The complex number `frac{1+2i}{1-i}` lies in which quadrant of the complex plane?

The complex number frac{1+2i}{1-i} lies in the

(frac{1+i}{1-i})^2 =?

The number frac{(1-i)^3}{1-i^3} is equal to

The congugate of a complex number frac{2+5i}{4-3i} is

The argument of the complex number frac{13-5i}{4-9i} is

a+ib form of the complex number frac{1+3i}{2+3i}

The congugate of a complex number z is frac{1}{i-1} ,then the complex number is

If (frac{1+i}{1-i})^x = 1, then

The argument of the complex number [frac{i}{2}-frac{2}{i}] is equal to

For the real parameter t , the locus of the complex number z = (1-t^2)+isqrt(1+t^2) in the complex plane is