16x6 cannot have the associative property. The associative property requires two [identical] operations, applied to 3 variables. There are not enough operations nor variables/numbers in the question.
The associative property is the property that a * (b * c) = (a * b) * c for any binary operation *. Addition and multiplication are associative, but these are definitely not the only two operations that obey this property.
It does not work with subtraction nor division.
there is not division for the associative property
No it is not an associative property.
16x6 cannot have the associative property. The associative property requires two [identical] operations, applied to 3 variables. There are not enough operations nor variables/numbers in the question.
No because the associative property can be found in other operations as well.
The associative property is the property that a * (b * c) = (a * b) * c for any binary operation *. Addition and multiplication are associative, but these are definitely not the only two operations that obey this property.
That would be the associative property. The associative property applies to addition and multiplication, but not to subtraction or division.
The associative power applies to an operation- such as multiplication or addition - not to specific numbers.
The common operations of arithmetic for which it holds are addition and multiplication.
Commutatitive property: a + b = b + a Associative property: (a + b) + c = a + (b + c) Although illustrated above for addition, it also applies to multiplication. But not subtraction or division!
It does not work with subtraction nor division.
It is a result of the associative property of numbers.It is a result of the associative property of numbers.It is a result of the associative property of numbers.It is a result of the associative property of numbers.
No, the associative property only applies to addition and multiplication, not subtraction or division. Here is an example which shows why it cannot work with subtraction: (6-4)-2=0 6-(4-2)=4
there is not division for the associative property
It is the property of operations such as addition or multiplication which state that the order in which the operations are carried out does not affect the result. That is, (A + B) + C = A + (B + C) and so, without ambiguity, you can write these as A + B + C.