To find the x-intercepts, locate the places where the parabola crosses the x-axis.

To find the y-intercepts, locate the place where the parabola crosses the y-axis.

We can identify the intercepts on the graph:

From the graph we can see the there are two x-intercepts at \left(-4, 0\right) and \left(2, 0 \right), and there is one y-intercept at (0,8).

To find the domain of g(x), we want to find all possible x-values for which g(x) could be graphed.

To find the range, we want to find all possible values of g(x). The vertex of a parabola affects the range of the function, as it will be the maximum or minimum value of g(x).

We can see that for a parabola, there are no restrictions on which x-values can be graphed as each side of the parabola continues infinitely in either x-direction.

This parabola opens down, so the y-value of the vertex is the maximum value of the function. The parabola continues infinitely in the negative y-direction.

Domain:- \infty < x < \infty

Range: - \infty < y \leq 9

g(x) is increasing where the output values become larger as its input values become larger.

g(x) is decreasing where the output values become smaller as its input values become larger.

Parabolas change from increasing to decreasing or decreasing to increasing about the x-value of the vertex.

We can see from the graph of g(x) that the parabola has positive slope up until x=-1 and negative slope after x=-1.

The function is neither increasing or decreasing at the vertex.

Increasing: x < -1

Decreasing: x > -1

In order to find the intervals for where the function is positive, we want to find the set of x-values where the parabola lies above the x-axis.

Similarly, to find the intervals where the function is negative, we want to find the set of x-values where the parabola lies below the x-axis.

The x-intercepts are where the function crosses the x-axis, in other words where the function is equal to 0. These values will help us determine where the function is positive and negative.

We can see that the parabola lies above the x-axis between x=-4 and x=2. We can also see that the parabola lies below the x to the left of x=-4 and to the right of x=2.

Positive: -4 < x < 2

Negative: x < -4, x > 2

In order to find the end behavior, we want to find the y-value that the function approaches as the x-values approach positive and negative infinity. We can see on the graph that as the x-values on the parabola get larger in either direction, the parabola continues downwards, or towards - \infty.

x \to \infty, y \to - \infty

x \to - \infty, y \to - \infty

We want to find the place where the parabola crosses the y-axis.

Once we find the y-intercept, we want to connect this to the context of the softball. Since the y-axis represents the height of the softball in feet above ground, we can use it to identify the height of the softball at 0 seconds.

We can identify the y-intercept on the graph:

The y-intercept is \left(0, 6\right)

The y-intercept tells us that the softball was thrown from a height of 6 feet above the ground.

We want to find the place where the parabola crosses the x-axis.

Once we find the x-intercept, we want to connect this to the context of the softball. Since the x-axis represents the time in seconds after being thrown, we can use it to identify at how many seconds does the softball hit the ground.

We can identify the x-intercept on the graph:

The x-intercept is \left(3, 0\right)

The x-intercept tells us that the softball hits the ground 3 seconds after it was thrown in the air.

In order to find the vertex, we want to find the maximum point of the parabola.

Once we find the vertex, we want to connect this to the context of the softball. We know that the x-value of the vertex represents time in seconds after the softball is thrown and the y-value of the vertex represents the height of the softball above ground in feet.

We can identify the vertex on the graph:

The vertex is \left(1.25, 12 \right)

After 1.25 seconds, the softball reaches a maximum height of 12 feet above ground.