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{{ printedBook.courseTrack.name }} {{ printedBook.name }} ### Concept

A quadratic function is a polynomial function of degree That means that the highest exponent of the independent variable is The standard form of a quadratic function is expressed as follows.

Here, and are real numbers and The simplest quadratic function is and the graph of any quadratic function is a parabola. ### Concept

The inherent shape of parabolas gives rise to several characteristics that all quadratic functions have in common.

### Direction

A parabola either opens upward or downward. This is called its direction. ### Vertex

Because a parabola either opens upward or downward, there is always one point that is the absolute maximum or absolute minimum of the function. This point is called the vertex. At the vertex, the function changes from increasing to decreasing, or vice versa.

### Axis of Symmetry

All parabolas are symmetric, meaning there exists a line that divides the graph into two mirror images. For quadratic functions, that line is always parallel to the -axis, and is called the axis of symmetry. The axis of symmetry always intersects the vertex of the parabola, and is written as a vertical line, where can be any real number.

### Zeros

Depending on its rule, a parabola can intersect the -axis at or points. Since the function's value at an -intercept is always these points are called zeros, or sometimes roots. ### -intercept

Because all graphs of quadratic functions extend infinitely to the left and right, they each have a -intercept anywhere along the -axis.

## Characteristics of Quadratic Functions in Standard Form

When a quadratic function is written in standard form, it's possible to use and to determine characteristics of its graph.

### Direction

The direction of the graph is determined by the sign of To understand why, consider the quadratic function Since all squares are positive, will always be positive. When is positive, then is also positive. Thus, when moving away from the origin in either direction, the graph extends upward. Similarly, when is negative, will be negative. Thus, the graph will extend downward for all -values.

### -intercept

The -intercept of a quadratic function is given by specifically at This is because substituting into standard form yields the following.

### Axis of Symmetry

The equation of the axis of symmetry can be found using the coefficients and It is derived from the fact that the axis of symmetry divides the parabola in two mirror images. Two points with the same -value are, thus, equidistant from the axis of symmetry. This gives rise to a quadratic equation where the solution is the axis of symmetry.

## Vertex Form

Vertex form is an algebraic format used to express quadratic function rules.

In this form, gives the direction of the parabola. When the parabola faces upward and when it faces downward. The vertex of the parabola lies at and the axis of symmetry is Consider the graph of From the graph, we can connect the following characterisitcs to the function rule.

Notice that although the factor in the function rule shows is actually equal to This coincides with a horizontal translation of a quadratic function.

## Factored Form of a Quadratic Function

Quadratic function rules can be expressed in factored form, sometimes referred to as intercept form.

As is the case with standard form and vertex form, gives the direction of the parabola. When the parabola faces upward, and when it faces downward. Additionally, the zeros of the parabola lie at Because the points of a parabola with the same -coordinate are equidistant from the axis of symmetry, the axis of symmetry lies halfway between the zeros. Consider the graph of From the graph, the following characteristics can be connected to the function rule.

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Exercise

For the following functions, determine the direction, the axis of symmetry, vertex, and zeros.

Show Solution
Solution
We'll focus on each function individually, starting with

### Characteristics of

Notice that the function rule of is written in factored form since it's written as a product two binomials. We'll start by identifying 's direction. It's determined by the sign of the coefficient in front of the factors. When a function doesn't have a number in front of the factors it can be interpreted as Since is positive, the parabola will face upward. Moving on, when a function is in factored form it's straightforward to find its zeros. They can be found by solving Using the Zero Product Property we find  and Therefore, the zeros of the function are The axis of symmetry, axis of symmetry, can now be found using the zeros since it lies halfway between them. Add the -coordinates and divide the sum by
Thus, the axis of symmetry is Lastly, we can find the vertex by determining the function value of the axis of symmetry, The vertex is located at and it is the absolute minimum of the function since  opens upward. The characteristics of the function can be concluded as follows.

### Characteristics of

The function rule of is written in vertex form The direction is given by the sign of the number in front of the binomial. Since is negative, the direction is downward. The vertex of the parabola is the point Thus, the vertex of the function is Since the direction of the function is downward, the vertex is an absolute maximum. Because the axis of symmetry intersects the vertex, its equation is What remains is to find the zeros of the function. This is done by solving the equation for
Solve for
Thus, the zeros of the function are and We have now found all of the characteristics of the function

### Characteristics of

The function rule of is expressed in standard form. Therefore, the values of and can be used to determine its characteristics. The direction is given by the sign of the coefficient in front of Since is positive, the direction is upward. For quadratic functions in standard form, the axis of symmetry can be found by We already stated that and is the coefficient of the -term. Thus, We can substitute  and in the formula to find the axis of symmetry. Thus, the axis of symmetry is We can now find the vertex by calculating the function value
The vertex of the function is Since the direction is upward, it's an absolute minimum. Finally, the zeros of can be found by solving the equation Since is in standard form we'll use the quadratic formula.
Thus, the zeros are and We have now determined the characteristics for the function

## Average Rate of Change

A function's rate of change gives an indication of how its outputs () change with respect to its inputs ().

When the rate of change is constant, the function is linear. However, when the function is not linear, it's possible to determine an average rate of change over an arbitrary interval. This is an increase or decrease between the endpoints of the interval. If the -coordinates of the endpoints are and and the function is the average rate of change is defined as follows.

The definition is similar to the slope formula. In fact, the average rate of change can be interpreted as the slope of the line going through the endpoints of the interval.
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Exercise Determine the average rate of change over the interval

Show Solution
Solution

To determine the average rate of change, we must know the -values of the endpoints. Since the interval is the -values are and Let's mark these points on the graph to find their corresponding function values. The -values are and Now, we can determine the average rate of change using the formula.
The average rate of change over the interval is