Expand −7/6(3g+2)
To expand (−7/6)(3g+2), we can use the distributive property:
(−7/6)(3g+2) = −7/6 * 3g + (−7/6 * 2)
= −21/6g − 14/6
= -7/2g - 7/3
To expand the expression −7/6(3g+2), we'll distribute the coefficient −7/6 to each term inside the parentheses.
First, we distribute the −7/6 to the term 3g:
−7/6 * 3g = (-7/6) * (3g) = -21g/6 = -7g/2
Next, we distribute −7/6 to the term 2:
−7/6 * 2 = (-7/6) * (2) = -14/6 = -7/3
Putting it all together, the expanded form of −7/6(3g+2) is:
-7/2g - 7/3
To expand the expression −7/6(3g+2), we can distribute the −7/6 to both terms inside the parentheses.
First, let's distribute it to 3g:
(−7/6) * 3g = −21/6 * g = −7/2 * g = (−7g)/2
Now, let's distribute it to 2:
(−7/6) * 2 = −14/6 = −7/3
Therefore, the expanded form of −7/6(3g+2) is: (−7g)/2 − 7/3.