# Logical operators priority with NAND, NOR, XNOR

I've searched the web but I've found no solution to this problem.

What is the logical priority for operators `NAND`, `NOR` and `XNOR`?

I mean, considering as example the expression

``````A AND B NAND C
``````

which operator should be evaluated first?
Obviously `NAND` can be translated as `NOT-AND` (as `NOR` is `NOT-OR` and `XNOR` is `NOT-XOR`), but

``````(A AND B) NAND C != A AND (B NAND C) = A AND NOT(B AND C)
``````

According to my researches there's no a defined priority for such an expression, so I think the simplest solution is to evaluate the operators according to the order they appear in the expression, but I may be wrong.

Any suggestions?

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This actually depends on your precedence rules. If there is no order (no precedence rules or everything of the same importance), it should be solved left to right. Here is an example with C++.

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If the expression is written like the way it is mentioned in the question(without brackets in between), it should be solved in the order they are written. Thats the only correct way to do this. eg. If its written line `A NOR B XOR C`, It simply means `(A NOR B) XOR C`

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operator precedence have to be defined by a language, and what you have here doesn't seem to be a formal language, in such cases it's often assumed to be evaluated as you read from left to right.

Though, you could use the same operator precedence as verilog , or look at wikipedia which has a small table precedence commonly used for logic operators

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Boolean operators have analogues in conventional arithmetic, so one way of deciding what the precedence rules should be is to follow the rules for conventional arithmetic, e.g. `AND` is analogous to multiplication, while `OR` is analogous to addition, hence `AND` should have higher precedence than `OR`. If you look at the operator precedence table for a language such as C or C++ you will see that this is indeed the case in these and other related languages.