Expand -7/6(3g + 2)
To expand the expression -7/6(3g + 2), we can distribute the -7/6 to each term inside the parentheses.
-7/6(3g + 2) = -7/6 * 3g - 7/6 * 2
Now we can simplify each term:
-7/6 * 3g = -21g/6 = -7g/2
-7/6 * 2 = -14/6 = -7/3
Putting the simplified terms together, we get:
-7g/2 - 7/3
To expand the expression -7/6(3g + 2), you will need to distribute -7/6 to both terms inside the parentheses.
First, distribute -7/6 to 3g:
-7/6 * 3g = -21/6g = -7/2g
Then, distribute -7/6 to 2:
-7/6 * 2 = -14/6 = -7/3
Therefore, the expanded expression is:
-7/2g - 7/3
To expand the expression -7/6(3g + 2), we will apply the distributive property, which states that multiplying a number by a sum is equivalent to multiplying the number by each term in the sum and then combining the results.
First, let's apply the distributive property to the expression: -7/6(3g + 2).
Multiply -7/6 by 3g:
(-7/6) * 3g = -7/2 * g = -7g/2
Multiply -7/6 by 2:
(-7/6) * 2 = -7/3
Putting it all together, the expanded form of -7/6(3g + 2) is:
-7g/2 - 7/3