1.
Let the system of linear equations
x+y+az=2x + y + az = 2

3x+y+z=43x + y + z = 4

x+2z=1x + 2z = 1

have a unique solution (x,y,z)(x^*, y^*, z^*). If (a,x)(a, x^*), (y,a)(y^*, a) and (x,y)(x^*, y^*) are collinear points, then the sum of absolute values of all possible values of aa is: