If x, y, z are not all zero & if ax + ...

If `x, y, z` are not all zero & if `ax + by + cz=0, bx+ cy + az=0 & cx + ay + bz = 0`, then prove that `x: y : z = 1 : 1 : 1` OR `1 :omega:omega^2 OR 1:omega^2:omega` , where `omega` is one ofthe complex cube root of unity.

Similar Questions

Explore conceptually related problems

If x ,\ y , z are not all zero and if a x+b y+c z=0; b x+c y+a z=0; c x+a y+b z=0 Prove that x : y : z=1:1:1\ or\ 1:omega:omega^2or\ 1:omega^2:omegadot

|{:(1,omega,omega^2),(omega,omega^2,1),(omega^2,1,omega):}|=0 where omega is an imaginary cube root of unity.

If A =({:( 1,1,1),( 1,omega ^(2) , omega ),( 1 ,omega , omega ^(2)) :}) where omega is a complex cube root of unity then adj -A equals

The value of (1-omega+omega^(2))^(5)+(1+omega-omega^(2))^(5) , where omega and omega^(2) are the complex cube roots of unity is

Using properties, prove that |[1,omega,omega^2],[omega,omega^2,1],[omega^2,1,omega]|=0 where omega is a complex cube root of unity.

Prove that the lines ax+by + c = 0, bx+ cy + a = 0 and cx+ay+b=0 are concurrent if a+b+c = 0 or a+b omega + c omega^(2) + c omega = 0 where omega is a complex cube root of unity .

If z is a complex number satisfying |z-3|<=4 and | omega z-1-omega^(2)|=a (where omega is complex cube root of unity then

If x = cy + bz, y = az + cx , z =bx + ay, then prove that x^2/(1-a^2)= y^2/(1-b^2)

Prove that - omega, " and " - omega^(2) are the roots of z^(2) - z + 1 = 0 , where omega " and " omega^(2) are the complex cube roots of unity .

If `x, y, z` are not all zero & if `ax + by + cz=0, bx+ cy + az=0 & cx + ay + bz = 0`, then prove that `x: y : z = 1 : 1 : 1` OR `1 :omega:omega^2 OR 1:omega^2:omega` , where `omega` is one ofthe complex cube root of unity.

Similar Questions

Recommended Questions