Describe the graph of the function. y = 2x2 + 12x – 15 The graph is a parabola with axis of symmetry at x = –3. The graph is a parabola with axis of symmetry at x = 3. The graph…

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asked Jul 5, 2021 47.1k views

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Mark Hobson · Answer 1 · 2021-07-11T05:38:41+0000

Answer:

The answer is option 1.

Explanation:

Axis of symmetry means the middle x-coordinates of the parabola. So in order to find the x value, you have to find the TP which is Turning Point by using Completing the Square :

${(x + (b)/(2) )}^(2) - {( (b)/(2) )}^(2) + c = 0$

Let y = 0,

$2{x}^(2) + 12x - 15 = 0$

$2( {x}^(2) + 6x - (15)/(2) ) = 0$

${( {x + (6)/(2)) }^(2) - ( { (6)/(2) )}^(2) - (15)/(2) } = 0$

$( {x + 3)}^(2) - {(3)}^(2) - (15)/(2) = 0$

$( {x + 3)}^(2) - 9 - (15)/(2) = 0$

$(x { + 3)}^(2) - (33)/(2) = 0$

$2(x { + 3)}^(2) - 33 = 0$

Next, you have to solve the x value :

x + 3 = 0

x = -3

Describe the graph of the function. y = 2x2 + 12x – 15 The graph is a parabola with axis of symmetry at x = –3. The graph is a parabola with axis of symmetry at x = 3. The graph…

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