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For y = x2 + 6x - 16,

Determine if the parabola opens up or down.
State if the vertex will be a maximum or minimum.
Find the vertex.
Find the x-intercepts.
Describe the graph of the equation.

1 Answer

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y=x^2 + 6x - 16

a = 1 > 0 ⇒ Parabola opens up


y'=(x^2 + 6x - 16)'=2x+6 \\y''=(2x+6)'=2
y' = 2 > 0 ⇒ The vertex will be a minimum


a=1,b=6,c=-16 \\ \\T(- (b)/(2a) , (4ac-b^2)/(4a) ) \\ \\T(- (6)/(2*1) , (4*1(-16)-6^2)/(4*1) ) \\ \\T(-3,-25)


x^2 + 6x - 16=0 \\x^2+8x-2x-16=0 \\x(x+8)-2(x+8)=0 \\(x+8)(x-2)=0 \\x=-8 \text{ and } x=2 \\

The graph intersects x-axis at -8 and 2. Its minimum is at (-3,-25), and it is opened up.
User Mahdi Ghafoorian
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