How do you solve #2(3g+2)=1/2(12g+8)#?

1 Answer
Shantelle
Apr 6, 2018

Infinitely many solutions, or #(-oo, oo)#, or all real numbers

Explanation:

#2(3g+2) = 1/2(12g+8)#

First, multiply both sides by #2#:
#4(3g+2) = 12g + 8#

Now, let's expand and distribute (multiply) the #4# to everything in the parenthesis:
#4 * 3g = 12g#

#4 * 2 = 8#

So when we combine it we get:
#12g + 8#

Let's put that back into the equation:
#12g + 8 = 12g + 8#

As you can see, both sides of the equation are the same. When this happens, that means that there are infinitely many solutions, or #(-oo, oo)#, or all real numbers . Any "real" numbers or non-imaginary will fulfill the solution.

Hope this helps!

Related questions
See all questions in Equations with Variables on Both Sides
Impact of this question
2098 views around the world
You can reuse this answer
Creative Commons License