Solve for x in the equation x2 – 4x-9 = 29.

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Solve for x in the equation x2 – 4x-9 = 29.

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Diễm Thu 5 years 2021-08-11T19:36:03+00:00 1 Answers 45 views 0

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  1. niczorrrr
    0
    2021-08-11T19:37:39+00:00
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    Answer:

    x=2+\sqrt{21}\\\\x=2-\sqrt{21}

    Step-by-step explanation:

    One is given the following equation;

    x^2-4x-9=29

    The problem asks one to find the roots of the equation. The roots of a quadratic equation are the (x-coordinate) of the points where the graph of the equation intersects the x-axis. In essence, the zeros of the equation, these values can be found using the quadratic formula. In order to do this, one has to ensure that one side of the equation is solved for (0) and in standard form. This can be done with inverse operations;

    x^2-4x-9=29

    x^2-4x-38=0

    This equation is now in standard form. The standard form of a quadratic equation complies with the following format;

    ax^2+bx+c

    The quadratic formula uses the coefficients of the quadratic equation to find the zeros this equation is as follows,

    \frac{-b(+-)\sqrt{b^2-4ac}}{2a}

    Substitute the coefficients of the given equation in and solve for the roots;

    \frac{-(-4)(+-)\sqrt{(-4)^2-4(1)(-38)}}{2(1)}

    Simplify,

    \frac{-(-4)(+-)\sqrt{(-4)^2-4(1)(-38)}}{2(1)}\\\\=\frac{4(+-)\sqrt{16+152}}{2}\\\\=\frac{4(+-)\sqrt{168}}{2}\\\\=\frac{4(+-)2\sqrt{21}}{2}\\\\=2(+-)\sqrt{21}

    Therefore, the following statement can be made;

    x=2+\sqrt{21}\\\\x=2-\sqrt{21}

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