Wolfram Function Repository
Instant-use add-on functions for the Wolfram Language
Function Repository Resource:
Function
Compute the discontinuities of a function of a single variable
Contributed by:
Wolfram|Alpha Math Team
ResourceFunction["FunctionDiscontinuities"][f,x] computes the values of x at which f(x) is discontinuous with respect to x. | |
ResourceFunction["FunctionDiscontinuities"][{f,cond},x] computes the x for which cond is True and f(x) is discontinuous with respect to x. | |
ResourceFunction["FunctionDiscontinuities"][…,x,"Properties"] computes points of discontinuity along with related information about each. |
Details and Options
ResourceFunction["FunctionDiscontinuities"] has the attribute HoldFirst.
ResourceFunction["FunctionDiscontinuities"] takes the option "ExcludeRemovableSingularities", having default value False, that determines whether to exclude removable discontinuities from the result.
A function f(x) is said to have a removable discontinuity at a point x=a if the limit of f(x) as x→a exists and is independent of the direction in which the limit is taken, but has a value that is different from f(a) (which may or may not be defined).
Examples
Basic Examples (6)
Compute the points of discontinuity of a rational function:
| In[1]:= | ![ResourceFunction["FunctionDiscontinuities"][(x - 3)/(x + 4), x]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/28db5cbcb3d149dd.png){kind=small} |
| Out[1]= |  |
Repeat the calculation, classifying the points of discontinuity:
| In[2]:= | ![ResourceFunction["FunctionDiscontinuities", ResourceVersion->"10.0.0"][(x - 3)/(x + 4), x, "Properties"]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/21bfcbfff01f6e27.png){kind=small} |
| Out[2]= |  |
Compute the points of discontinuity of a trigonometric function:
| In[3]:= | ![ResourceFunction["FunctionDiscontinuities"][Tan[x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/3ef02aa13d3b20d2.png){kind=small} |
| Out[3]= |  |
Repeat the calculation, classifying the points of discontinuity:
| In[4]:= | ![ResourceFunction["FunctionDiscontinuities"][Tan[x], x, "Properties"]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/526abe1e5b1ba6c9.png){kind=small} |
| Out[4]= |  |
Compute the points of discontinuity of a smooth function:
| In[5]:= | ![ResourceFunction["FunctionDiscontinuities"][E^x *Sin[x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/5b419cc0477866f1.png){kind=small} |
| Out[5]= |  |
Compute and plot the points of discontinuity of a rational function:
| In[6]:= | ![f[x_] := (-12 - x + x^2)/(8 + 2 x - 5 x^2 + x^3);
ResourceFunction["FunctionDiscontinuities"][f[x], x, "Properties"]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/01d4540b745a722b.png){kind=small} |
| Out[7]= |  |
| In[8]:= | ![Plot[f[x], {x, -5 , 5}, ExclusionsStyle -> {{Red, Dashed}, {PointSize -> 0.02}}]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/352e445e78a40204.png){kind=small} |
| Out[8]= |  |
Compute and plot the points of discontinuity of a step function:
| In[9]:= | ![f[x_] := HeavisideTheta[x];
ResourceFunction["FunctionDiscontinuities"][f[x], x, "Properties"]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/07cd21b306557f6f.png){kind=small} |
| Out[10]= |  |
| In[11]:= | ![Plot[f[x], {x, -5 , 5}, ExclusionsStyle -> {{Red, Dashed}, {PointSize -> 0.02}}]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/7036338181ba4592.png){kind=small} |
| Out[11]= |  |
Compute and plot the points of discontinuity of a step function:
| In[12]:= | ![f[x_] := Piecewise[{{Sin[x], x < 1}, {Cos[x], x > 1 && x < 3}}, x - 3];
ResourceFunction["FunctionDiscontinuities"][f[x], x, "Properties"]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/2662cbc171e13584.png){kind=small} |
| Out[13]= |  |
| In[14]:= | ![Plot[f[x], {x, -5 , 5}, ExclusionsStyle -> {{Red, Dashed}, {PointSize -> 0.02}}]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/23a4a9ce3ff18ede.png){kind=small} |
| Out[14]= |  |
Options (1)
Choose whether to exclude removable singularities:
| In[15]:= | ![f[x_] := (x^3 + 8)/(x^3 + 3 x^2 - 4 x - 12);
Plot[f[x], {x, -5, 5}, ExclusionsStyle -> {{Red, Dashed}, {PointSize -> 0.02}}]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/659a1109adb41b59.png) |
| Out[16]= |  |
| In[17]:= | ![ResourceFunction["FunctionDiscontinuities"][f[x], x, "ExcludeRemovableSingularities" -> True]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/00fb6085fcaf1aa7.png){kind=small} |
| Out[17]= |  |
| In[18]:= | ![ResourceFunction["FunctionDiscontinuities"][f[x], x, "ExcludeRemovableSingularities" -> False]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/47c44c7acdbf71f4.png){kind=small} |
| Out[18]= |  |
Properties and Relations (1)
FunctionDiscontinuities has the attribute HoldFirst, enabling calculations such as the following:
| In[19]:= | ![ResourceFunction["FunctionDiscontinuities"][x/x, x]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/158fafb5e26f9678.png){kind=small} |
| Out[19]= |  |
Possible Issues (1)
Points where a function approaches ±∞ are considered to be points of discontinuity, even if they are technically outside the range of function definition:
| In[20]:= | ![ResourceFunction["FunctionDiscontinuities"][Log[x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/061/06174cf2-8e7f-4c84-980c-621f2627a740/10-0-0/47ba4744ad521393.png){kind=small} |
| Out[20]= |  |
Publisher
Related Links
- Discontinuity Calculator–Wolfram|Alpha Calculators
- Solve Discontinuous Function Problems with Wolfram|Alpha–Wolfram|Alpha Blog
- Discontinuity–Wolfram MathWorld
- Jump Discontinuity–Wolfram MathWorld
- Removable Discontinuity–Wolfram MathWorld
- Calculus–Wolfram|Alpha Products
Version History
- 10.0.1 – 27 March 2023
- 10.0.0 – 23 March 2023
- 9.0.0 – 23 March 2023
- 8.0.0 – 24 March 2020
- 7.0.0 – 10 September 2019
- 6.0.0 – 06 September 2019
- 5.0.0 – 05 September 2019
- 4.0.0 – 31 July 2019
- 3.0.0 – 12 June 2019
- 2.0.0 – 11 June 2019
- 1.0.0 – 09 January 2019
Related Resources
License Information
This work is licensed under a Creative Commons Attribution 4.0 International License