This presentation explains how to add and subtract linear equations, and how to use that technique to solve linear systems
Source: youtube.com, Colin O'Keefe
(solutions are provided at the bottom)
When approaching the following problems you should look for a way to cancel out one of the variables. Often getting variables to cancel involves multiplying an equation by a constant factor in order to make a coefficient in that equation equal the negative of the coefficient for the same variable in the other equation.
For example, if our two equations are
2x - y = 10
3x + 2y = 14
then we must choose a convenient factor. Notice that in the first equation we have a -y and in the second we have 2y. In this case, multiplying the first equation by 2 will give us a -2y in the first equation and a 2y in the second. Now the y terms will cancel.
4x - 2y = 20 (we multiplied 2 times 2x - y = 10)
3x + 2y = 14
adding these up gives us 7x + 0y = 34.
To recap, you just need to get one of the variables to cancel out. Choose a factor that will make one coefficient in one equation equal to the negative of that same coefficient in the other equation. Now try these exercises, good luck.
1)
-x + y = 10
x - 2y = 12
(hint: just try adding the two together)
2)
3x + 2y = 5
6x - y = 20
(hint: multiply one of the equations by two before combining them)
3)
2x + 5y = 4
3x + 2y = -5
(hint: multiply the top equation by 3 and the bottom equation by -2)
SOLUTIONS
1) (x,y) = (-32,-22)
2) (x,y) = (3,-2)
3) (x,y) = (-3,2)
Source: Colin O'Keefe
