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3 January, 22:55

Simplify the expression completely:

4x^2+2x-42/4x / (x-3)

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  1. 3 January, 23:59
    0
    (x (8 x^2 - 20 x + - 33)) / (2 (x - 3))

    Step-by-step explanation:

    Simplify the following:

    4 x^2 + 2 x - (42 x) / (4 (x - 3))

    The gcd of 42 and 4 is 2, so 42/4 = (2*21) / (2*2) = 2/2*21/2 = 21/2:

    4 x^2 + 2 x - x / (x - 3) 21/2

    Put each term in 4 x^2 + 2 x - (21 x) / (2 (x - 3)) over the common denominator 2 (x - 3) : 4 x^2 + 2 x - (21 x) / (2 (x - 3)) = (8 (x - 3) x^2) / (2 (x - 3)) + (4 (x - 3) x) / (2 (x - 3)) - (21 x) / (2 (x - 3)):

    (8 x^2 (x - 3)) / (2 (x - 3)) + (4 x (x - 3)) / (2 (x - 3)) - (21 x) / (2 (x - 3))

    (8 (x - 3) x^2) / (2 (x - 3)) + (4 (x - 3) x) / (2 (x - 3)) - (21 x) / (2 (x - 3)) = (8 (x - 3) x^2 + 4 (x - 3) x - 21 x) / (2 (x - 3)):

    (8 x^2 (x - 3) + 4 x (x - 3) - 21 x) / (2 (x - 3))

    Factor x out of 8 (x - 3) x^2 + 4 (x - 3) x - 21 x, resulting in x (8 (x - 3) x^ (2 - 1) + 4 (x - 3) - 21):

    (x (8 x^ (2 - 1) (x - 3) + 4 (x - 3) - 21)) / (2 (x - 3))

    2 - 1 = 1:

    (x (8 x (x - 3) + 4 (x - 3) - 21)) / (2 (x - 3))

    8 x (x - 3) = 8 x^2 - 24 x:

    (x (8 x^2 - 24 x + 4 (x - 3) - 21)) / (2 (x - 3))

    4 (x - 3) = 4 x - 12:

    (x (4 x - 12 + 8 x^2 - 24 x - 21)) / (2 (x - 3))

    Grouping like terms, 8 x^2 + 4 x - 24 x - 21 - 12 = 8 x^2 + (-24 x + 4 x) + (-12 - 21):

    (x (8 x^2 + (-24 x + 4 x) + (-12 - 21))) / (2 (x - 3))

    4 x - 24 x = - 20 x:

    (x (8 x^2 + - 20 x + (-12 - 21))) / (2 (x - 3))

    -12 - 21 = - 33:

    Answer: (x (8 x^2 - 20 x + - 33)) / (2 (x - 3))
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