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21 April, 00:57

Complete the square to rewrite y = x ^ 2 + 6x + 5 in vertex form. Then state whether the vertex is a maximum or a minimum and give its coordinates.

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  1. 21 April, 01:27
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    y = (x + 3) ² - 4

    The vertex is a minimum at (-3, - 4)

    Step-by-step explanation:

    Step 1: Isolate xs

    y - 5 = x² + 6x

    Step 2: Complete the square

    y - 5 + 9 = x² + 6x + 9

    y + 4 = (x + 3) ²

    Step 3: Convert to vertex form

    y = (x + 3) ² - 4

    To find your vertex, (h, k) is your vertex, so (-3, - 4). To see whether or not it is a max or a min, check a to see if it is positive or negative. Since a is positive, it is a minimum.
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