Let Z and w be two complex number such that `|zw|=1` and `arg(z)−arg(w)=pi//2` then

If z and w are two complex number such that |zw|=1 and arg (z) – arg (w) = pi/2, then show that overline zw = -i.

If z and w are two complex number such that |z w|=1 and a rg(z)-a rg(w)=pi/2 , then show that barz w=-i

If za n dw are two complex number such that |z w|=1a n da rg(z)-a rg(w)=pi/2 , then show that z w=-idot

Let z and w be two nonzero complex numbers such that |z|=|w| and arg(z)+a r g(w)=pidot Then prove that z=- barw dot

Let z and w are two non zero complex number such that |z|=|w|, and Arg(z)+Arg(w)=pi then (a) z=w (b) z=overlinew (c) overlinez=overlinew (d) overlinez=-overlinew

Let za n dw be two nonzero complex numbers such that |z|=|w|a n d arg(z)+a r g(w)=pidot Then prove that z=- bar w dot

If z and omega are two non-zero complex numbers such that |zomega|=1 and arg(z)-arg(omega)=pi/2 , then barzomega is equal to

If z_1a n dz_2 are two complex numbers such that |z_1|=|z_2|a n d arg(z_1)+a r g(z_2)=pi , then show that z_1,=-( z )_2dot

Let z=x+iy and w=u+iv be two complex numbers, such that |z|=|w|=1 and z^(2)+w^(2)=1. Then, the number of ordered pairs (z, w) is equal to (where, x, y, u, v in R and i^(2)=-1 )

Let z and omega be two non zero complex numbers such that |z|=|omega| and argz+argomega=pi , then z equals (A) omega (B) -omega (C) baromega (D) -baromega