
FOLLOW(X) = {\$, else, end, endif}
``````

``````    FIRST(; L) = {;}
FOLLOW(X) = {\$, else, end, endif, then}
``````

I don't see how `then` could be in `FOLLOW(X)`. I get the same answer as you do.
The only thing that can precede `then` in that grammar is an `E` and `E` cannot end with `L`. Furthermore, `FOLLOW(E)` includes `do` as well as `then`, so if a followset includes `FOLLOW(E)` it would have to include both of those tokens.