In any programming language textbooks, we are always told how each operator in that language has either left or right associativity. It seems that associativity is a fundamental property of any operator regardless of the number of operands it takes. It also seems to me that we can assign any associativity to any operator regardless of how we assign associativity to other operators.
But why is it the case? Perhaps an example is better. Suppose I want to design a hypothetical programming language. Is it valid to assign associativity to these operators in this arbitrary way (all having the same precedence):
unary operator: ! right associative binary operators: + left associative - right associative * left associative / right associative
! + - * / are my 5 operators all having the same precedence.
If yes, how would an expression like 2+2!3+5*6/3-5!3!3-3*2 is parenthesized by my hypothetical parser? And why.
The first example (2+2!3+5*6/3-5!3!3-3*2) is incorrect. Perhaps forget about the unary op and let me put it this way, can we assign operators having the same precedence different associativity like the way I did above? If yes how would an example,say 2+3-4*5/3+2 be evaluated? Because most programming language seems to assign the same associativity to the operators having the same precedence. But we always talk about OPERATOR ASSOCIATIVITY as if it is a property of an individual operator - not a property of a precedence level.