is a factor of $x^{3} - 2 x - 4$ .

x - 1

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x - 2

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x - 3

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x - 4

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Solution

The correct option is B $x - 2$
According to factor theorem, $x - a$ is a factor of a polynomial P( $x$ ), if P( $a$ ) = 0.
Given P( $x$ ) = $x^{3} - 2 x - 4$ .
Hence, P(1) = $1^{3} - 2 \times 1 - 4$ = -5,
P(2) = $2^{3} - 2 \times 2 - 4$ = 0,
P(3) = $3^{3} - 2 \times 3 - 4$ = 17,
P(4) = $4^{3} - 2 \times 4 - 4$ = 52.
So, ( $x - 2$ ) is a factor of $x^{3} - 2 x - 4$ .

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a

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