How do you solve the system of equations #3x + 6y = 6# and #- 3x - 2y = - 14#?

1 Answer
Nov 4, 2016

#y = -2# and #x = 6#

Explanation:

Solve the first equation #3x + 6y = 6# for #x# while keeping the equation balanced:

#3x + 6y - 6y = 6 - 6y#

#3x = 6 - 6y#

#(3x)/3 = (6 - 6y)/3#

#x = 6/3 - (6y)/3#

#x = 2 - 2y#

Substitute #2 - 2y# for #x# in the second equation and solve for #y# while keeping the equation balanced:

#-3(2 - 2y) - 2y = -14#

#-6 + 6y - 2y = -14#

#-6 + 4y = -14#

#6 - 6 + 4y = 6 - 14#

#4y = -8#

#(4y)/4 = -8/4#

#y = -2#

Now that #y# is know substitute #-2# for #y# in the first equation and solve for #x# while keeping the equation balanced:

#3x + 6(-2) = 6#

#3x - 12 = 6#

#3x - 12 + 12 = 6 + 12#

#3x = 18#

#(3x)/3 = 18/3#

#x = 6#