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∙ 13y ago
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Can you apply the associative property to subtraction?
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
What is the property that allows you move the parentheses in a problem and still get the same answer?
There is no property which allows you to do that in all cases. It is only possible in the case of the associative property for addition and multiplication. It does not work for subtraction or division.
Does associative property work with subtraction?
no it does not
Does the associative property work with any numbers?
No.
What is the property that allows you to move parentheses in a problem and still get the same answer?
There is no property which allows you to do that in all cases. It is only possible in the case of the associative property for addition and multiplication. It does not work for subtraction or division.
Why does associative property does not work with subtraction?
Associative property does not work with subtraction because not all numbers can be subtracted and have the same results............
What is the associate property?
Associative property states that the change in grouping of three or more addends or factors does not change their sum or product For example, (A + B) + C = A + ( B + C) and so either can be written, unambiguously, as A + B + C. Similarly with multiplication. But neither subtraction nor division are associative.
What does Associative Property not work for which operations?
It does not work with subtraction nor division.
A number sentence that shows why the associative property does not work with subtraction?
because
The Associative Property does not work for which operations?
Subtraction and division. While 2+ (3+4) = 2+ (4+3), the subtraction 2-(3-4) ≠ 2-(4-3). One yields 3 while the other yields 1. Similarly, multiplication has this property while division does not.
Why associative property does not work in geometry?
It works for some operators in arithmetic as it does in geometry, and not with other operators.
Does the multiplication property work when the radicands are rational expressions?
true
