If `|z_(1)|=|z_(2)|` and arg `(z_(1)//z_(2))=pi,` then
find the of `z_(1)z_(2).`

If |z_(1)|=|z_(2)| and arg (z_(1))+"arg"(z_(2))=0 , then

z_(1) "the"z_(2) "are two complex numbers such that" |z_(1)| = |z_(2)| . "and" arg (z_(1)) + arg (z_(2) = pi," then show that "z_(1) = - barz_(2).

If z_(1) , z_(2) are complex numbers such that Re(z_(1))=|z_(1)-2| , Re(z_(2))=|z_(2)-2| and arg(z_(1)-z_(2))=pi//3 , then Im(z_(1)+z_(2))=

If |z_1|=|z_2| and arg((z_1)/(z_2))=pi , then z_1+z_2 is equal to (a) 0 (b) purely imaginary (c) purely real (d) none of these

If arg (z_(1)z_(2))=0 and |z_(1)|=|z_(2)|=1 , then

If z = x + iy and arg ((z-2)/(z+2))=pi/6, then find the locus of z.

If arg(z_(1))=(2pi)/3 and arg(z_(2))=pi/2 , then find the principal value of arg(z_(1)z_(2)) and also find the quardrant of z_(1)z_(2) .

if z_(1) =2+3i and z_(2) = 1+i then find, |z_(1)+z_(2)|

if z_(1) = 3i and z_(2) =1 + 2i , then find z_(1)z_(2) -z_(1)

If z_1a n dz_2 both satisfy z+ z =2|z-1| and a r g(z_1-z_2)=pi/4 , then find I m(z_1+z_2) .