The Associative Property of Addition/Multiplication states that the order that an expression's addends/factors are grouped does not change the value of its sum/product.
Numerical Example(s):
(1+6)+7=1+(6+7)
(37x94)x68=37x(94x68)
Algebraic Example(s):
(a+b)+c=a+(b+c)
(xy)z=x(yz)
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Properties of Addition and Multiplication
Non-FictionThis is a list of the few basic fundamental properties of both addition and multiplication. For each property in this book, I will be giving its definition along with examples of the property itself in action both numerically and algebraically. I...
