Expand 5(y + 2) using the distributive property
To expand 5(y + 2) using the distributive property, you need to multiply 5 by each term inside the parentheses.
5(y + 2) = 5 * y + 5 * 2
Simplifying this expression, you get:
5y + 10
To expand 2/5(−5c+10) using the distributive property, you need to multiply 2/5 by each term inside the parentheses.
2/5(−5c+10) = 2/5 * -5c + 2/5 * 10
Simplifying this expression, you get:
-2c + 4
To expand -7/6(3g+2) using the distributive property, you need to multiply -7/6 by each term inside the parentheses.
-7/6(3g+2) = -7/6 * 3g + -7/6 * 2
Simplifying this expression, you get:
-7/2g - 7/3
To expand -5(-3 - 11g) using the distributive property, you need to multiply -5 by each term inside the parentheses.
-5(-3 - 11g) = -5 * -3 - 5 * 11g
Simplifying this expression, you get:
15 + 55g
I apologize for the confusion in my previous response. Here is the correct expansion:
To expand 1/3(q−6) using the Distributive Property, you need to multiply 1/3 by each term inside the parentheses.
1/3(q−6) = 1/3 * q + 1/3 * -6
Simplifying this expression, you get:
1/3q - 2