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21 September, 10:27

Solve the following quadratic equations using completing the square x2 - 8x - 34 = 0

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Answers (2)
  1. 21 September, 10:41
    0
    4 + 5sqrt (2), 4 - 5sqrt (2)

    Step-by-step explanation:

    x² - 8x - 34 = 0

    x = [ - (-8) + / - sqrt ((-8) ² - 4 (1) (-34)) ]/2

    x = (8 + / - sqrt200) / 2

    x = 4 + / - 5sqrt (2)
  2. 21 September, 10:49
    0
    x=4± 5sqrt (2)

    Step-by-step explanation:

    x^2 - 8x - 34 = 0

    To complete the square Add 34 to each side

    x^2 - 8x - 34+34=0 + 34

    Take the coefficient of x, and divide by 2

    -8/2 = -4

    Then square it and add it to each side

    (-4) ^2 = 16

    x^2 - 8x + 16 = 34+16

    x^2 - 8x + 16 = 50

    We replace the left side with (x + the coefficient of x/2) ^2

    (x - 4) ^2=50

    Take the square root of each side

    sqrt ((x - 4) ^2) = ±sqrt (50)

    x-4 = ±sqrt (25*2)

    x-4 = ±sqrt (25) * sqrt (2)

    x-4 = ±5sqrt (2)

    Add 4 to each side

    x=4± 5sqrt (2)
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