If `omega(ne 1)` be a cube root of unity and `(1+omega^(2))^(n)=(1+omega^(4))^(n)`, then the least positive value of n, is

If omega be a cube root of unity and (1+omega^(2))^(n)=(1+omega^(4))^(n) , then the least positive value of n is

If omega(ne1) be a cube root of unity and (1+omega^2)^n=(1+omega^4)^n then the least positive value of n is

If omega(!= 1) be an imaginary cube root of unity and (1+omega^2)^n=(1+omega^4)^n, then the least positive value of n is (a) 2 (b) 3 (c) 5 (d) 6

If omega(!=1) be an imaginary cube root of unity and (1+omega^(2))=(1+omega^(4)), then the least positive value of n is (a)2(b)3(c)5(d)6

If omega(!= 1) be an imaginary cube root of unity and (1+omega^2)=(1+omega^4), then the least positive value of n is (a) 2 (b) 3 (c) 5 (d) 6

If omega (ne 1) is a complex cube root of unity and (1 + omega^(4))^(n)=(1+omega^(8))^(n) , then the least positive integral value of n is

omega is an imaginary cube root of unity. If (1+ omega ^(2)) ^(m)=(1+omega ^(4)) ^(m) then the least positive integral value of m is-

If omega ne 1 is a cube root of unity, then 1, omega, omega^(2)

If w(ne 1) is a cube root of unity and (1+w^2)^n = (1+w^4)^n then find the least positive integral value of n