4.02 Function families

Since the x-values in the table are increasing by 1 each time, we can determine the type of function by observing the rate of change of the outputs of the function.

We can determine the rate of change by finding the differences between the outputs:\begin{aligned}-3-\left(-7\right)&=4\\1-\left(-3\right)&=4\\5-1&=4\\1-5&=-4\\-3-1&=-4 \end{aligned}

Since part of the function has a positive constant rate of change and the other part is a negative constant rate of change, these values represent an absolute value function.

Plotting the points on a graph can also help us easily identify that the points represent an absolute value function.

Observing the outputs of the function, we can see that they are growing at an increasing rate. \begin{aligned}12-8&=4\\18-12&=6\\27-18&=9\\40.5-27&=13.5\end{aligned}

There are only 2 types of functions we know of with a variable rate of change: a quadratic function and an exponential function. A quadratic function will have both an increasing and decreasing interval, but this table may only show an increasing interval portion of a quadratic function. So, we need to take a closer look at the rate of change and see if it fits an exponential pattern.

An exponential function has a constant percent rate of change. Since the x-values increase by 1 each time, we can find this rate of change by dividing the outputs.\begin{aligned} 12\div8&=1.5\\18\div 12&=1.5\\27\div 18&=1.5\\40.5\div 27&=1.5 \end{aligned}Since the ratio of the outputs is the same, this function is exponential.

Recall from Math 1 \text{Common ratio}=1+\text{growth rate} which gives us a decimal for the growth rate. Then, we multiply the rate by 100 to find the constant percent of growth.\begin{aligned}1.5&=1+r\\0.5&=r\\r&=50\%\end{aligned}

This means as x increases by 1, f\left(x\right) increases by 50\%.

Find the average rate of change of the height of the ball in the following intervals:

• 0\leq t\leq 1

• 1\leq t\leq 2

• 2\leq t\leq 3

• 3\leq t\leq 4

The average rate of change is found by \dfrac{f\left(b\right)-f\left(a\right)}{b-a} where a is one endpoint of the interval and b is the other endpoint of the interval.

• 0\leq t\leq 1

  \displaystyle \dfrac{f\left(b\right)-f\left(a\right)}{b-a}	\displaystyle =	\displaystyle \dfrac{f\left(1\right)-f\left(0\right)}{1-0}	Substitute a=0 and b=1
  	\displaystyle =	\displaystyle \dfrac{9-0}{1-0}	Substitute f\left(0\right)=0 and f\left(1\right)=9
  	\displaystyle =	\displaystyle 9	Evaluate the subtraction and division

  Between the time the ball is thrown and 1 second after it is thrown, the ball is traveling an average of 9\text{ ft/s}.

• 1\leq t\leq 2

  \displaystyle \dfrac{f\left(b\right)-f\left(a\right)}{b-a}	\displaystyle =	\displaystyle \dfrac{f\left(2\right)-f\left(1\right)}{2-1}	Substitute a=1 and b=2
  	\displaystyle =	\displaystyle \dfrac{12-9}{2-1}	Substitute f\left(1\right)=9 and f\left(2\right)=12
  	\displaystyle =	\displaystyle 3	Evaluate the subtraction and division

  Between 1 and 2 seconds after the ball is thrown, it is traveling an average of 3\text{ ft/s}.

• 2\leq t\leq 3

  \displaystyle \dfrac{f\left(b\right)-f\left(a\right)}{b-a}	\displaystyle =	\displaystyle \dfrac{f\left(3\right)-f\left(2\right)}{3-2}	Substitute a=2 and b=3
  	\displaystyle =	\displaystyle \dfrac{9-12}{3-2}	Substitute f\left(2\right)=12 and f\left(3\right)=9
  	\displaystyle =	\displaystyle -3	Evaluate the subtraction and division

  Between 2 and 3 seconds after the ball is thrown, it is traveling an average of -3\text{ ft/s}.

• 3\leq t\leq 4

  \displaystyle \dfrac{f\left(b\right)-f\left(a\right)}{b-a}	\displaystyle =	\displaystyle \dfrac{f\left(4\right)-f\left(3\right)}{4-3}	Substitute a=3 and b=4
  	\displaystyle =	\displaystyle \dfrac{0-9}{4-3}	Substitute f\left(3\right)=9 and f\left(4\right)=0
  	\displaystyle =	\displaystyle -9	Evaluate the subtraction and division

  Between 3 seconds and the time the ball hits the ground, it is traveling an average of -9\text{ ft/s}.

Determine the interval(s) the ball is traveling at its fastest speed.

The speed is greatest when the absolute value of the rate of change of the height of the ball is greatest.

From part (a), we found

• The rate of change of the height of the ball in the interval between t=0 and t=1 was found to be 9\text{ ft/s}

• The rate of change of the height of the ball in the interval between t=1 and t=2 was found to be 3\text{ ft/s}

• The rate of change of the height of the ball in the interval between t=2 and t=3 was found to be -3\text{ ft/s}

• The rate of change of the height of the ball in the interval between t=3 and t=4 was found to be -9\text{ ft/s}

The ball was traveling fastest between t=0 and t=1 and between t=3 and t=4.

The rate of change for a function over a specific interval will be positive when the function is increasing and negative when the function is decreasing. In this context, the rate of change is positive when the height of the ball increases. The rate of change is negative when the height of the ball decreases over the time interval.

We were not concerned with the height of the ball, but rather the speed of the ball. This is why a rate of 9\text{ ft/s} is the same as a rate of -9\text{ ft/s}.

Classify the function based on its rate of change.

From part (a), we found the rate of change is variable. We can take a look at how the rates change over time to get a better idea of the function family this function belongs to.

The function begins increasing, then increases at a slower rate until it reaches a maximum value, then decreases at that same rate, then decreases at an increasing rate which was the same rate at which it began increasing.

The pattern of symmetric increasing and decreasing rates means there will be a vertical line of symmetry through the x-value of the maximum point. These features are the characteristics of a quadratic function.

The graph shown in the instructions is an upside down parabola. This is another feature that confirms the function is quadratic.