If `(z+1)/(z+i)` is a purely imaginary number (where`(i=sqrt(-1)`), then z lies on a

If z_1,z_2 are comples numbers such that (2 z_1)/(3z_2) is purely imaginary number, then find |(z_1-z_2)/ (z_1+ z_2)| .

If |z|=1, prove that (z-1)/(z+1) (z ne -1) is purely imaginary number. What will you conclude if z=1?

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

If w= z/(z-i1/3) and |w|=1,then z lies on:

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

If z is a complex number which simultaneously satisfies the equations 3abs(z-12)=5abs(z-8i) " and " abs(z-4) =abs(z-8) , where i=sqrt(-1) , then Im(z) can be

If |z^2-1|=|z|^2+1 , then z lies on :

If z is purely real number such that Re(z)<0 , then argument (z) is equal to:

If (3+i)(z+bar(z))-(2+i)(z-bar(z))+14i=0 , where i=sqrt(-1) , then z bar(z) is equal to

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