The mirror image of the curve `arg((z-3)/(z-i))=pi/6, i=sqrt(- 1)` in the real axis

Find the point of intersection of the curves a r g(z-3i)=(3pi)/4a n d arg(2z+1-2i)=pi//4.

If z is any complex number satisfying abs(z-3-2i) le 2 , where i=sqrt(-1) , then the maximum value of abs(2z-6+5i) , is

Statement-I The point A(3, 1, 6) is the mirror image of the point B(1, 3, 4) in the plane x-y+z=5 . Statement-II The plane x-y+z=5 bisect the line segment joining A(3, 1, 6) and B(1,3, 4) .

The locus of z such that : arg [(1 - 2i)z-2+ 5i] = pi/4 is a:

Find the center and radius of the circle 2zbarz+(3-i)z+(3+i)z-7=0," where " i=sqrt(-1).

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) .

If z=(i) ^((i) ^(i)) where i= sqrt (−1) ​ , then z is equal to

If z=ilog_(e)(2-sqrt(3)),"where"i=sqrt(-1) then the cos z is equal to

Given that |z-1|=1, where z is a point on the argand planne , show that (z-2)/(z)=itan (arg z), where i=sqrt(-1).

If z=(3+4i)^(6)+(3-4i)^(6),"where" i=sqrt(-1), then Find the value of Im(z) .