Let `z_1=6+i & z_2=4-3i` Let `z` be a complex number such that `arg((z-z_1)/(z-z_2))=pi/2` then `z` satisfies

Let z_(1)=6+i&z_(2)=4-3i Let z be a a complex number such that arg((z-z_(1))/(z-z_(2)))=(pi)/(2) then z satisfies

Let z be a complex number such that |z| = 4 and arg (z) = 5pi//6, then z =

let z_1=10+6i and z_2=4+6i if z is nay complex number such that argument of (z-z_1)/(z-z_2) is pi/4 the prove that abs(z-7-9i)=3sqrt2

If z_(1) = 8 + 4i , z_(2) = 6 + 4i and z be a complex number such that Arg ((z - z_(1))/(z - z_(2))) = (pi)/(4) , then the locus of z is

Let z_1=10+6i and z_2=4+6idot If z is any complex number such that the argument of ((z-z_1))/((z-z_2)) is pi/4, then prove that |z-7-9i|=3sqrt(2) .

Let z_1=10+6i and z_2=4+6idot If z is any complex number such that the argument of ((z-z_1))/((z-z_2)) is pi/4, then prove that |z-7-9i|=3sqrt(2) .

Let z_1=10+6i and z_2=4+6idot If z is any complex number such that the argument of ((z-z_1))/((z-z_2)) is pi/4, then prove that |z-7-9i|=3sqrt(2) .

Let z_(1) and z_(2) be two complex numbers such that arg (z_(1)-z_(2))=(pi)/(4) and z_(1), z_(2) satisfy the equation |z-3|=Re(z) . Then the imaginary part of z_(1)+z_(2) is equal to ________.

Let z_(1)=10+6i and z_(2)=4+6i. If z is a complex number such that the argument of (z-z_(1))/(z-z_(2))is(pi)/(4), then prove that |z-7-9i|=3sqrt(2)

If z1=8+4i,z2=6+4i and arg((z-z1)/(z-z2))=(pi)/(4), then z, satisfies