-7/6(3g+2) simply to fraction
To simplify the expression -7/6(3g+2) as a fraction, we can distribute the -7/6 to the terms inside the parentheses. This gives us:
-7/6 * 3g + (-7/6) * 2
Multiplying fractions is done by multiplying the numerators together and the denominators together. So, we have:
(-7/6) * (3g) + (-7/6) * 2
= (-7 * 3g) / (6 * 1) + (-7 * 2) / 6
= -21g / 6 - 14 / 6
Now, we can rewrite these fractions with a common denominator of 6:
-21g / 6 - 14 / 6
= (-21g - 14) / 6
Thus, the simplified expression is (-21g - 14) / 6.
To simplify the expression -7/6(3g+2) to a single fraction, we can distribute the -7/6 to each term inside the parentheses.
-7/6(3g+2)
= (-7/6)(3g) + (-7/6)(2)
= -21g/6 - 14/6
Now, we can combine the two fractions by finding a common denominator, which is 6.
= (-21g - 14)/6
Therefore, the simplified expression is (-21g - 14)/6.
To simplify the expression -7/6(3g+2), we can start by distributing the -7/6 to the terms inside the parentheses.
-7/6 * 3g = (-7/6) * 3g = -21g/6g = -7g/2
-7/6 * 2 = (-7/6) * 2 = -14/6 = -7/3
So, the expression simplifies to: -7g/2 - 7/3.
To combine these two fractions, we need a common denominator. The common denominator of 2 and 3 is 6.
Now, we rewrite -7g/2 - 7/3 with the common denominator of 6:
(-7g/2)(3/3) - (7/3)(2/2) = -21g/6 - 14/6
Since the denominators are the same, we can combine the numerators:
-21g - 14 / 6
This gives us the simplified fraction: (-21g - 14) / 6.