How do you solve #-5( v + 2) + 3v + 6= 8v + 9#?

1 Answer
Feb 18, 2018

See a solution process below:

Explanation:

First, expand the terms in parenthesis by multiplying each term within the parenthesis by the term outside the parenthesis:

#color(red)(-5)(v + 2) + 3v + 6 = 8v + 9#

#(color(red)(-5) xx v) + (color(red)(-5) xx 2) + 3v + 6 = 8v + 9#

#-5v + (-10) + 3v + 6 = 8v + 9#

#-5v - 10 + 3v + 6 = 8v + 9#

Next, group and combine like terms on the left side of the equation:

#-5v + 3v - 10 + 6 = 8v + 9#

#(-5 + 3)v - 4 = 8v + 9#

#-2v - 4 = 8v + 9#

Then, add #color(red)(2v)# and subtract #color(blue)(9)# from each side of the equation to isolate the #v# term while keeping the equation balanced:

#-2v + color(red)(2v) - 4 - color(blue)(9) = 8v + color(red)(2v) + 9 - color(blue)(9)#

#0 - 13 = (8 + color(red)(2))v + 0#

#-13 = 10v#

Now, divide each side of the equation by #color(red)(10)# to solve for #v# while keeping the equation balanced:

#-13/color(red)(10) = (10v)/color(red)(10)#

#-13/color(red)(10) = (color(red)(cancel(color(black)(10)))v)/cancel(color(red)(10))#

#-13/color(red)(10) = v#

#v = -13/color(red)(10)#

Or

#v = -1.3#