4. Polynomial Functions

Quadratic Functions

4. Polynomial Functions

Quadratic Functions

1:48 minutes

Problem 7

Textbook Question

The graph of a quadratic function is given. Write the function's equation, selecting from the following options.
$f (x) = x^{2} + 2 x + 1$
$h (x) = x^{2} - 1$

Verified step by step guidance

Step 1: Identify the general form of the quadratic function, which is $y = ax^2 + bx + c$.

Step 2: Use the point where the graph crosses the y-axis, which is the y-intercept. From the graph, this point is $(0, -20)$, so substitute $x=0$ and $y=-20$ into the equation to find $c$. This gives $-20 = a(0)^2 + b(0) + c$, so $c = -20$.

Step 3: Use the other given point on the graph, $(3, -2)$, and substitute $x=3$, $y=-2$, and $c=-20$ into the equation: $-2 = a(3)^2 + b(3) - 20$.

Step 4: Simplify the equation from Step 3 to get $-2 = 9a + 3b - 20$. Rearrange it to \$9a + 3b = 18$.

Step 5: To find $a$ and $b$, you need another equation. Use the vertex form or the fact that the vertex is at $x=2$ (since the maximum point is between 2 and 3 on the graph). Use the vertex formula $x = -\frac{b}{2a}$ to set up the second equation: \$2 = -\frac{b}{2a}$. Solve this system of two equations to find $a$ and $b$.

Verified video answer for a similar problem:

This video solution was recommended by our tutors as helpful for the problem above

Video duration:

Was this helpful?

Key Concepts

Here are the essential concepts you must grasp in order to answer the question correctly.

Quadratic Function and Its Standard Form

A quadratic function is a polynomial of degree two, typically written as f(x) = ax^2 + bx + c. The graph of a quadratic function is a parabola that opens upward if a > 0 and downward if a < 0. Understanding the standard form helps in identifying the coefficients and how they affect the shape and position of the parabola.

Using Points to Determine the Quadratic Equation

Given points on the graph, such as (0, -20) and (3, -2), you can substitute these coordinates into the quadratic equation to form a system of equations. This system can be solved to find the values of a, b, and c, which define the specific quadratic function that fits the graph.

Interpreting the Y-Intercept and Vertex

The y-intercept of a quadratic function is the point where the graph crosses the y-axis, given by (0, c). The vertex is the highest or lowest point on the parabola, indicating the maximum or minimum value of the function. Identifying these points from the graph helps in writing or verifying the quadratic equation.

Watch next

Master Properties of Parabolas with a bite sized video explanation from Patrick

Start learning

Related Videos

Related Practice

Textbook Question

Fill in the blank(s) to correctly complete each sentence. The highest point on the graph of a parabola that opens down is the ____ of the parabola.

681

views

Textbook Question

Fill in the blank(s) to correctly complete each sentence. The vertex of the graph of ƒ(x) = x² + 2x + 4 has x-coordinate ____ .

840

views

Textbook Question

The graph of a quadratic function is given. Write the function's equation, selecting from the following options.

$f (x) = x^{2} + 2 x + 1$

$h (x) = x^{2} - 1$

2320

views

Textbook Question

In Exercises 5–6, use the function's equation, and not its graph, to find (a) the minimum or maximum value and where it occurs. (b) the function's domain and its range. $f (x) = - x^{2} + 14 x - 106$

700

views

Textbook Question

Solve each problem. During the course of a year, the number of volunteers available to run a food bank each month is modeled by $V (x)$ , where $V (x) = 2 x^{2} - 32 x + 150$ between the months of January and August. Here x is time in months, with x=1 representing January. From August to December, $V (x)$ is modeled by $V (x) = 31 x - 226$ . Find the number of volunteers in each of the following months. Sketch a graph of $y = V (x)$ for January through December. In what month are the fewest volunteers available?

540

views

Textbook Question

Solve each problem. During the course of a year, the number of volunteers available to run a food bank each month is modeled by $V (x)$ , where $V (x) = 2 x^{2} - 32 x + 150$ between the months of January and August. Here x is time in months, with x=1 representing January. From August to December, V(x) is modeled by $V (x) = 31 x - 226$ . Find the number of volunteers in each of the following months.