In math, operators bound to the Associative Property are Addition and Multiplication.
For example:
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.
No because the associative property can be found in other operations as well.
+,x
Division (and subtraction, for that matter) is not associative. Here is an example to show that it is not associative: (8/4)/2 = 2/2 = 1 8/(4/2) = 8/2 = 4 Addition and multiplication are the only two arithmetic operations that have the associative property.
Of the five common operations addition, subtraction, multiplication, division, and power, both addition and multiplication are commutative, as well as associative. The other operations are neither.
Associative means that two things are related in a way that they are similar even though they appear different. This includes things such as Math as well as real world properties.
The common operations of arithmetic for which it holds are addition and multiplication.
when you are only adding or multiplying.
Like Associative property
The associative property of math refers to grouping. This property states that you can group numbers (move the parenthesis) anyway and the result will remain the same.
The associative law means that, for certain operations, if the operation is repeated several times it doesn't matter whether you start from the left or from the right. More formally (in the case of addition): (a + b) + c = a + (b + c) Example with numbers: (1 + 2) + 3 = 1 + (2 + 3) Note that the parentheses specify the order of operations. Numbers within parentheses should be added first. The associative law also applies to multiplication of real numbers, and to some other operations in advanced math.