Let `S=S_1 nn S_2 nn S_3`, where `s_1={z in C :|z|<4}, S_2={z in C :ln[(z-1+sqrt(3)i)/(1-sqrt(31))]>0} and `
`S_3={z in C : Re z > 0}` Area of S=

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} Area of S=

Let S = S_(1) nnS_(2)nnS_(3) , where S_(1)={z "in" C":"|z| lt 4} , S_(2)={z " in" C":" Im[(z-1+sqrt(3)i)/(1-sqrt(3i))] gt 0 } and S_(3) = { z "in" C : Re z gt 0} underset(z in S)(min)|1-3i-z|=

Let w = ( sqrt 3 + iota/2) and P = { w^n : n = 1,2,3, ..... }, Further H_1 = { z in C: Re(z) > 1/2} and H_2 = { z in c : Re(z) < -1/2} Where C is set of all complex numbers. If z_1 in P nn H_1 , z_2 in P nn H_2 and O represent the origin, then /_Z_1OZ_2 =

Let 0 ne a, 0 ne b in R . Suppose S={z in C, z=1/(a+ibt)t in R, t ne 0} , where i=sqrt(-1) . If z=x+iy and z in S , then (x,y) lies on

The equation of a circle S_1 is x^2 + y^2 = 1 . The orthogonal tangents to S_1 meet at another circle S_2 and the orthogonal tangents to S_2 meet at the third circle S_3 . Then (A) radius of S_2 and S_3 are in ratio 1 : sqrt(2) (B) radius of S_2 and S_1 are in ratio 1 : 2 (C) the circles S_1, S_2 and S_3 are concentric (D) none of these

Let each of the circles, S_(1)=x^(2)+y^(2)+4y-1=0 , S_(2)=x^(2)+y^(2)+6x+y+8=0 , S_(3)=x^(2)+y^(2)-4x-4y-37=0 touches the other two. Let P_(1), P_(2), P_(3) be the points of contact of S_(1) and S_(2), S_(2) and S_(3), S_(3) and S_(1) respectively and C_(1), C_(2), C_(3) be the centres of S_(1), S_(2), S_(3) respectively. Q. The co-ordinates of P_(1) are :

Let each of the circles S_(1)-=x^(2)+y^(2)+4y-1=0 S_(1)-= x^(2)+y^(2)+6x+y+8=0 S_(3)-=x^(2)+y^(2)-4x-4y-37=0 touch the other two. Also, let P_(1),P_(2) and P_(3) be the points of contact of S_(1) and S_(2) , S_(2) and S_(3) , and S_(3) , respectively, C_(1),C_(2) and C_(3) are the centres of S_(1),S_(2) and S_(3) respectively. The ratio ("area"(DeltaP_(1)P_(2)P_(3)))/("area"(DeltaC_(1)C_(2)C_(3))) is equal to

Let each of the circles, S_(1)=x^(2)+y^(2)+4y-1=0 , S_(2)=x^(2)+y^(2)+6x+y+8=0 , S_(3)=x^(2)+y^(2)-4x-4y-37=0 touches the other two. Let P_(1), P_(2), P_(3) be the points of contact of S_(1) and S_(2), S_(2) and S_(3), S_(3) and S_(1) respectively and C_(1), C_(2), C_(3) be the centres of S_(1), S_(2), S_(3) respectively. Q. P_(2) and P_(3) are image of each other with respect to line :

Consider the region S of complex numbers a such that |z^(2) - az + 1|=1 , where |z|=1 . Then area of S in the Argand plane is

In the arrangement shown in Fig., slits S_(1) and S_(4) are having a variable separation Z. Point O on the screen is at the common perpendicular bisector of S_(1) S_(2) and S_(3) S_(4) . The minimum value of Z for which the intensity at O is zero is