2.07 Modeling linear relationships

Brainstorm a list of questions that can be answered to help solve this problem.

A possible list of brainstormed ideas might be:

• What are the different food requirements based on size or age?

• How many people are in a family?

• What are the current food costs in my area?

The brainstorming will help identify assumptions that need to be made in order to create a model.

Research and determine how a model can be used to solve the problem.

In order to answer the questions in our brainstorm, there are a few things we need to decide:

• How the dietary needs of people differ.
• How our model can apply to different types of families.
• How food costs are calculated.
• What span of time we are using: daily cost, weekly cost, monthly cost, or other.

One possible approach to this problem could be:

We will create a model that outputs the daily cost to feed a single person based on their age. The cost to feed a family can then be determined by combining the costs of each individual in the family.

The caloric needs will come from dietaryguidelines.gov and we will find the cost of a meal plan for a single day that meets the main nutrition requirements (calories, proteins, carbohydrates, and fats) for the different age groups. Instead of creating different models for different genders, we will use the average nutritional needs between males and females of the same age group. We will research the average cost of each food on the meal plan, paying attention to cost-effective choices, since we are trying to calculate the minimum costs.

Some of the assumptions made in this problem statement include:

• Age is the main influence in caloric need.
• One meal plan can be used to calculate the costs for every day.
• The average nutritional needs of males and females will make a good representation of the nutritional needs of any person.

As we build and test our model, we can revisit these assumptions to see if they should be changed or updated to better reflect the problem.

Identify the independent and dependent variables of the model.

The independent variable is the age of the person and the dependent variable is the daily cost to feed that person.

Identify the parameters of the model.

The calories for each age category are a parameter since they are known, fixed, values. For example, for the age group 9-13 we will have a calorie requirement of 1700 calories.

The amount of daily macronutrients is also a parameter since it is a known fixed value once the number of calories is determined:

We've uncovered additional assumptions by defining a few parameters in the problem. For example, the average calories needed in the age group 9-13 years old is 1700, but the chart for macronutrients only lists 1600 and 1800. We will need to revisit our original assumption (averaging the gender needs) or make a new assumption (average the macronutrient needs).

Create a model that can be used to determine the cost of feeding an individual based on their age.

There are many different models that all satisfy different requirements. Since we are provided data in a table, we can efficiently convert this to a visual model with a graph.

When creating a graph, the independent variable should be represented by the x-axis and the dependent variable by the y-axis. Be sure to choose a scale that shows the domain and range.

We can start by plotting each point in the table:

Analyzing the graph, we can see that the daily cost increases until age 30 and then decreases until age 70. This analysis helps guide our choice of model.

If we assume that the daily cost changes at an approximately linear rate, then we can use a linear piecewise model:

If we don't make the assumption of linear rate of change, we could use a step function to model the daily costs instead:

Since the points on the graph are not very symmetric, an absolute value function is not a good model for the data in the table:

Create a different model that can be used to determine the cost of feeding an individual based on their age.

Algebraic models like equations and functions, are useful since they can be quickly evaluated for any value in the domain. For a secondary model, we'll create an equation.

Since the cost is increasing from age 3 to 30 and then decreasing from 30 to 70, we'll need two separate equations to model this data.

Create a piecewise-defined function for each age range:f(x) = \begin{cases} ⬚, & 3 \lt x \leq 30 \\ ⬚, & 30 \lt x \leq 70 \end{cases}

To create a linear function for ages 3 to 30, we can use the points \left(3,5.07\right) and \left(30,9.17\right).

First, find the slope:

Then, use the point-slope formula to find the equation:

Then we need to repeat this process for age 30 to 70:

Use \left(30,9.17\right) and \left(70,7.75\right) to find the slope and equation:

So, with both equations our piecewise function is:f(x) = \begin{cases} 0.15x+4.62, & 3 \lt x \leq 30 \\-0.04x+7.97, & 30 \lt x \leq 70 \end{cases}

Determine how the assumptions used in parts (a) and (b) could be revised to create a better model.

First, we need to acknowledge where our model is less accurate. Then, we can brainstorm ways to make improvements.

Consider our models from parts (a) and (b).

We can see on the graph, that our linear model underestimates the daily cost for 8, 13, and 18 year-olds. If we use our piecewise-defined function we can see that the estimated daily cost for a 13 year old is \$ 6.57.

However, according to the table, the daily cost for a 13 year old should be \$8.19 which means our model underestimates the true cost by \$1.62 which would add up to \$ 591.30 each year.

One way to improve the model is to define a linear function for ages 3-13 where the rate is higher, and then a different linear function for ages 13-30 where the rate is less.

We can see from the graph that this model is a better estimation for ages 8, 13, and 18 than the previous model.

Other improvements to the model could be to extend the model to include the daily cost to feed children under 3 years of age and the daily cost to feed adults over the age of 70.