Difference between revisions of "Models and Applications"

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<p>Find a linear equation to solve for the following unknown quantities: One number exceeds another number by <math>17</math> and their sum is <math>31</math>. Find the two numbers.</p>
 
<p>Find a linear equation to solve for the following unknown quantities: One number exceeds another number by <math>17</math> and their sum is <math>31</math>. Find the two numbers.</p>
  
'''Solution''':
 
 
<p>Let <math>x</math> equal the first number. Then, as the second number exceeds the first by 17, we can write the second number as <math>x+17</math>. The sum of the two numbers is 31. We usually interpret the word <em>is</em> as an equal sign.</p>
 
<p>Let <math>x</math> equal the first number. Then, as the second number exceeds the first by 17, we can write the second number as <math>x+17</math>. The sum of the two numbers is 31. We usually interpret the word <em>is</em> as an equal sign.</p>
<math>\begin{array}{ll}x+\left(x+17\right)=31\hfill \\ 2x+17=31\hfill&\text{Simplify and solve}.\hfill & \\ 2x=14\hfill \\ x=7\hfill & \\ \hfill & \\ x+17=7+17=24\hfill \end{array}</math>
+
<math>\begin{array}{ll}x+\left(x+17\right)=31\hfill \\ 2x+17=31 & \text{Simplify and solve}. & \\ 2x=14 \\ x=7 & \\ & \\ x+17=7+17=24 \end{array}</math>
 
<p>The two numbers are <math>7</math> and <math>24</math>.</p>
 
<p>The two numbers are <math>7</math> and <math>24</math>.</p>
  

Revision as of 08:59, 3 November 2021

Many real-world applications can be modeled by linear equations. For example, a cell phone package may include a monthly service fee plus a charge per minute of talk-time; it costs a widget manufacturer a certain amount to produce x widgets per month plus monthly operating charges; a car rental company charges a daily fee plus an amount per mile driven. These are examples of applications we come across every day that are modeled by linear equations. In this section, we will set up and use linear equations to solve such problems.

Writing a Linear Equation to Solve an Application

To set up or model a linear equation to fit a real-world application, we must first determine the known quantities and define the unknown quantity as a variable. Then, we begin to interpret the words as mathematical expressions using mathematical symbols. Let us use the car rental example above. In this case, a known cost, such as $0.10/mi, is multiplied by an unknown quantity, the number of miles driven. Therefore, we can write . This expression represents a variable cost because it changes according to the number of miles driven.

If a quantity is independent of a variable, we usually just add or subtract it according to the problem. As these amounts do not change, we call them fixed costs. Consider a car rental agency that charges $0.10/mi plus a daily fee of $50. We can use these quantities to model an equation that can be used to find the daily car rental cost .

When dealing with real-world applications, there are certain expressions that we can translate directly into math. The table lists some common verbal expressions and their equivalent mathematical expressions.

Verbal Translation to Math Operations
One number exceeds another by a
Twice a number
One number is a more than another number
One number is a less than twice another number
The product of a number and a, decreased by b
The quotient of a number and the number plus a is three times the number
The product of three times a number and the number decreased by b is c

How To: Given a real-world problem, model a linear equation to fit it

  1. Identify known quantities.
  2. Assign a variable to represent the unknown quantity.
  3. If there is more than one unknown quantity, find a way to write the second unknown in terms of the first.
  4. Write an equation interpreting the words as mathematical operations.
  5. Solve the equation. Be sure the solution can be explained in words including the units of measure.

Example: Modeling a Linear Equation to Solve an Unknown Number Problem

Find a linear equation to solve for the following unknown quantities: One number exceeds another number by and their sum is . Find the two numbers.

Let equal the first number. Then, as the second number exceeds the first by 17, we can write the second number as . The sum of the two numbers is 31. We usually interpret the word is as an equal sign.

Failed to parse (unknown function "\hfill"): {\displaystyle \begin{array}{ll}x+\left(x+17\right)=31\hfill \\ 2x+17=31 & \text{Simplify and solve}. & \\ 2x=14 \\ x=7 & \\ & \\ x+17=7+17=24 \end{array}}

The two numbers are and .


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