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14 September, 15:51

What is the line of symmetry for the parabola whose equation is y = x2 + 10x + 25?

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Answers (2)
  1. 14 September, 17:03
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    x=-5

    y = x2 + 10x+25

    The line of symmetry passes through the vertex of the parabola. The x coordinate of the vertex is found with the formula x = - b 2a for the equation of the form y=a x2 + bx+c.

    In this example, a=1, b=10 and c=25

    x = - 10 2⋅1 = - 5

    Because the line of symmetry passes through the vertex, the equation of the line is x=-5.
  2. 14 September, 17:29
    0
    The line for axis of symmetry can be found with 2 ways

    1 long way (finding x value of vertex)

    2. short way (finding axis of symmetry using equation)

    1. long way

    complete the square

    y=x^2+10x+25

    take 1/2 of lienar coefnent and square it

    10/2=5, 5^2=25

    intersting, we have 25 already

    factor perfect square

    y = (x+5) ^2

    in form

    y=a (x-h) ^2+k

    vertex is (h, k)

    axis of symmetry is x=h

    so

    y=1 (x - (-5)) ^2+0

    axis of symmetry is x=-5

    short way

    for

    y=ax^2+bx+c

    the x value of the vertex or the axis of symmetry is - b / (2a)

    given

    y=1x^2+10x+25

    a=1

    b=10

    -b / (2a) = - 10 / (2*1) = - 10/2=-5

    the axis of symmety is x=-5
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