Yes.
Associative property would look like the following: 5 + (3 + 2) = (5 + 3) + 2 = 10
There is no evidence of the associative property in the sequence of number given in the question.
If there is an equals sign between the 3 and 5 of 35, then it is the associative property of multiplication.
The associative power applies to an operation- such as multiplication or addition - not to specific numbers.
False.
Associative property would look like the following: 5 + (3 + 2) = (5 + 3) + 2 = 10
There is no evidence of the associative property in the sequence of number given in the question.
If there is an equals sign between the 3 and 5 of 35, then it is the associative property of multiplication.
The associative property requires that the order of operation can be changed without affecting the final result. This is clearly not the case with subtraction since: (5 - 3) - 2 = 2 - 2 = 0 while 5 - (3 - 2) = 5 - 1 = 4 The two answers are different so subtraction is not associative.
This is an example of the commutative property of multiplication
The associative power applies to an operation- such as multiplication or addition - not to specific numbers.
associative property
False.
True. You may not be able to switch numbers like 4-2=2-4 but you would say 4-2=-2+4 * * * * * That is not the associative property! The associative property requires that the order of operation can be changed without affecting the final result. This is clearly not the case with subtraction since: (5 - 3) - 2 = 2 - 2 = 0 while 5 - (3 - 2) = 5 - 1 = 4
(75/25) / 5 = 3/5 = 0.6 75 / (25/5) = 75/5 = 15
it's actually spelled "associative" property. But associative is like when you have three or more numbers that associate into just one group and anyway that you add or subtract it will always be the same answer: (2 + 5) + 4 = 11 or 2 + (5 + 4) = 11 (9 + 3) + 4 = 16 or 9 + (3 + 4) = 16
The associative property of a binary operator denoted by ~ states that form any three numbers a, b and c, (a ~ b) ~ c = a ~ (b ~ c) and so we can write either as a ~ b ~ c without ambiguity. The associative property of means that you can change the grouping of the expression and still have the same result. Addition and multiplication of numbers are associative, subtraction and division are not.