6.04 Compare functions across representations

Compare the zeros of the functions.

The zero of a function occurs at y=0, which is where the graph crosses the x-axis. We can label the x-intercepts on each graph to more clearly see where they are.

Looking at the graphs, we can see that the zero of both functions is at the point \left(3, 0\right).

Had we known the equation for each graph, we would have been able to algebraically confirm our answer by substituting 3 in for x in each equation and ensure each results in a value of 0.

Compare the domain and range.

We will analyze the graphs of the functions to determine their domain and range. The domain is the set of all possible x-values, while the range is the set of all possible y-values that the functions can take.

Observing the graph of the square root function, we can see that it starts at x=-1 and extends to the right infinitely. This means the domain of the function is x \geq -1 or [-1,\infty). Observing the y-values, the graph starts at the point (-1, -2) and increases without bound. Thus, the range of the function is y \geq -2 or [-2,\infty).

Observing the graph of the logarithmic function, we can see that it starts at x=2 and extends to the right infinitely. This means the domain of the function is x \gt 2 or (2,\infty). Observing the y-values, the graph extends downward without bound and increases without bound. Thus, the range of the logarithmic function is all real numbers, denoted as (-\infty,\infty).

We can also write the domain and range of the two functions in set notation:

For the square root function:

• Domain: \{x|x\geq -1\}

• Range: \{y|y\geq -2\}

For the logarithmic function:

• Domain: x > 2

• Range: \{y|y\in \Reals\}

Compare the absolute maxima or minima, if any.

Finding the absolute maxima or minima involves identifying the highest or lowest points of the function. These will correspond with the endpoints of the function's range. Since we have already found the domain and range, we can use this information to identify any absolute extrema.

• Domain of square root function: [-1,\infty)
• Range of square root function: [-2,\infty)

• Domain of logarithmic function: (-\infty,\infty)

• Range of logarithmic function: (-\infty,\infty)

From the domain and range information, we can see that the square root function starts at the point (-1, -2) and increases indefinitely. As the function continuously increases, there is no absolute maximum. The absolute minimum occurs at the point (-1, -2).

For the logarithmic function g(x)=\log_{10}(x-2), we observe from the range that the function decreases and increases without bound. This implies that there is no absolute maximum or minimum.

By analyzing the graphs of the square root function and the logarithmic function on the same Cartesian plane, we can visually identify any absolute maxima or minima. The square root function has an absolute minimum at the point (-1, -2), while the logarithmic function has neither an absolute maximum nor an absolute minimum, which confirms our answer.

Compare the end behavior.

Observe the graphs of the functions to determine how the functions behave as x decreases and increases. Focus on the direction and behavior of the functions as they move to the left and to the right on the graph.

Observing the graph of the square root function, we can see that as x approaches -1, the function value approaches -2. As x approaches positive infinity, the function f(x) increases slowly without bound, so the function approaches positive infinity.

For the logarithmic function, we can see that as x approaches 2, the function approaches negative infinity. As x approaches positive infinity, the function g(x) increases slowly without bound, so the function approaches positive infinity.

The end behavior can be written as follows

Square root function:

as x\to -1, f(x)\to -2 and as x\to \infty, f(x)\to \infty

Logarithmic function:

as x\to 2, f(x)\to -\infty and as x\to \infty, f(x)\to \infty

We can see similarities amongst the functions' end behavior. For both functions, as x decreases, both functions are restricted, so x does not decrease infinitely. Additionally, as x approaches positive infinity, both functions approach positive infinity.

Remember that when we look at increasing or decreasing intervals of functions, we usually consider how the function values change as we move from left to right.

When we are looking at the end behavior of functions, we consider how the function values change as the input values get smaller or larger instead.

Compare and contrast the intervals over which the functions are increasing or decreasing.

To compare and contrast the intervals of increasing or decreasing for the functions, we must first determine where, and if, the graph is increasing or decreasing. Since f\left(x\right) is a cubic function, we know it will either increase everywhere or decrease everywhere.

For g\left(x\right), we will examine the pattern in the outputs.

For the function f(x)=-(x+2)^3, it is a cubic function whose graph has been reflected over the x-axis and translated left 2 units compared to the parent function. The parent function, y=x^3, is increasing everywhere, so the reflection will cause our graph to flip. This means f(x) is decreasing for (-\infty, \infty).

For the limited domain given for g(x), we can see that as the x-values increase, the y-values are also increasing. In addition, the function appears to have a cubic relationship. This implies g(x) is increasing everyhwere.

Identify and compare the zeros.

We can find the zero of f(x) algebraically by setting the equation equal to zero and solving for x. To find the zero for g(x), we will use the table of values.

Let's first find the zero of the function f(x):

To find the zero of the function g(x), we can use our table of values. We know the zero of a function occurs where the y-value of the function equals 0. We can see from the table that the function has a zero at x=2.

We can see that both f(x) and g(x) have exactly one zero. The zeros of the two functions are similar, but one is 2 units to the left of the origin while the other is 2 units to the right of the origin.

Compare the intervals where each golf ball is increasing in height.

We can use the graph to determine when f(x) is increasing in height. For g(x), we will examine the functions in the piecewise function to determine when it is increasing.

Looking at the graph of f(x), we can see the function is increasing in height until it reaches its maximum at x=5, and then is decreasing for rest of graph.

f(x) is increasing in height over the interval (0,5).

For the function g(x), we must take a look at what each piece of the piecewise function is representing. The function starts with a cube root function, which is increasing everywhere. Then at x=4, it becomes a linear function with a negative slope, which is decreasing. The final piece is an upward facing parabola, which is decreasing until the vertex at x=9.

g(x) is increasing in height over the interval (0,4).

Describe what g(x)=-2.4x+19.125 for 4\leq x\lt 7.5 represents in context.

Graph g \left( x \right), then use the context to interpret the piecewise function graphically.

In this part of the function, the golf ball's height decreases linearly with time. This occurs within the time interval 4 to 7.5 seconds. During this time, the ball hits a tree and ricochets off, causing it to lose height as it moves towards the sand trap.

Determine whose ball goes higher.

Compare the maximum values of the graphs of Ameth's ball and Massiel's ball.

Ameth's ball reaches a maximum height of 30 \text{ ft} while Massiel's ball reaches a maximum height of just over 9 \text{ ft}. Ameth's ball clearly goes higher.

We used the graph of g(x) to approximate the maximum height, but we could have found the precise height by substituting x=4 into the function g(x)=-2.4x+19.125.

Massiel's ball reaches a maximum height of 9.525\text{ ft}.