The centre of a square ABCD is at z=0, A is `z_(1)`. Then, the centroid of `/_\ABC` is (where, `i=sqrt(-1)`)

The centre of the square A B C D is at the origin. The vertex A is z. The centroid of triangle B C D is at

The complex number z is such that |z|=1 , z ne -1 and w=(z-1)/(z+1) . Then real part of w is

If the plane 7x+11y+13z=3003 meets the axes A, B, C then the centroid of the triangle ABC is

If the plane 3x+4y-3z+2=0 cuts the coordinate axes at A, B, C, then the centroid of the triangle ABC is

The area of triangle with vertices affixed at z , iz , z(1+i) is

If z_(1),z_(2)and z_(3) are the vertices of an equilateral triangle with z_0 as its circumcentre , then changing origin to z_0 ,show that z_(1)^(2)+z_(2)^(2)+z_(3)^(2)=0, where z_(1),z_(2),z_(3), are new complex numbers of the vertices.

If z is a complex number such that |z|=1, z ne 1 , then the real part of |(z-1)/(z+1)| is

If z=1+i then the multiplicative inverse of z^(2) is

If |(z+i)/(z-i)|=sqrt(3) , then the radius of the circle is

the matrix A=[(i,1-2i),(-1-2i,0)], where I = sqrt-1, is