how would you rewrite (w+8) +(-5) using associative property
To rewrite the expression (w+8) + (-5) using the associative property, we need to group the terms differently. Since addition is associative, we can group the first two terms together first:
(w + 8) + (-5) = w + (8 + (-5))
Now we can simplify the expression within the parentheses:
w + (8 + (-5)) = w + 3
Therefore, using the associative property, we can rewrite the expression (w+8) + (-5) as w + 3.
To rewrite (w+8) + (-5) using the associative property, we can change the grouping of the expression. The associative property states that the grouping of numbers does not affect the result of addition or multiplication.
Step 1: Let's rewrite the expression by changing the grouping:
[(w + 8) + (-5)]
Step 2: Using the associative property of addition, we can group the terms differently:
[w + (8 + (-5))]
Step 3: Simplify the inner group:
[w + 3]
So, the expression (w+8) + (-5) can be rewritten as w + 3 using the associative property.
To rewrite the expression (w + 8) + (-5) using the associative property, we need to group the terms differently without changing their order.
The associative property states that for addition, changing the grouping of terms does not change the result. So, we can group the terms (w + 8) and (-5) in different ways while keeping the order of the terms intact.
Let's group (w + 8) and (-5) in two different ways:
Option 1: ((w + 8) + (-5))
Option 2: (w + (8 + (-5)))
Now, let's simplify both options to see if they give the same result:
Option 1: ((w + 8) + (-5))
Combine the terms inside the first parentheses:
= (w + (8 + (-5)))
Combine the terms inside the second parentheses:
= (w + 3)
Option 2: (w + (8 + (-5)))
Combine the terms inside the second parentheses:
= (w + 3)
As we can see, both options simplify to the expression (w + 3) using the associative property.
Therefore, to rewrite the expression (w + 8) + (-5) using the associative property, we can write it as (w + 3).