7/10(5d+6) Expand
To expand the expression 7/10(5d+6), distribute the 7/10 to each term within the parentheses:
= 7/10 * 5d + 7/10 * 6
Simplify each term:
= 35/10 * d + 42/10
Combine like terms:
= (35d + 42)/10
So the expanded form of 7/10(5d+6) is (35d + 42)/10.
To expand the expression 7/10(5d+6), you need to distribute the 7/10 to both terms inside the parentheses.
First, distribute 7/10 to 5d:
(7/10)(5d) = (7/10)(5)(d) = 35/10d or 7/2d
Next, distribute 7/10 to 6:
(7/10)(6) = (7/10)(6/1) = 42/10 or 21/5
Putting it all together, the expanded expression becomes:
7/2d + 21/5
To expand the expression 7/10(5d + 6), we need to distribute the 7/10 to both terms inside the parentheses.
First, let's distribute the 7/10 to the term 5d:
7/10 * 5d = (7 * 5d) / 10 = 35d/10 = 3.5d
Next, let's distribute the 7/10 to the term 6:
7/10 * 6 = (7 * 6) / 10 = 42/10 = 4.2
So, the expanded expression would be:
3.5d + 4.2