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9 November, 15:04

Which of the following options correctly represents the complete factored form of the polynomial F (x) = x^4-3x^2-4?

A. F (x) = (x+1) (x-1) (x+2) (x-2)

B. F (x) = (x+i) (x-i) (x+2i) (x-2i)

C. F (x) = (x+1) (x-1) (x+2i) (x-2i)

D. F (x) = (x+i) (x-i) (x+2) (x-2)

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Answers (2)
  1. 9 November, 16:58
    0
    D

    Step-by-step explanation:

    Let's substitute a for x²:

    x^4 - 3x² - 4

    a² - 3a - 4

    Now, this looks like something that is much more factorisable:

    a² - 3a - 4 = (a - 4) (a + 1)

    Plug x² back in for a:

    (a - 4) (a + 1)

    (x² - 4) (x² + 1)

    The first one is a difference of squares, which can be factored into:

    x² - 4 = (x + 2) (x - 2)

    The second one can also be treated as a difference of squares:

    x² + 1 = x² - (-1) = (x + √-1) (x - √-1) = (x + i) (x - i)

    The answer is (x + 2) (x - 2) (x + i) (x - i), or D.
  2. 9 November, 17:29
    0
    F (x) = x⁴-3x²-4

    x⁴-3x²-4=

    =x⁴-4x² + x²-4

    =x² (x²-4) + (x²-4)

    = (x²+1) (x²-4)

    = (x+i) (x-i) (x+2) (x-2)

    F (x) = (x+i) (x-i) (x+2) (x-2) D.
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