Wolfram Function Repository
Instant-use add-on functions for the Wolfram Language
Function Repository Resource:
IsTranscendental
Check whether a number is transcendental
Contributed by:
Wolfram|Alpha Math Team
Details and Options
A number is transcendental if it is not a root of any univariate polynomial with integer coefficients. Otherwise, the number is algebraic.
Some numbers are not known to be algebraic or transcendental. In these cases, ResourceFunction["IsTranscendentalNumber"] returns unevaluated.
Examples
Basic Examples (2)
Check whether 10 is transcendental:
| In[1]:= | ![ResourceFunction["IsTranscendentalNumber"][10]](https://www.wolframcloud.com/obj/resourcesystem/images/a5e/a5eace1d-0f2b-415f-8829-4f0ce6392404/050bbfdbc9e7d7f7.png){kind=small} |
| Out[1]= |  |
Check whether π is transcendental:
| In[2]:= | ![ResourceFunction["IsTranscendentalNumber"][\[Pi]]](https://www.wolframcloud.com/obj/resourcesystem/images/a5e/a5eace1d-0f2b-415f-8829-4f0ce6392404/3dbe1dd8b909296b.png){kind=small} |
| Out[3]= |  |
Possible Issues (1)
Some numbers are not known to be algebraic or transcendental. In these cases, IsTranscendentalNumber returns unevaluated:
| In[4]:= | ![ResourceFunction["IsTranscendentalNumber"][Pi^Pi]](https://www.wolframcloud.com/obj/resourcesystem/images/a5e/a5eace1d-0f2b-415f-8829-4f0ce6392404/5d1dcb795c626afe.png){kind=small} |
| Out[4]= |  |
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Version History
- 2.0.0 – 23 March 2023
- 1.1.0 – 12 May 2021
- 1.0.0 – 13 March 2020
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License Information
This work is licensed under a Creative Commons Attribution 4.0 International License