Expand 1/3(q-6) using the Distributive Propety.
To expand 1/3(q-6) using the Distributive Property, we need to distribute the 1/3 to both terms inside the parentheses:
1/3(q-6) = 1/3 * q - 1/3 * 6
Now, when we multiply 1/3 by q and 6 respectively, we get:
= q/3 - 6/3
Simplifying, we have:
= q/3 - 2
To expand 1/3(q-6) using the distributive property, we will distribute 1/3 to both terms inside the parentheses.
First, distribute 1/3 to q: (1/3)*q = q/3
Next, distribute 1/3 to -6: (1/3)*(-6) = -6/3 = -2
Therefore, 1/3(q-6) expands to q/3 - 2.
To expand 1/3(q-6) using the Distributive Property, you need to multiply every term inside the parentheses by the coefficient outside the parentheses, which in this case is 1/3.
Step 1: Distribute 1/3 to q:
(1/3) * q = q/3
Step 2: Distribute 1/3 to -6:
(1/3) * (-6) = -6/3 = -2
So, by applying the Distributive Property, 1/3(q-6) can be expanded to:
(q/3) - 2
Therefore, 1/3(q-6) = (q/3) - 2.