expand 7/19(5d+6)
To expand the expression 7/19(5d+6), we have to distribute the 7/19 to both terms inside the parentheses.
So, multiplying 7/19 by 5d gives us (7/19)(5d) = (35d)/19.
And multiplying 7/19 by 6 gives us (7/19)(6) = (42)/19.
Therefore, the expanded form of 7/19(5d+6) is (35d)/19 + (42)/19.
To expand the expression 7/19(5d + 6), we will apply the distributive property.
Step 1: Distribute 7/19 to both terms inside the parentheses.
(7/19) * 5d + (7/19) * 6
Step 2: Simplify the multiplication.
(35d/19) + (42/19)
Therefore, the expanded expression is (35d/19) + (42/19).
To expand the expression 7/19(5d+6), you need to distribute the fraction 7/19 to each term inside the parentheses.
First, distribute the fraction to the term 5d:
(7/19) * 5d = (7 * 5d) / 19 = (35d) / 19
Next, distribute the fraction to the term 6:
(7/19) * 6 = (7 * 6) / 19 = 42/19
Putting it all together, the expanded expression is:
(35d) / 19 + 42/19
In simplified form, the expanded expression is:
(35d + 42) / 19