We've updated our
Privacy Policy effective December 15. Please read our updated Privacy Policy and tap

TEXT
Unlock Solution Steps
Sign in to
Symbolab
Get full access to all Solution Steps for any math problem
By continuing, you agree to our Terms of Use
and have read our Privacy Policy

Study Guides > Intermediate Algebra

Read: Calculate and Interpret Slope

Learning Objectives

  • Define slope for a linear function
  • Calculate slope given two points
One well known form for writing linear functions is known as the slope-intercept form, where [latex]x[/latex] is the input value, [latex]m[/latex] is the rate of change, and [latex]b[/latex] is the initial value of the dependant variable.

[latex]\begin{array}{cc}\text{Equation form}\hfill & y=mx+b\hfill \\ \text{Function notation}\hfill & f\left(x\right)=mx+b\hfill \end{array}[/latex]

We often need to calculate the slope given input and output values. Given two values for the input, [latex]{x}_{1}[/latex] and [latex]{x}_{2}[/latex], and two corresponding values for the output, [latex]{y}_{1}[/latex] and [latex]{y}_{2}[/latex] —which can be represented by a set of points, [latex]\left({x}_{1}\text{, }{y}_{1}\right)[/latex] and [latex]\left({x}_{2}\text{, }{y}_{2}\right)[/latex]—we can calculate the slope [latex]m[/latex], as follows

[latex]m=\dfrac{\text{change in output (rise)}}{\text{change in input (run)}}=\dfrac{\Delta y}{\Delta x}=\dfrac{{y}_{2}-{y}_{1}}{{x}_{2}-{x}_{1}}[/latex]

where [latex]\Delta y[/latex] is the vertical displacement and [latex]\Delta x[/latex] is the horizontal displacement. Note in function notation two corresponding values for the output [latex]{y}_{1}[/latex] and [latex]{y}_{2}[/latex] for the function [latex]f[/latex], [latex]{y}_{1}=f\left({x}_{1}\right)[/latex] and [latex]{y}_{2}=f\left({x}_{2}\right)[/latex], so we could equivalently write

[latex]m=\dfrac{f\left({x}_{2}\right)-f\left({x}_{1}\right)}{{x}_{2}-{x}_{1}}[/latex]

The graph in Figure [latex]5[/latex] indicates how the slope of the line between the points, [latex]\left({x}_{1,}{y}_{1}\right)[/latex] and [latex]\left({x}_{2,}{y}_{2}\right)[/latex], is calculated. Recall that the slope measures steepness. The greater the absolute value of the slope, the steeper the line is. Graph depicting how to calculate the slope of a line The slope of a function is calculated by the change in [latex]y[/latex] divided by the change in [latex]x[/latex]. It does not matter which coordinate is used as the [latex]\left({x}_{2,\text{ }}{y}_{2}\right)[/latex] and which is the [latex]\left({x}_{1},\text{ }{y}_{1}\right)[/latex], as long as each calculation is started with the elements from the same coordinate pair. The units for slope are always [latex]\dfrac{\text{units for the output}}{\text{units for the input}}[/latex] Think of the units as the change of output value for each unit of change in input value. An example of slope could be miles per hour or dollars per day. Notice the units appear as a ratio of units for the output per units for the input.

Calculate Slope

The slope, or rate of change, of a function [latex]m[/latex] can be calculated according to the following: [latex-display]m=\dfrac{\text{change in output (rise)}}{\text{change in input (run)}}=\dfrac{\Delta y}{\Delta x}=\dfrac{{y}_{2}-{y}_{1}}{{x}_{2}-{x}_{1}}[/latex-display] where [latex]{x}_{1}[/latex] and [latex]{x}_{2}[/latex] are input values, [latex]{y}_{1}[/latex] and [latex]{y}_{2}[/latex] are output values.
When the slope of a linear function is positive, the line is moving in an uphill direction across the coordinate axes. This is also called an increasing linear function. Likewise, a decreasing linear function is one whose slope is negative.  The graph of a decreasing linear function is a line moving in a downhill direction across the coordinate axes. In mathematical terms, For a linear function [latex]f(x)=mx+b[/latex] if [latex]m>0[/latex], then [latex]f(x)[/latex] is an increasing function. For a linear function [latex]f(x)=mx+b[/latex] if [latex]m<0[/latex], then [latex]f(x)[/latex] is a decreasing function. For a linear function [latex]f(x)=mx+b[/latex] if [latex]m=0[/latex], then [latex]f(x)[/latex] is a constant function.  Sometimes we say this is neither increasing nor decreasing. In the following example we will first find the slope of a linear function through two points, then determine whether the line is increasing, decreasing, or neither.

Example

If [latex]f\left(x\right)[/latex] is a linear function, and [latex]\left(3,-2\right)[/latex] and [latex]\left(8,1\right)[/latex] are points on the line, find the slope. Is this function increasing or decreasing?

Answer: The coordinate pairs are [latex]\left(3,-2\right)[/latex] and [latex]\left(8,1\right)[/latex]. To find the rate of change, we divide the change in output by the change in input.

[latex]m=\dfrac{\text{change in output}}{\text{change in input}}=\dfrac{1-\left(-2\right)}{8 - 3}=\dfrac{3}{5}[/latex]

We could also write the slope as [latex]m=0.6[/latex]. The function is increasing because [latex]m>0[/latex]. As noted earlier, the order in which we write the points does not matter when we compute the slope of the line as long as the first output value, or y-coordinate, used corresponds with the first input value, or x-coordinate, used.

In the following video we show examples of how to find the slope of a line passing between two points, then determine whether the line is increasing, decreasing or neither. https://youtu.be/in3NTcx11I8

Example

The population of a city increased from [latex]23,400[/latex] to [latex]27,800[/latex] between [latex]2008[/latex] and [latex]2012[/latex]. Find the change of population per year if we assume the change was constant from [latex]2008[/latex] to [latex]2012[/latex].

Answer: The rate of change relates the change in population to the change in time. The population increased by [latex]27,800-23,400=4400[/latex] people over the four-year time interval. To find the rate of change, divide the change in the number of people by the number of years.

[latex]\dfrac{4,400\text{ people}}{4\text{ years}}=1,100\text{ }\dfrac{\text{people}}{\text{year}}[/latex]

So the population increased by [latex]1,100[/latex] people per year. Because we are told that the population increased, we would expect the slope to be positive. This positive slope we calculated is therefore reasonable.

In the next video we show an example where we determine the increase in cost for producing solar panels given two data points. https://youtu.be/4RbniDgEGE4 The following video provides na example of how to write a function that will give the cost in dollars for a given number of credit hours taken, x. https://youtu.be/X3Sx2TxH-J0

Licenses & Attributions

CC licensed content, Original

  • Precalculus. Provided by: OpenStax Authored by: Jay Abramson, et al.. Located at: https://openstax.org/books/precalculus/pages/1-introduction-to-functions. License: CC BY: Attribution. License terms: Download For Free at : http://cnx.org/contents/[email protected]..
  • Revision and Adaptation. Provided by: Lumen Learning License: CC BY: Attribution.
  • Write and Graph a Linear Function by Making a Table of Values (Intro). Authored by: James Sousa (Mathispower4u.com) for Lumen Learning. License: CC BY: Attribution.

CC licensed content, Shared previously

  • Ex: Find the Slope Given Two Points and Describe the Line. Authored by: James Sousa (Mathispower4u.com) . License: CC BY: Attribution.
  • Ex: Slope Application Involving Production Costs. Authored by: James Sousa (Mathispower4u.com) . License: CC BY: Attribution.