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Cube Root of a Complex Number

If the polyno...

Question

If the polynomial $5 x^{3} + M x + N$ is divisible by $x^{2} + x + 1$ , then $| M + N | =$

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Solution

Let $f (x) = 5 x^{3} + M x + N$
Also, $x^{2} + x + 1 = (x - ω) (x - ω^{2})$
$f (x)$ is divisible by $x^{2} + x + 1$ .
Hence using factor theorem, $f (ω) = 5 + M ω + N = 0 [∵ ω^{3} = 1]$
and
$f (ω^{2}) = 5 + M ω^{2} + N = 0 [∵ ω^{6} = 1]$
$\Rightarrow M = 0, N = - 5$
$∴ | M + N | = 5$

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