For complex numbers z1=x1+iy1 and z2=x2...

For complex numbers `z_1=x_1+iy_1 and z_2=x_2+iy_2`, (where `i = sqrt-1`) we write `z_1 nn z_2` of `x_1 leq x_2 and y_1 leq y_2`, then for all complex number z with `1 nn z`, we have `(1-z)/(1+z) nn....` is

`(1-z)/(1+z)nn-i`

`1 nn (1-z)/(1+z)`

`(1-z)/(1+z)nn 0`

`(1+z)/(1-z)nn 0`

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For all complex numbers z of the form 1 + ialpha, alpha in "R if z"^(2) = x + iy , then

`y^(2) - 4x + 2 = 0`

`y^(2) + 4x - 4 = 0`

`y^(2) - 4x + 4 = 0`

`y^(2) + 4x + 2 = 0`

both `z_(1) and z_(2)` lie on circle |z|=1

`arg(z_(1)/z_(2)) = pi/3`

At least one of ` z_(1) and z_(2)` lies on the circle |z|=1

`|z_(1)|=2|z_(2)|`

circle with `z_1` as its interior point

circle with `z_2` as its interior point

circle with `z_1 and z_2` as its interior points

circle with `z_1 and z_2` as its exterior points