Expand 74(8h+3) .(1 point)
To expand 74(8h+3), we multiply each term inside the parentheses by 74:
74 * 8h + 74 * 3
This simplifies to:
592h + 222.
To expand the expression 74(8h + 3), follow the distributive property by multiplying each term inside the parentheses by the number outside the parentheses:
74(8h + 3) = 74 * 8h + 74 * 3
Now we can simplify each multiplication:
74 * 8h = 592h
74 * 3 = 222
Putting it all together, the expanded expression is:
74(8h + 3) = 592h + 222
To expand the expression 74(8h + 3), you need to apply the distributive property, which states that multiplying a number by a sum or difference is the same as multiplying the number by each term in the sum or difference separately and then adding (or subtracting) the results.
So, let's expand the expression step by step:
74(8h + 3)
= 74 * 8h + 74 * 3
Multiply 74 by each term inside the parentheses:
= 592h + 222
That's the expanded form of the expression 74(8h + 3). It simplifies to 592h + 222.