Expand 74(8h+3)
To expand 74(8h+3), we use the distributive property, which states that for any three numbers a, b, and c, a(b + c) = ab + ac.
So, applying the distributive property, we have:
74(8h + 3) = 74 * 8h + 74 * 3
= 592h + 222
So, the expanded form of 74(8h+3) is 592h + 222.
Expand 7/4(8h+3)
To expand 7/4(8h+3), we use the distributive property, which states that for any two numbers a and b and a third number c, a(b + c) = ab + ac.
So, applying the distributive property, we have:
7/4(8h + 3) = (7/4) * 8h + (7/4) * 3
To simplify further, we can multiply each term separately:
= (7/4) * (8h) + (7/4) * (3)
= (7 * 8h) / 4 + (7 * 3) / 4
= 56h / 4 + 21 / 4
Now, we can combine like terms by adding the numerators:
= (56h + 21) / 4
So, the expanded form of 7/4(8h+3) is (56h + 21) / 4.
To expand the expression 74(8h+3), we need to distribute the 74 to both terms inside the brackets.
Using the distributive property, we can multiply each term inside the brackets by 74.
This gives us:
74 * 8h + 74 * 3
Multiplying each term gives us:
592h + 222
Therefore, the expanded expression is 592h + 222.
To expand the expression 74(8h+3), we need to distribute the 74 to each term inside the parentheses. This can be done using the distributive property.
To apply the distributive property, we multiply 74 by both 8h and 3 separately and then combine the results.
So, let's break down the problem:
74 * 8h = 592h
74 * 3 = 222
Now, we combine the results:
592h + 222
Therefore, the expanded form of 74(8h+3) is 592h + 222.