solve by cramer's rule : x+y+z=1 , ax+by+cz=k, `a^2x+b^2y+c^2z=k^2[a ne b ne c]` .

Solve by cramer's rule : 3x+y+z =10 ,x+y-z=0,5x-9y=1

Solve by Cramer's rule: x+3y= 4,y+3z = 7, 4x+z= 6.

Solve by cramer's rule : 2x-z=1 ,2x+4y-z=1 ,x-8y-3z=-2.

Solve by cramer's rule : x+y+z=1 x+2y+3x=4 x+3y+5z=7

Solve by Cramer's rule : {:(x+y=2),(y+z=4),(z+x=6):}

Solve for x by Cramers rule x+y+z=6 , x-y+z=2 3x+2y-4z=-5

x+y+z=1, ax+by+cz=k, bcx+cay+abz= k^2 [a,b,c are unequal ]

Solve the system of the equations: a x+b y+c z=d , a^2x+b^2y+c^2z=d^2 , a^3x+b^3y+c^3z=d^3 .

If x+y+z=0 prove that |[a x, b y, c z],[ c y, a z ,b x],[ b z ,c x ,a y]|=x y z|[a, b, c],[c ,a ,b],[b ,c ,a]|

Prove that the equations kx + y + z = 1, x + ky + z = k and x + y + kz = k^(2) will have unique solution when k ne 1 and k ne -2 . Solve the equations in this case.