'Let `S= S_(1) cap S_(2) cap S_(3)` where `S_(1) {z in C : |z|lt 4}, S_(2) ={z in C : Im [(z-1 + sqrt(3)i)/(1-sqrt(3)i)]gt 0}` and `S_(3) = {z in C : Re (z) gt 0}`''
Area of S=

Let S=S_1 cap S_2 cap S_3 where S_1={z in C:|z| lt 4"}",S_2={z in C: lm[(z-1+sqrt(3)i)/(1-sqrt(3)i)]gt0} and S_3:{z in : Re z lt 0 } Let z be any point in A cap B cap C The |z+1-i|^2+|z-5-i|^2 lies between

Let S=S_(1)nn S_(2)nn S_(3), where s_(1)={z in C:|z| 0} and S_(3)={z in C:Re z>0

Let S_(1), S_(2) and S_(3) be three sets defined as S_(1)={z in CC:|z-1| le sqrt(2)} S_(2)={z in CC : Re((1-i)z) ge1} S_(3)={z in CC : Im(z) le 1} Then the set S_(1)cap S_(2) cap S_(3)

If S={z in CC : (z-i)/(z+2i) in RR} , then

Let CC be the set of all complex numbers . Let S_(1) = { in CC : | z - 2| le 1} and S_(2) = { z in CC z (1 + i)+ bar(z) ( 1 - i) ge 4} Then, the maximum value of | z - (5)/( 2)| ^(2) " for " z in S_(1) cap S_(2) is equal to

Let C be the set of all complex numbers. Let S_(i) = {z in C||z-3-2i|^(2)=8}, S_(2)= {z in C|Re (z) ge 5} and S_(3)= {z in C||z-bar(z)| ge 8} . Then the number of elements in S_(1) nn S_(2) nn S_(3) is equal to

z in C, S_1 ={ abs(z-1) lt sqrt2} , S_2={Re(z(1-i)ge1} , S_3={Im (z) lt 1 } . Then n(S_1capS_2capS_3)