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Let omega be a complex number such that omega^3 = 1. Find all possible values of {1}{1 + \omega} + {1}{1 + \omega^2}. Enter all the possible values, separated by commas.
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Let omega be a complex number such that omega^3 = 1. Find all possible values of {1}{1 + \omega} + {1}{1 + \omega^2}. Enter all the possible values, separated by commas.

User Gustavo Pagani
by
4.3k points

1 Answer

7 votes

Answer:

1 is Answer.

Explanation


(1)/(1+omega^(2) ) + (1)/(1+omega )\\

=
((-1)*(omega + 1))/(omega^(2)  )

As we know that ω²+ω+1=0

Thus putting in above equation, we get

=
(1)/((-1)*omega ) + (1)/((-1)*omega^(2)  )

Rearranging and simplifying:

=
(-1)/(omega ) + (-1)/(omega^(2)  )

=
((-1)*(omega + 1))/(omega^(2)  )

=
((-1)*(- omega^(2) ))/(omega^(2)  )

= 1 Answer

User Thomas Jung
by
4.8k points
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