Title text: That cat has some serious periodic components
| This explanation may be incomplete or incorrect: Missing reverse transform, or commentary on whether it is meaningful to take it. [to my uneducated eye it looks like half of a real-valued graph, but is phase information missing?] Missing guesses as to possible meaning of the name Elizabeth.|
If you can address this issue, please edit the page! Thanks.
A Fourier transform is a mathematical function transformation often used in physics and engineering.
The theory is that any line graph can be represented as the sum of a bunch of sine waves of different frequencies and amplitudes. (The most obvious application is in analyzing a sound recording in terms of the different frequencies of sounds used.) So, for any line graph, you can produce another graph of the frequencies and their amplitudes. This can be done by evaluating an integral based on the function, which is referred to as "taking the Fourier transform" of the function. The form of the integral that needs to be taken is actually shown in the third line of the comic 55: Useless.
Unfortunately, Cueball has applied this "transform" to his cat. Indeed, whatever he has done has literally transformed his cat into the shape of an amplitude line graph. Although the cat seems to be alive and largely unharmed, it is clearly not in its familiar shape, and it is not clear if this condition is permanent or not. Notably, the fact the cat is still alive relates to an important property of Fourier transformation: the information of the original graph is fully preserved, and can even be reversed to produce the original graph. How a reverse Fourier transformation would apply to a transformed cat has yet to be seen.
Cueball is, in this particular comic, likely Jon from Garfield. The name of Garfield's vet in the comic is Liz, and a recurring joke in that strip is Jon calling Liz to report various strange ailments befalling Garfield.
"Periodic components" in the title text refers to the spikes in the graph. Because sine waves repeat themselves as you go along, the presence of large amounts of one particular sine wave in the Fourier transform graph (each spike) shows that the overall result (the initial graph) is likely to have parts that also repeat themselves, like a periodic function. In other words, the cat has repeating parts.
- [Cueball talks on phone. A grotesque-looking cat with many sharp vertical points looks on.]
- Cueball: Hi, Dr. Elizabeth? Yeah, uh ... I accidentally took the Fourier transform of my cat...
- Cat: Meow!
- This was the 27th comic originally posted to LiveJournal.
- Original title: "Wednesday's Drawing - Fourier"
- There were no original Randall quote for this comic.
- This comic was posted on xkcd when the web site opened on Sunday the 1st of January 2006.
- It was posted along with all 41 comics posted before that on LiveJournal as well as a few others.
- The latter explaining why the numbers of these 41 LiveJournal comics ranges from 1-44.
- One of the original drawings drawn on checkered paper.
add a comment! ⋅ add a topic (use sparingly)! ⋅ refresh comments!