Solve the quadraic equation:
$$x^2+16x-29=0 $$
Quick Answer
Since the discriminant $$\Delta >0$$, the quadratic equation has two distinct real roots.
$$ \Delta=372$$
$$\begin{cases} x_1=-8+\sqrt{93} \\ x_2=-8-\sqrt{93} \end{cases}$$
In decimal notation,
$$\begin{cases} x_1=1.643650760993 \\ x_2=-17.643650760993 \end{cases}$$
Detailed Steps on Solution
Solve the quadratic equation: $$x² + 16x - 29 = 0$$
Given $$a =1, b=16, c=-29$$,
1. Use the quadratic root
Use the root solution formula for a quadratic equation, the roots of the equation are given as
$$\begin{aligned} \\x&=\dfrac{-b\pm\sqrt{b^2-4ac} }{2a}\\ & =\dfrac{-16\pm\sqrt{16^2-4\cdot 1\cdot (-29)}}{2 \cdot 1}\\ & =\dfrac{-16\pm2\sqrt{93}}{2}\\ & =-8\pm\sqrt{93}\\ \end{aligned}$$
Since the discriminat is greater than zero, we get two real roots:That is,
$$\begin{cases} x_1 =-8+\sqrt{93} \\ x_2=-8-\sqrt{93} \end{cases}$$
2. Completing the square method
The idea of completing the square is to transform a quadratic equation to the form of a perfect square equals to a constant, which could be positive or minus. And then solve the equation by taking square root on both sides. For the quadratic equation,
$$x² + 16x - 29 = 0$$
Move the constant term $$-29$$ to the right hand side. Then its sign becomes postive.
$$x^2+16x=29$$
Add square of the half of $$16$$, the coefficient of the linear term to both sides.
$$x^2+16x+\Big(8\Big)^2=29+\Big(8\Big)^2$$
Convert the trinomial to the form of perfect square on the left hand side. Sum on the left hand side. Then,
$$\Big(x+8\Big)^2=93$$
Taking square roots on both sides of above equation gives
$$\sqrt{\Big(x+8\Big)^2}=\pm\sqrt{93}$$
Since the left hand side is square root of a perfect square, we can get rid of radical. Then,
$$x+8=\pm\sqrt{93}$$
Move the constant $$8$$ to the right hand side. Then we get,
$$x_1 = -7$$
$$x_2 = -9$$
3. The vertex of the function $$f(x) = x² + 16x - 29$$
The vertex of a quadratic function could be determined by completing the square method to transform the quadratic function from general form to vertex form.
For the general form of a quadratic function, we can do the following transformation.
$$\begin{aligned} \\f(x)&=ax^2+bx+c\\ & =a(x^2+\dfrac{b}{a}x)+c\\ & =a\Big[x^2+\dfrac{b}{a}x+\Big(\dfrac{b}{2a}\Big)^2-\Big(\dfrac{b}{2a}\Big)^2\Big]+c\\ & =a\Big(x+\dfrac{b}{2a}\Big)^2+c-\dfrac{b^2}{4a}\\ & =a\Big(x+\dfrac{b}{2a}\Big)^2+\dfrac{4ac-b^2}{4a}\\ \end{aligned}$$
Therefore, the corrdinates of the vertex is, $$\Big(\dfrac{-b}{2a},\dfrac{4ac-b^2}{4a}\Big)$$
Here we have, $$a=1$$, $$b=16$$ and $$c=-29$$. Since $$a >0$$, the curve of the function has the vertex at its lowest point. Substitute them to the vertex formula.
$$\begin{aligned} \\x&=\dfrac{-b}{2a}\\ & =\dfrac{-16}{2\cdot 1}\\ & =-8\\ \end{aligned}$$
$$\begin{aligned} \\y_{min}&=\dfrac{4ac-b^2}{4a}\\ & =\dfrac{4\cdot 1\cdot(-29)-16^2}{4\cdot1^2}\\ & =-93\\ \end{aligned}$$
So the coordinates for the vertex of the quadrautic function are $$\Big(-8,-93\Big)$$
4. Graph for the function $$f(x) = x² + 16x - 29$$
Since the discriminat is greater than zero, the curve of the cubic function $$f(x) = x² + 16x - 29$$ has two intersection point with the x-axis