What are the zeros, equation of the axis of symmetry and vertex of $y = x^{2} + 5 x + 8$ $y=x^2 + 5x+ 8$ ?

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What are the zeros, equation of the axis of symmetry and vertex of $y = x^{2} + 5 x + 8$ $y=x^2 + 5x+ 8$ ?

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Answer 1 · 2018-05-30T19:15:40

No real zeros.

Vertex $(- \frac{5}{2}, \frac{7}{4})$ $(-5/2, 7/4)$ (minimum)

axis of symmetry $= - \frac{5}{2}$ $= -5/2$

FYI, this seems pretty hard for prealgebra.

Explanation:

To find the zeros (also called solutions or roots) if they exist, we set $y = 0$ $y=0$ and solve for x:

$y = x^{2} + 5 x + 8$ $y=x^2 + 5x+ 8$

$0 = x^{2} + 5 x + 8$ $0=x^2 + 5x+ 8$

We have to use the quadratic formula to factor:

$a x^{2} + b x + c$ $ax^2 + bx +c$

$x = \frac{- b \pm \sqrt{b^{2} - 4 a c}}{2 a}$ $x = (-b+-sqrt(b^2-4ac))/(2a)$

$a = 1$ $a=1$
$b = 5$ $b=5$
$c = 8$ $c=8$

$x = \frac{- 5 \pm \sqrt{5^{2} - 4 \cdot 1 \cdot 8}}{2 \cdot 1}$ $x = (-5+-sqrt(5^2-4*1*8))/(2*1)$

$x = \frac{- 5 \pm \sqrt{25 - 32}}{2}$ $x = (-5+-sqrt(25-32))/(2)$

$x = \frac{- 5 \pm \sqrt{- 7}}{2}$ $x = (-5+-sqrt(-7))/(2)$

Since the $\sqrt{- 7}$ $sqrt(-7)$ is an imaginary number there all no real roots or zeros.

The formula for axis of symmetry (aos):

$a o s = \frac{- b}{2 a}$ $aos=(-b)/(2a)$

$a o s = \frac{- 5}{2 \cdot 1} = - \frac{5}{2}$ $aos=(-5)/(2*1) = -5/2$

Fromula for vertex is:

$(a o s, f (a o s))$ $(aos, f(aos))$ , remember $y = f (x)$ $y=f(x)$

$f (x) = x^{2} + 5 x + 8$ $f(x)=x^2 + 5x+ 8$

$f (- \frac{5}{2}) = {(- \frac{5}{2})}^{2} + 5 (- \frac{5}{2}) + 8$ $f(-5/2)=(-5/2)^2 + 5(-5/2)+ 8$

$f (- \frac{5}{2}) = \frac{7}{4}$ $f(-5/2)=7/4$

So the vertex $= (- \frac{5}{2}, \frac{7}{4})$ $= (-5/2, 7/4)$

Answer 2 · 2018-05-30T19:25:54

The equation of the axis of symmetry is:

$x = - \frac{5}{2}$ $x = -5/2$

The vertex is $(- \frac{5}{2}, \frac{7}{4})$ $(-5/2, 7/4)$

The zeros are:

$x_{1} = - \frac{5}{2} - \frac{\sqrt{7} i}{2}$ $x_1 = -5/2-(sqrt7i)/2$ and $x_{2} = - \frac{5}{2} + \frac{\sqrt{7} i}{2}$ $x_2 = -5/2+(sqrt7i)/2$

Explanation:

When given a quadratic of the form $y = a x^{2} + b x + c$ $y = ax^2+bx+c$

The equation of the axis of symmetry is:

$x = - \frac{b}{2 a}$ $x = -b/(2a)$

The x-coordinate of the vertex, $h$ $h$ , has the same value as the axis of symmetry:

$h = - \frac{b}{2 a}$ $h = -b/(2a)$

The y-coordinate of the vertex, $k$ $k$ , is the function evaluated at $h$ $h$ :

$k = a k^{2} + b k + c$ $k = ak^2+bk + c$

The zeros can be found using the quadratic formula:

$x_{1} = \frac{- b - \sqrt{b^{2} - 4 (a) (c)}}{2 a}$ $x_1 = (-b-sqrt(b^2-4(a)(c)))/(2a)$ and $x_{2} = \frac{- b + \sqrt{b^{2} - 4 (a) (c)}}{2 a}$ $x_2 = (-b+sqrt(b^2-4(a)(c)))/(2a)$

Given: $y = x^{2} + 5 x + 8$ $y=x^2 + 5x+ 8$

Please observe that $a = 1, b = 1, and c = 8$ $a = 1, b = 1, and c = 8$

The equation of the axis of symmetry is:

$x = - \frac{5}{2}$ $x = -5/2$

Compute the vertex:

$h = - \frac{5}{2}$ $h = -5/2$

$k = {(- \frac{5}{2})}^{2} + 5 (- \frac{5}{2}) + 8$ $k = (-5/2)^2+5(-5/2)+8$

$k = \frac{7}{4}$ $k = 7/4$

The vertex is $(- \frac{5}{2}, \frac{7}{4})$ $(-5/2, 7/4)$

Compute the zeros:

$x_{1} = \frac{- 5 - \sqrt{5^{2} - 4 (1) (8)}}{2 (1)}$ $x_1 = (-5-sqrt(5^2-4(1)(8)))/(2(1))$ and $x_{2} = \frac{- 5 + \sqrt{5^{2} - 4 (1) (8)}}{2 (1)}$ $x_2 = (-5+sqrt(5^2-4(1)(8)))/(2(1))$

$x_{1} = - \frac{5}{2} - \frac{\sqrt{7} i}{2}$ $x_1 = -5/2-(sqrt7i)/2$ and $x_{2} = - \frac{5}{2} + \frac{\sqrt{7} i}{2}$ $x_2 = -5/2+(sqrt7i)/2$

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What are the zeros, equation of the axis of symmetry and vertex of $y = x^{2} + 5 x + 8$ $y=x^2 + 5x+ 8$ ?

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