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16 July, 07:31

Given the parent functions f (x) = log2 (3x - 9) and g (x) = log2 (x - 3), what is f (x) - g (x) ?. A. f (x) - g (x) = log2 (2x - 6). B. f (x) - g (x) = log2 (2x - 12). C. f (x) - g (x) = log2 one third. D. f (x) - g (x) = log2 3

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  1. 16 July, 09:46
    0
    F (x) - g (x) = log2 (3x - 9) - log2 (x - 6)

    When two logarithms of the same bases are subtracted they become,

    log2 ((3x - 9) / (x - 3))

    Both the numerator and the denominator can be factored by x - 3. This becomes,

    log2 ((3) (x - 3) / (x - 3))

    which simplifies into,

    log2 (3).
  2. 16 July, 11:17
    0
    We are given the two functions:

    f (x) = log2 (3x - 9)

    g (x) = log2 (x - 3)

    Then,

    f (x) - g (x) = log2 (3x - 9) - log2 (x - 6)

    Two logarithms of the same bases are subtracted, therefore:

    log2 ((3x - 9) / (x - 3))

    We factor both the numerator and the denominator by x - 3. This becomes,

    log2 ((3) (x - 3) / (x - 3))

    When further simplified, yields:

    log2 (3)
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