# Desmos

Desmos is a free online graphing calculator. Some classes at NCSSM require its usage, but it is a tool that any student of mathematics will appreciate. Here are enumerated some of the simple and complex functions of the software you might find useful. If this page is not sufficient, see the Desmos user guide for more information.

Below is a brief description of how to effectively use the Desmos online graphing calculator. Click the images to enlarge them.

## Graphing

### Functions

Simple functions of one variable can be graphed in three ways:

Typing the equation

Typing and then the equation

Typingand then the equation

Functions can be hidden from the graph by clicking the colored circle to the left of their equation.

Functions can be functions of other functions. For example:

Functions can be graphed with in terms of :

Functions can be of multiple variables. For example,and .

#### Parametric Equations

In Desmos you can graph parametric equations. The standard form of this is . For example, . It is necessary to use the variable in order for the equation to be interpreted as a parametric equation.

#### Implicit Functions

Solutions of equations involving and can be plotted without solving for or .

### Points and Tables

Points can be graphed in two ways. One way is by clicking the plus in the upper left, and then selecting table. Points can be added manually, or pasted in from an outside source, such as Logger Pro. The points will appear on the graph, but the viewport will not scale to accommodate them. To do this, see Resizing the viewport.

For an interactive demonstration of how to add points to a table, click here.

The other way to graph points is by adding them in the form .

Movable points can be graphed by setting one or both of the parameters to variables:. Movable points can be moved either with the sliders or by clicking and dragging the point. You can restrict a movable point to being on a function by graphing it in the form .

You can add multiple points by separating them with commas, like so: . Points added this way cannot be accessed as a list of x and y values, unlike points in a table.

### Variables and Sliders

Sometimes, for example, when looking for the value of a constant or seeing how a function reacts to a change in one of its parts, it is useful to use a slider. Sliders represent a named variable.

To add a slider, write a function with a free variable, such as , then click on "add slider: m".

Another way to add variables is to type the variable letter, "=", and then a starting value. For example, .

Clicking on either of the constraints of a slider allows you to set the minimum, maximum, and step values.

For an interactive demonstration of how to use sliders, click here.

### Regressions (Linear, quadratic, etc)

Performing regression analysis of data in Desmos is simple. First, enter the data points in a table as explained in Graphing Points.

Next, decide on the type of regression. If you want to do a linear regression, the equation would take the form . If you want a quadratic regression, the equation would look like . The enterprising student can extrapolate this to any form they would like, such as.

After you have decided the form your equation should take, substitute "" with "", "" with "", and "" with . For example, to do a linear regression, you would enter . This is saying: "find the constant values m and b that best satisfy for every and in my table, where and . See the examples below for a demonstration.

Desmos will find the best constants that fit the points and function you put in. The value of each constant is shown under your function entry. As you can see, the function it finds is not always in the correct form. (This is because you provide the form, Desmos only finds the best values for the free variables that it can.) Above, the same points were used, but a line and a parabola were both found. The equation you get out is only as good as the equation form you put in.

One way to check whether the form of the function is correct is to plot the residuals, and see if there is a pattern. If you see a clear trend, such as the residuals moving in a straight line, parabola, or sinusoidal curve, you know you chose the wrong function to model your data, even if the r-value is small.

See Desmos regressions tour for an interactive demonstration for plotting regressions.

### Restrictions

It can be useful to restrict the domain or range of a function. To do this, add a restriction of the form directly onto the end of a function. This works with any variable: for a function of {\displaystyle c} where c should be greater than 4, type .

### Inequalities

Desmos also has the capability to graph inequalities. Simple inequalities are easy: type an expression followed by a comparison sign (e.g. , ) and then a value. For example, . A slightly more complicated example might be

You can also use this on functions you define. For example, say you're modeling compound interest, and want to set up an inequality for the space under the curve. To do this, define a function for amount given time, , and an inequality . Notice the use of instead of . Desmos is picky about variables, and for inequalities it implicitly defines and as the input and output.

We can use this powerful tool in tandem with restrictions. To graph the area between functions and , all we have to do is type .

## Built-in Functions and Symbols

Desmos comes with many built in functions and symbols. Here are some of the documented and undocumented ones. Most of these can be accessed by opening the keyboard and clicking "functions".

### Variables

theta | A variable, like |

### Constants

pi | The constant 3.14... | |

tau | The constant 6.28... | |

e | The constant 2.71... |

### Exponent and Log Functions

exp(x) | exp(x) | |

ln(x) | ln(x) | The natural log of x |

log(x) | log(x) | The log (base 10) of x |

log_n(x) | The log (base n) of x | |

x^n | x to the nth power | |

sqrtx | The square root of x | |

nthrootx | The generalized root function. |

### Precalculus and Calculus Functions

sum | The summation operator | |

prod | The product operator. | |

int | The integral operator. | |

d/dx | The differential operator. Can be used on functions. |

### Trig Functions

sin(x) | arcsin(x) or | sinh(x) |

cos(x) | arccos(x) or | cosh(x) |

tan(x) | arctan(x) or | tanh(x) |

sec(x) | arcsec(x) or | sech(x) |

csc(x) | arccsc(x) or | csch(x) |

cot(x) | arccot(x) or | coth(x) |

### Stats and Probability Functions

total() | Sum of all elements in a list |

length() | Number of elements in a list |

mean() | Mean of a list |

median() | Median element in a list |

min() | Minimum element in a list |

max() | Maximum element in a list |

quantile() | The quantile function |

mad() | Mean absolute deviation |

stdev() | Sample standard deviation |

stdevp() | Population standard deviation |

var() | Variance |

cov() | Covariance |

corr() | Pearson correlation coefficient of two lists |

nCr() | Number of combinations |

nPr() | Number of permutations |

Factorial |

### Miscellaneous Functions

lcm(a,b) | The least common multiple of a and b |

gcd(a,b) | The greatest common denominator of a and b |

mod(a, b) | The modulo function |

ceil(x) | The closest integer above x |

floor(x) | The closest integer below x |

round(x) | The closest integer to x |

sign(x) | The sign of x |

abs(x) | The absolute value function |

The absolute value operator | |

a%b | a percent of b |

## Making graphs easier to read

### Resizing the viewport

The viewport (the section of the coordinate plane visible onscreen) can be resized to give a better view of your data and functions. One way to resize it is to scroll down to zoom out, and up to zoom in, and to click and drag to move. This method, however, keeps the ratio of the domain and range constant. Sometimes it is useful to be able to zoom to an arbitrary window.

To do this, click the wrench in the top right corner (graph settings). After this, a window will appear. In this window, there are inequalities for and ( and) which can be edited to resize the viewport with the domain set by and range set by.

### Changing line colors/styles

If you have many functions graphed, it can be useful to change their appearance. To do this, perform a long left click on the icon to the left of the function definition. From here, you may change the style to dashed, dotted, or unbroken, and the color to one of six options.

### Projector mode

When saving images for reports or projects, it can be useful to have thicker, fuller lines and larger text. To enable this, go to graph settings and enable "Projector Mode".