In addition to precedence, you must take operator associativity into account. Binary operations like
- are parsed as left associative. However, assignment
^, and equality
== are right associative. This means the expression
Div (Div a b) c can be written
a / b / c without parentheses, but
Exp (Exp a b) c must be parenthesized as
(a ^ b) ^ c.
Your intuition is correct: for left-associative operators, if the left operand's expression binds less tightly than its parent, it should be parenthesized. If the right operand's expression binds as tightly or less tightly than its parent, it should be parenthesized. So
Div (Div a b) (Div c d) wouldn't require parentheses around the left subexpression, but the right subexpression would:
a / b / (c / d).
Next, unary operators, specifically operators which can either be binary or unary, like negation and subtraction
-, coercion and addition
+, etc might need to be handled on a case-by-case basis. For example
Sub a (Neg b) should be printed as
a - (-b), even though unary negation binds more tightly than subtraction. I guess it depends on your parser,
a - -b may not be ambiguous, just ugly.
I'm not sure how unary operators which can be both prefix and postfix should work. In expressions like
++ (a ++) and
(++ a) ++, one of the operators must bind more tightly than the other, or
++ a ++ would be ambiguous. But I suspect even if parentheses aren't needed in one of those, for the sake of readability, you may want to add parentheses anyway.