We learned about a different form of quadratic functions in lesson  10.02 Quadratic functions in factored form . The vertex form of a quadratic function highlights the coordinates of the vertex and, as a result, the axis of symmetry. This reveals the transformations we learned about in lesson  6.05 Transformations of functions , so it is important to know how to rewrite a quadratic function in vertex form.
Use the orange, blue, and red sliders to change the quadratic functions.
One way to represent quadratic functions is using vertex form. This form allows us to identify the coordinates of the vertex of the parabola, as well as the direction of opening and scale factor that compresses or stretches the graph of the function.
When given the graph of the function, we can write the equation in vertex form using transformations.
The x-value of the vertex, h, represents the horizontal translation; the y-value, k, represents the vertical translation; and the leading coefficient, a, represents the shape of the parabola and the direction it opens. The parent function of a quadratic is f(x)=x^2, so writing these translations in function notation becomes af(x-h)+k=a(x-h)^2+k.
When writing a quadratic function from its graph, we can begin by identifying the vertex and substituting these values into the function for h and k. Then, we can use another point on the parabola, like the y-intercept, to help us find the value of a.
The table of values below represents a quadratic function.
x | -4 | -3 | -2 | -1 | 0 | 1 | 2 |
---|---|---|---|---|---|---|---|
p(x) | -5 | 0 | 3 | 4 | 3 | 0 | -5 |
Write the function p(x) in vertex form.
Determine the value of p(x) when x=6.
Determine the x- and y-intercepts of the function.
The quadratic function f\left(x\right) = 2x^2 has been transformed to produce a new quadratic function g\left(x\right), as shown in the graph:
Describe the transformation from f\left(x\right) to g\left(x\right).
Write the equation of the function g\left(x\right) in vertex form.
Describe the transformations of the graph of g(x) resulting in the function h(x)=-2(x+6)^{2} +3.
Sketch the graph of h(x).
Meri throws a rock into Crescent Lake. The height of the rock above ground is a quadratic function of time. The rock is thrown from 4.4 \text{ ft} above ground. After 1.5 seconds, the rock reaches its maximum height of 24 \text{ ft}. Write the quadratic equation in vertex form.
The vertex form of a quadratic function is:
Changing the values of a, h, and k will transform the graph in different ways:
Completing the square is a method we use to rewrite a standard quadratic expression in vertex form.
Completing the square allows us to rewrite our equation so that it contains a perfect square trinomial. A perfect square trinomial takes on the form A^2+2AB+B^2=\left(A+B\right)^2, which is the same format we need to have an equation in vertex form.
For quadratic equations where a=1, we can write them in perfect square form by following these steps:
1 | \displaystyle y | \displaystyle = | \displaystyle x^2+bx+c | |
2 | \displaystyle y | \displaystyle = | \displaystyle x^2+2\left(\frac{b}{2}\right)x+c | Rewrite the x term |
3 | \displaystyle y | \displaystyle = | \displaystyle x^2+2\left(\frac{b}{2}\right)x+\left(\frac{b}{2}\right)^2+c-\left(\frac{b}{2}\right)^2 | Add and subtract \left(\dfrac{b}{2}\right)^2 to keep the equation balanced |
4 | \displaystyle y | \displaystyle = | \displaystyle \left(x+\frac{b}{2}\right)^2+c-\left(\frac{b}{2}\right)^2 | Factor the perfect square trinomial |
5 | \displaystyle y | \displaystyle = | \displaystyle (x-h)^{2}+k | Match the completed square to vertex form |
If a \neq 1, we can first divide through by a to factor it out.
The quadratic equation, when rewritten by completing the square, becomes the vertex form of a quadratic equation.
Consider the following equation:y = x^{2} - 4 x + 6
Rewrite the equation in vertex form by completing the square.
Determine the vertex of the quadratic function and if it is a minimum or maximum.
Sketch the graph of the parabola.
A quadratic function in standard form can be converted to vertex form by completing the square:
1 | \displaystyle y | \displaystyle = | \displaystyle x^2+bx+c | |
2 | \displaystyle y | \displaystyle = | \displaystyle x^2+2\left(\frac{b}{2}\right)x+c | Rewrite the x term |
3 | \displaystyle y | \displaystyle = | \displaystyle x^2+2\left(\frac{b}{2}\right)x+\left(\frac{b}{2}\right)^2+c-\left(\frac{b}{2}\right)^2 | Add and subtract \left(\dfrac{b}{2}\right)^2 to keep the equation balanced |
4 | \displaystyle y | \displaystyle = | \displaystyle \left(x+\frac{b}{2}\right)^2+c-\left(\frac{b}{2}\right)^2 | Factor the perfect square trinomial |
5 | \displaystyle y | \displaystyle = | \displaystyle (x-h)^{2}+k | Match the completed square to vertex form |
If a \neq 1, we can first divide through by a to factor it out.