282 Larger Linear Systems
Get the equations into form
Now that we’ve chosen the variable to eliminate, we must get all three equations into the same
form. The following form is as good as any:ax+by+cz=dwhere a, b, c, and d are constants. The first equation is already in this form. The second
equation is2 x− 5 y=z− 1Subtracting z from each side will put it into the form we want:2 x− 5 y−z=− 1The third equation is3 x=− 6 y+ 7 zAdding 6y to each side, we get3 x+ 6 y= 7 zWe can subtract 7z from each side and it comes into the sought-after form:3 x+ 6 y− 7 z= 0We now have the three-by-three system in this uniform condition:− 4 x+ 2 y− 3 z= 52 x− 5 y−z=− 13 x+ 6 y− 7 z= 0Make z vanish once
Here are the first two revised equations again, for reference:− 4 x+ 2 y− 3 z= 5and2 x− 5 y−z=− 1