Let `omega` be a complex cube root of unity with `omega!=1a n dP=[p_(i j)]` be a `nxxn` matrix withe `p_(i j)=omega^(i+j)dot` Then `p^2!=O ,w h e nn=` a.`57` b. `55` c. `58` d. `56`

Let omega be a complex cube root of unity with omega!=1a n dP=[p_(i j)] be a nxxn matrix withe p_(i j)=omega^(i+j)dot Then p^2!=O , n= a. 57 b. 55 c. 58 d. 56

If omega is the complex cube root of unity, then find (1+omega)(1+omega^2) dot

If omega is the complex cube root of unity, then find (1-omega)(1-omega^2) dot

If omega is the complex cube root of unity, then find (1-omega-omega^2)^3 dot

If omega is an imaginary cube root of unity and omega=(-1+sqrt3i)/(2) then omega^(2) =

If omega is the complex cube root of unity then |[1,1+i+omega^2,omega^2],[1-i,-1,omega^2-1],[-i,-i+omega-1,-1]|=

Let omega be a complex cube root unity with omega!=1. A fair die is thrown three times. If r_1, r_2a n dr_3 are the numbers obtained on the die, then the probability that omega^(r1)+omega^(r2)+omega^(r3)=0 is 1//18 b. 1//9 c. 2//9 d. 1//36

If omega is an imaginary cube root of unity, then (1+omega-omega^2)^7 is equal to (a) 128omega (b) -128omega (c) 128omega^2 (d) -128omega^2

Let omega ne1 be a complex cube root of unity if (3-3omega+2omega^2)^(4n+3)+(2+3omega-3omega^2)^(4n+3)+(-3+2omega+3omega^2)^(4n+3)=0 then possible value(s) of n is (are)

Let I, omega and omega^(2) be the cube roots of unity. The least possible degree of a polynomial, with real coefficients having 2omega^(2), 3 + 4 omega, 3 + 4 omega^(2) and 5- omega - omega^(2) as roots is -