# First & Follow set for Arithmetic Expressions

I want to know if my FIRST and FOLLOW set I made for this grammar is correct or not

``````S -> TS'
S' -> +TS' | -TS' | epsilon
T -> UT'
T' -> *UT' | /UT' | epsilon
U -> VX
X -> ^U | epsilon
V -> (W) | -W | W | epsilon
W -> S | number
``````

``````FIRST(S) = FIRST(T) = FIRST(U) = FIRST(V) = FIRST(W) = { ( , - , + , number ,     epsilon }
FIRST(T') = { *, / , epsilon}
FIRST(S') = { + , - , epsilon}
FIRST(X) = { ^ , epsilon}

FOLLOW(S) = FOLLOW(S') = FOLLOW(V) = {\$}
FOLLOW(T) = {+ , - , \$ }
FOLLOW(T')= {+, - , \$ }
FOLLOW(U) = FOLLOW(X) = { * , / , + , - ,\$ }
FOLLOW(W) = { ) , \$ }
``````
-

## 1 Answer

Just a remark:

You said:

``````FIRST(U) = FIRST(V)
``````

Which is correct, but, V can be epsilon which means FIRST(U) = FIRST(V) + FIRST(X)

And X can be epsilon to.

Those epsilons can be quite frustrating sometimes.

There is a little more to say. Just a few rules: - Capitals are nonterminal - lowercase are terminals - epsilon is used for an empty rule - \$ is used to note the end of the input.

• First(a) = {a}
• First(A,B) = First(A), if epsilon is not in First(A)
• First(A,B) = First(A) + First(B), if epsilon in First(A)
• First(A|B) = First(A) + First(B)

• Follow(T) includes \$ if T is the start symbol

• Follow(T) includes First(A) if there is a rule with ..TA..
• Follow(T) includes Follow(A) if there is a rule A -> ..T
• Follow(T) includes Follow(A) if there is a rule A -> ..TB and B can be epsilon
• Follow(T) never includes epsilon

Example:

``````E  = TE'
E' = +TE'|epsilon
T  = FT'
T' = *FT' | epsilon
F = (E) | id

First(E)   = First(T) = First(F) = {(, id}
First(E')  = {+, epsilon}
First(T)   = First(F) = {(, id}
First(T')  = {*, epsilon}
First(F)   = {(, id}

Follow(E)  = {\$, )}
Follow(E') = Follow(E) = {\$, )}
Follow(T)  = First(E') + Follow(E') = {\$, ), +}
Follow(T') = Follow(T) = {\$, ), +}
Follow(F)  = First(T') + Follow(T') + Follow(T) = {*, \$, ), +}
``````

Your grammar is much more complex and a bit weird (are you sure there are no mistakes in the grammar?) but you can follow the rules.

-
there are problems with the grammar ( only have I found it after constructing the first and follow sets ) –  Tasbeer Mar 14 '09 at 21:19