Let $u,v$ unit vectors in $C^n$ so $$||u+v||=\sqrt{2}$$. Need to prove that $=bi$ for any b real number.
Please help me Im not sure if I even open $$||u+v||=\sqrt{2}$$ .
Let $u,v$ unit vectors in $C^n$ so $$||u+v||=\sqrt{2}$$. Need to prove that $=bi$ for any b real number.
Please help me Im not sure if I even open $$||u+v||=\sqrt{2}$$ .
Square both sides. You get
$$||u+v||^2 = ||u||^2+||v||^2 + 2Re() = 2 $$
Therefore $Re() = 0.$ Thus $$ must be imaginary, if not 0.