If `omega` is a non-real complex cube root of unity and `(5+3omega^2-5omega)^(4n+3)+(5omega+3-5omega^2)^(4n+3)+(5omega^2+3omega-5)^(4n+3)=0,` then possible value of `n` is

If omega is a non-real complex cube root of unity and (5+3 omega^(2)-5 omega)^(4n+3)+(5 omega+3-5 omega^(2))^(4n+3)+(5 omega^(2)+3 omega-5)^(4n+3)=0 then possible value of n is

Let omega ne 1 be a complex cube root of unity. If (3-3omega+2omega^(2))^(4n+3) + (2+3omega-3omega^(2))^(4n+3)+(-3+2omega+2omega^(2))^(4n+3)=0 , then the set of possible value(s) of n is are

If omega is a non-real cube root of unity,then the value of (1-omega+omega^(2))^(5)+(1+omega-omega^(2))^(5) is

If omega is complex cube root of unity then (3+5 omega+3 omega^(2))^(2)+(3+3 omega+5 omega^(2))^(2) is equal to

If omega is complex cube root of unity then (3+5 omega+3 omega^(2))^(2)+(3+3 omega+5 omega^(2))^(2) is equal to

If omega is a non-real cube root of unity, then (1+2omega+3omega^2)/(2+3omega+omega^2)+(2+3omega+omega^2)/(3+omega+2omega^2) is equal to

If omega is a cube root of unity, prove that (1+omega-omega^2)^3-(1-omega+omega^2)^3=0

If omega is an imainary cube root of unity,then show that (1-omega+omega^(2))^(5)+(1+omega-omega^(2))^(5)=32

If (omega!=1) is a cube root of unity then omega^(5)+omega^(4)+1 is