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}`

Let w = ( sqrt 3/2 + 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

If S_(1), S_(2) and S_(3) be respectively the sum of n, 2n and 3n terms of a G.P. Prove that S_(1) (S_(3)-S_(2))= (S_(2)-S_(1))^(2) .

If z_1 + z_2 + z_3 + z_4 = 0 where b_1 in R such that the sum of no two values being zero and b_1 z_1+b_2z_2 +b_3z_3 + b_4z_4 = 0 where z_1,z_2,z_3,z_4 are arbitrary complex numbers such that no three of them are collinear, prove that the four complex numbers would be concyclic if |b_1b_2||z_1-z_2|^2=|b_3b_4||z_3-z_4|^2 .

The sum of first n terms of three APs are S_1, S_2 and S_3 . The first term of each AP is 5 and their common differences are 2, 4 and 6 respectively. Prove that S_1 + S_3 = 2S_2.

C_1 is a curve y^2=4x,C_2 is curve obtained by rotating C_1,120^@ in anti -clockwise direction C_3 is reflection of C_2 with respect to y=x and S_1,S_2,S_3 are foci of C_1,C_2 and C_3 , respectively, where O is origin. IF S_1(x_1,y_1),S_2(x_2,y_2) and S_3(x_3,y_3) then the value of sumx_1^2+sumy_1^2 is

C_1 is a curve y^2=4x,C_2 is curve obtained by rotating C_1,120^@ in anti -clockwise direction C_3 is reflection of C_2 with respect to y=x and S_1,S_2,S_3 are foci of C_1,C_2 and C_3 , respectively, where O is origin. Area of DeltaOS_2S_3 is

C_1 is a curve y^2=4x,C_2 is curve obtained by rotating C_1,120^@ in anti -clockwise direction C_3 is reflection of C_2 with respect to y=x and S_1,S_2,S_3 are foci of C_1,C_2 and C_3 , respectively, where O is origin. If (t^2,2t) are parametric form of curve C_1 , then the parametric form of curve C_2 is

A particle move along the Z -axis accoding to the equation z = 5 + 12 cos(2pit + (pi)/(2)) , where z is in cm and t is in seconds. Select the correct alternative (s)-

Let z_(1),z_(2) and z_(3) be three non-zero complex numbers and z_(1) ne z_(2) . If |{:(abs(z_(1)),abs(z_(2)),abs(z_(3))),(abs(z_(2)),abs(z_(3)),abs(z_(1))),(abs(z_(3)),abs(z_(1)),abs(z_(2))):}|=0 , prove that (i) z_(1),z_(2),z_(3) lie on a circle with the centre at origin. (ii) arg(z_(3)/z_(2))=arg((z_(3)-z_(1))/(z_(2)-z_(1)))^(2) .