Expand 74(8h+3) .(1 point)
To expand 74(8h+3), you can use the distributive property, which states that a(b+c) = ab + ac.
So, applying the distributive property to 74(8h+3), we get:
74(8h+3) = 74 * 8h + 74 * 3
Now, simplify each term:
74 * 8h = 592h
74 * 3 = 222
Therefore, the expanded form of 74(8h+3) is 592h + 222.
To expand the expression 74(8h+3), we need to multiply 74 by each term inside the parentheses:
Step 1: Multiply 74 by 8h:
74 * 8h = 592h
Step 2: Multiply 74 by 3:
74 * 3 = 222
So when we expand 74(8h+3), we get:
592h + 222
To expand the expression 74(8h+3), you need to distribute the 74 to each term inside the parentheses. Here's how you can do it step by step:
1. Start by multiplying 74 with the first term inside the parentheses, which is 8h:
74 * 8h = 592h
2. Next, multiply 74 with the second term inside the parentheses, which is 3:
74 * 3 = 222
Now, you have the expanded form of the expression 74(8h+3), which is 592h + 222.