If `z_(1),z_(2),z_(3),…,z_(n-1)` are the roots of the equation `z^(n-1)+z^(n-2)+z^(n-3)+…+z+1=0`, where `n in N, n gt 2` and `omega` is the cube root of unity, then

If z_(1),z_(2),z_(3),…………..,z_(n) are n nth roots of unity, then for k=1,2,,………,n

If z_1,z_2,z_3,………..z_(n-1) are the roots of the equation 1+z+z^2+…….+z^(n-1)=0, where n epsilon N, ngt2 then (A) z_1,z_2, …z_(n-1) are terms of a G.P. (B) z_1,z_2,……,z_(n-1) are terms of an A.P. (C) |z_1|=|z_2|=|z_3|=.|z_(n-1)|!=1 (D) none of these

If z_(1) and z_(2) are the complex roots of the equation (x-3)^(3) + 1=0 , then z_(1) +z_(2) equal to

If n >1 , show that the roots of the equation z^n=(z+1)^n are collinear.

If z_1 is a root of the equation a_0z^n+a_1z^(n-1)++a_(n-1)z+a_n=3,w h e r e|a_i| 1/4 d. |z|<1/3

If z_(1) and z_(2) are two n^(th) roots of unity, then arg (z_(1)/z_(2)) is a multiple of

Let 1, z_(1),z_(2),z_(3),…., z_(n-1) be the nth roots of unity. Then prove that (1-z_(1))(1 - z_(2)) …. (1-z_(n-1))= n . Also,deduce that sin .(pi)/(n) sin.(2pi)/(pi)sin.(3pi)/(n)...sin.((n-1)pi)/(n) = (pi)/(2^(n-1))

Let 1, z_(1),z_(2),z_(3),…., z_(n-1) be the nth roots of unity. Then prove that (1-z_(1))(1 - z_(2)) …. (1-z_(n-1))= n . Also,deduce that sin .(pi)/(n) sin.(2pi)/(pi)sin.(3pi)/(n)...sin.((n-1)pi)/(n) = (pi)/(2^(n-1))

If z_(1),z_(2),z_(3)………….z_(n) are in G.P with first term as unity such that z_(1)+z_(2)+z_(3)+…+z_(n)=0 . Now if z_(1),z_(2),z_(3)……..z_(n) represents the vertices of n -polygon, then the distance between incentre and circumcentre of the polygon is

If 1,z_1,z_2,z_3,.......,z_(n-1) be the n, nth roots of unity and omega be a non-real complex cube root of unity, then prod _(r=1)^(n-1) (omega-z_r) can be equal to