Use the distributive property to expand 3/8 (-8 -2y)
To expand the expression 3/8 (-8 - 2y) using the distributive property, we need to distribute the 3/8 to both terms inside the parentheses.
First, we distribute the 3/8 to -8:
(3/8) * -8 = -24/8 = -3
Next, we distribute the 3/8 to -2y:
(3/8) * -2y = -6y/8 = -3y/4
Therefore, the expanded expression is -3 - 3y/4.
To expand the expression 3/8 (-8 - 2y) using the distributive property, we will multiply 3/8 by -8 and then by -2y separately:
Step 1: Multiply 3/8 by -8:
(3/8) * -8 = -24/8
Step 2: Multiply 3/8 by -2y:
(3/8) * -2y = -6y/8
Therefore, the expanded expression is:
-24/8 - 6y/8
Simplifying this expression, we can combine the two terms:
(-24 - 6y)/8
Thus, the expanded form of 3/8 (-8 - 2y) using the distributive property is (-24 - 6y)/8.
To use the distributive property to expand the expression 3/8 (-8 - 2y), we need to distribute the 3/8 to both terms inside the parentheses.
First, distribute 3/8 to -8:
(3/8) * (-8) = -24/8 = -3
Next, distribute 3/8 to -2y:
(3/8) * (-2y) = -6y/8 = -3y/4
Therefore, expanding 3/8 (-8 - 2y) using the distributive property gives us:
-3 - (3y/4)