Is this a consequence of the hierarchical order of operators in Python?
not(True) * True
# False
True * not(True)
# SyntaxError: invalid syntax
Is this a consequence of the hierarchical order of operators in Python?
Yes (although the usual term is operator precedence). Summing up and simplifying:
not
isn't a function; it's an operator. Therefore, we don't need to write parentheses for not (True)
, and in fact they don't do anything here. All that happens is that the parentheses are treated as ordinary grouping parentheses - (True)
is evaluated before anything else, becoming True
. So, let's consider the examples without the parentheses.
not True * True
means not (True * True)
. It does not mean (not True) * True
, due to operator precedence. This is by design:
>>> not 1 * 0
True
>>> not (1 * 0)
True
>>> (not 1) * 0
0
It would, the developers figured, be unexpected to write something like not 1 * 0
and get an integer result, and unexpected to write not
in front of a mathematical operation and have the not
only apply to the first thing in that expression.
Because of that same operator precedence, True * not True
is a syntax error. Python parses the not
by itself as the right-hand side of the *
, because it hasn't yet worked out to put not True
together. True * not
is obviously nonsense. Or, another way of looking at it: "not
followed by an expression" isn't in the list of "things that can be an operand for *
".
This is perhaps surprising because the other commonly used unary operator, -
(i.e., unary negation), doesn't have this issue. But that's because the precedence is the other way around: unary negation is processed before multiplication, not after.
The same is true for and
and or
combinations:
>>> 3 * 5 and 1 # 3 * 5 is evaluated first
1
>>> 3 * (5 and 1)
3
>>> 3 or 1 * 5 # 1 * 5 is evaluated first, even though it comes later
3
>>> (3 or 1) * 5
15
a + b + c * d
, a + b
is evaluated before c * d
, as you can see by overloading the operators.
Aug 11, 2022 at 23:42
True * not True
isn't "because it hasn't had a chance to apply not True
yet". (The ""not
followed by an expression" isn't in the list of "things that can be an operand for *
"" part is correct.)
Aug 11, 2022 at 23:42
This is a matter of precedence, and how precedence is implemented.
*
has a higher precedence than not
, and the way that works in the Python grammar is that there's a hierarchy of expression types, structured so that higher-precedence operators can be the "root" operator of an argument to a lower-precedence operator, but not the other way around.
For example, the grammar rule for multiplicative expressions is
term[expr_ty]:
| a=term '*' b=factor { _PyAST_BinOp(a, Mult, b, EXTRA) }
| a=term '/' b=factor { _PyAST_BinOp(a, Div, b, EXTRA) }
| a=term '//' b=factor { _PyAST_BinOp(a, FloorDiv, b, EXTRA) }
| a=term '%' b=factor { _PyAST_BinOp(a, Mod, b, EXTRA) }
| a=term '@' b=factor { CHECK_VERSION(expr_ty, 5, "The '@' operator is", _PyAST_BinOp(a, MatMult, b, EXTRA)) }
| factor
term
is the grammar rule for multiplicative expressions. The first 5 options in this rule consist of a multiplicative-precedence operator in the middle, another term
on the left of the operator, and a factor
on the right, where factor
is the rule for the next higher-precedence operator class. The 6th option is just a factor
.
Structuring the grammar like this makes sure the parsed syntax tree always matches the structure given by operator precedence, but it also means that lower-precedence operators cannot be the "root" operator of an argument to a higher-precedence operator, even when the expression would seem unambiguous. There's just no grammar rule that would allow a not
expression as an argument to a *
expression.
(The grammar rules for most expressions follow the above structure, but there are exceptions. For example, the grammar rules for parentheses don't follow the "no lower-precedence operators within higher-precedence expressions" structure, which is why you can write things like 3 * (4 + 5)
. Exponentiation is another exception - **
binds tighter than a unary +
/-
/~
on the left, but not on the right, so the rules for **
and unary +
/-
/~
don't follow a clear precedence hierarchy.)
+x
, -x
, ~x
) have lower precedence than exponentiation **
-- so a similar effect should be seen here: 42 ** ~ 2
But this expression does work. So I smell another special case :-)
**
. There's even a footnote under the precedence table pointing out how **
sort of has different precedence on each side. In the grammar, you can see that this is implemented by having power
take a factor
instead of a power
on the RHS. (factor
is the rule for unary +
/-
/~
.)
Aug 11, 2022 at 17:47
(not True) * True
and the second should beTrue * (not True)
. In your second line, you're multiplyingTrue
andnot
, which is a syntax error.not
is not a function, so you don't use parens after it.True * not True
produces the same syntax error.