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14 October, 04:03

If f (x) = x^2-x and g (x) = x+1, determine f (g (x)) in simplest from

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  1. 14 October, 06:11
    0
    f (g (x)) is basically replacing the x with g (x).

    So, f (x) = (g (x)) ^2 - g (x)

    g (x), in turn, equals x+1

    Replace g (x) with x+1

    (x+1) ^2 - (x+1)

    Expand: x^2+x+x+1 - x - 1

    Cancel out x and 1

    f (g (x)) = x^2+x

    If you require factoring it's

    f (g (x)) = x (x+1)
  2. 14 October, 07:01
    0
    f (g (x)) = x^2 + x

    Step-by-step explanation:

    To find f (g) (x), we substitute g (x) in for x in the function f (x)

    f (x) = x^2 - x

    f (g (x)) = g (x) ^2 - g (x)

    = (x+1) ^2 - (x+1)

    = (x+1) * (x+1) - (x+1)

    FOIL the square

    (x+1) (x+1)

    First x*x = x^2

    outer x*1 = x

    inner 1*x = x

    last 1*1 = 1

    Add them together

    x^2 + x+x+1 = x^2+2x+1

    f (g (x)) = (x+1) * (x+1) - (x+1)

    = x^2+2x+1 - (x+1)

    Distribute the - 1

    = x^2 + 2x+1 - x-1

    = x^2 + x
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