Use the properties of operations to add 4(g-2)+(g+2)
To simplify the expression 4(g-2)+(g+2), we can use the distributive property to remove the parentheses:
4(g-2) + (g+2) = 4g - 8 + g + 2
Next, we combine the like terms:
4g - 8 + g + 2 = 5g - 6
So, the simplified expression is 5g - 6.
To simplify the expression 4(g-2)+(g+2), we can distribute and combine like terms using the properties of operations.
Step 1: Distribute the 4 to the terms inside the parentheses:
4(g-2) = 4 * g - 4 * 2 = 4g - 8
Step 2: Distribute the 1 to the terms inside the parentheses:
(g+2) = g + 2
Now, our expression becomes: 4g - 8 + g + 2
Step 3: Combine like terms:
To combine like terms, we add the coefficients of the same variables.
4g + g = 5g
-8 + 2 = -6
So, the simplified expression is: 5g - 6.
To simplify the expression 4(g-2) + (g+2), we need to apply the properties of operations.
First, let's distribute the 4 to the terms inside the parentheses (g-2):
4(g-2) = 4g - 8
Now, let's simplify the expression by combining like terms. We have (4g - 8) + (g + 2):
4g - 8 + g + 2
Next, we can group the terms with the variable g together:
(4g + g) + (-8 + 2)
Combining like terms, we get:
5g - 6
Thus, the simplified expression is 5g - 6.