The area of the triangle whose vertices are represented by `0,z,z e^(ialpha)`

The area of the triangle whose vertices are represented by the complex numbers O,z and iz 'where z is (cos alpha + i sin alpha) is equial to -

The area of the triangle whose vertices are represented by the complex numbers O,z and z(cos alpha + I sin alpha) (0 lt alpha lt pi) is equial to -

If |z_1 |=|z_2|=|z_3| = 1 and z_1 +z_2+z_3 =0 then the area of the triangle whose vertices are z_1 ,z_2 ,z_3 is

If z = x+iy , then the area of the triangle whose vertices are z, iz and z+iz is

Find the area of the triangle whose vertices represent the three roots of the complex equation z^4 = (z+1)^4 .

If z is a complex number such that |z|=2 , then the area (in sq. units) of the triangle whose vertices are given by z, -iz and iz-z is equal to

If z is a complex number such that |z|=2 , then the area (in sq. units) of the triangle whose vertices are given by z, -iz and iz-z is equal to

The area of the triangle whose vertices are the roots of z^(3)+iz^(2)+2i=0 is dots

The area (in sq units) of the triangle whose vertices are the points represented by the complex numbers 0, z , ze^(i alpha) ( 0 lt alpha lt pi) is