How do you solve the system of equations #5x + 5y = 15# and #4x + 6y = 10#?

1 Answer
JĂșlio B.
Dec 31, 2015

Solution set: #S = {4,-1}#

Explanation:

Its way more easy to simplify the system before work with, so:
#5x + 5y = 15# becomes # x+y =3# and
#4x+6y = 10# becomes # 2x+3y=5#. Now, we isolate one term in the first equation: #x = 3-y# and put it in the second one:
#2(3-y) +3y = 5#, and the walk-through for solve it:
#-2y + 6 + 3y = 5#
#y = -1#
#y = -1#. With #y#'s value, now we go back to the first equation, as we left it, and solve it: #x = 3 -(-1) = 4#.
So, the solution set is: #S = {4,-1}#

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