For this case we have the following system of equations:
[tex]2x + 3y + 2z = 26
-x + 7y-z = 21
3x + 2y-5z = 13[/tex]
From equation 2 we can clear z:
[tex]z = -x + 7y-21
[/tex]
We substitute the values of z in equations 1 and 3:
[tex]2x + 3y + 2 (-x + 7y-21) = 26
3x + 2y-5 (-x + 7y-21) = 13[/tex]
From here, we obtain a system of two equations with two unknowns, whose graphical solution is given by the intersection of both lines:
[tex]x = 5
y = 4[/tex]
Note: See attached image for the graphic solution
We now look for the value of z replacing the found values of the graphic solution:
[tex]z = -x + 7y-21
z = -5 + 7 * (4) -21
z = 2[/tex]
Therefore, the triple ordered solution is:
[tex](x, y, z) = (5,4,2)
[/tex]
Answer:
[tex](x, y, z) = (5,4,2)
[/tex]
See attached image
