Let z be a unimodular complex number.
Statement-1:arg `(z^(2)+barz)="arg"(z)`
Statement-2:barz=`cos("arg"z)-isin("arg"z)`

Let z be any non-zero complex number. Then arg(z) + arg (barz) is equal to

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

If z ne 0 be a complex number and "arg"(z)=pi//4 , then

Find the locus of a complex number z such that arg ((z-2)/(z+2))= (pi)/(3)

Let z and omega be complex numbers such that |z|=|omega| and arg (z) dentoe the principal of z. Statement-1: If argz+ arg omega=pi , then z=-baromega Statement -2: |z|=|omega| implies arg z-arg baromega=pi , then z=-baromega

bb"Statement-1" If the principal argument of a complex numbere z is 0, the principal argument of z^(2) " is " 2theta . bb"Statement-2" arg(z^(2))=2arg(z)

Let z,w be complex numbers such that barz+ibarw=0 and arg zw=pi Then argz equals

Let z,w be complex numbers such that barz+ibarw=0 and arg zw=pi Then argz equals

If z be any complex number (z!=0) then arg((z-i)/(z+i))=pi/2 represents the curve

If z is a purely real complex number such that "Re"(z) lt 0 , then, arg(z) is equal to