If `z_1 =10 + 6i ,z_2 =4+6i` and z is a complex number such that , amp `((z-z_1)/(z-z_2))=pi/4` then the value of `|z-7-9i|` is equal to

If z_1=10+6i and z_2=4+2i be two complex numbers and z be a complex number such that a r g((z-z_1)/(z-z_2))=pi/4 , then locus of z is an arc of a circle whose (a) centre is 5+7i (b) centre is 7+5i (c) radius is sqrt(26) (d) radius is sqrt(13)

If z is a complex number,then amp ((z-1)/(z+1))=(pi)/(2) will be

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)

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

If arg ((z-6-3i)/(z-3-6i))=pi/4 , then maximum value of |z| :

If complex number z satisfies amp(z+i)=(pi)/(4) then minimum value of |z+1-i|+|z-2+3i| is

For a complex number Z, if arg Z=(pi)/(4) and |Z+(1)/(Z)|=4 , then the value of ||Z|-(1)/(|Z|)| is equal to

If z is a complex number such that z+i|z|=ibar(z)+1 ,then |z| is -