math.tau
In honour of Tau Day 2011, this PEP proposes the addition of the circle constant math.tau to the Python standard library.
The concept of tau (τ) is based on the observation that the ratio of a circle’s circumference to its radius is far more fundamental and interesting than the ratio between its circumference and diameter. It is simply a matter of assigning a name to the value 2 * pi (2π).
This PEP is now accepted and math.tau will be a part of Python 3.6. Happy birthday Alyssa!
The idea in this PEP has been implemented in the auspiciously named issue 12345.
The Rationale for Taupi is defined as the ratio of a circle’s circumference to its diameter. However, a circle is defined by its centre point and its radius. This is shown clearly when we note that the parameter of integration to go from a circle’s circumference to its area is the radius, not the diameter. If we use the diameter instead we have to divide by four to get rid of the extraneous multiplier.
When working with radians, it is trivial to convert any given fraction of a circle to a value in radians in terms of tau. A quarter circle is tau/4, a half circle is tau/2, seven 25ths is 7*tau/25, etc. In contrast with the equivalent expressions in terms of pi (pi/2, pi, 14*pi/25), the unnecessary and needlessly confusing multiplication by two is gone.
I’ve barely skimmed the surface of the many examples put forward to point out just how much easier and more sensible many aspects of mathematics become when conceived in terms of tau rather than pi. If you don’t find my specific examples sufficiently persuasive, here are some more resources that may be of interest:
pi has a page of resources on the topicThis document has been placed in the public domain.
RetroSearch is an open source project built by @garambo | Open a GitHub Issue
Search and Browse the WWW like it's 1997 | Search results from DuckDuckGo
HTML:
3.2
| Encoding:
UTF-8
| Version:
0.7.4