Expand 74(8h+3) .(1 point)
To expand 74(8h+3), we need to multiply 74 by each term inside the parentheses.
First, let's distribute 74 to 8h:
74 * 8h = 592h
Next, let's distribute 74 to 3:
74 * 3 = 222
Therefore, the expanded form of 74(8h+3) is:
592h + 222
To expand the expression 74(8h+3), we can use the distributive property.
First, distribute 74 to both terms inside the parentheses:
74 * 8h = 592h
74 * 3 = 222
So, the expanded form of 74(8h+3) is:
592h + 222
To expand the expression 74(8h+3), you can use the distributive property. The distributive property states that when you have a number multiplied by a sum or difference in parentheses, you can distribute the number to every term inside the parentheses.
In this case, you have 74 multiplied by the expression (8h+3). To expand it, you need to multiply 74 by each term inside the parentheses separately.
First, distribute 74 to the first term, which is 8h:
74 * 8h = 592h
Next, distribute 74 to the second term, which is 3:
74 * 3 = 222
So, expanding 74(8h+3) gives you:
592h + 222