expand 8(3p) + 8(2)
To expand the expression 8(3p) + 8(2), we can distribute the 8 to both terms within each set of parentheses.
So for the first term, 8(3p), we multiply 8 with each term inside the parentheses, which gives us:
8 * 3p = 24p
For the second term, 8(2), we multiply 8 with 2:
8 * 2 = 16
Thus, the expanded form of 8(3p) + 8(2) is 24p + 16.
To expand the expression 8(3p) + 8(2), we can distribute the numbers outside the parentheses to the terms inside. Let's break it down step by step:
Step 1: Distribute 8 to 3p and 2
8 * 3p = 24p
8 * 2 = 16
Step 2: Combine the results
24p + 16
So, the expanded form of 8(3p) + 8(2) is 24p + 16.
To expand the expression 8(3p) + 8(2), we will apply the distributive property.
First, let's distribute 8 to each term inside the parentheses:
8(3p) = 8 * 3p = 24p
8(2) = 8 * 2 = 16
Now we can combine the two terms:
24p + 16
So, the expanded form of 8(3p) + 8(2) is 24p + 16.