Talk:Pink noise

Latest comment: 17 days ago by Davidrmoran in topic Worst Article Ever

Worst Article Ever

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This has to be the worst article I've ever encountered on Wikipedia. It is utterly, 100% useless to the overwhelming majority of people. Not only could I not understand a thing that the article says, I can't even understand the talk page! Good gravy, this is the quintessential example of something written by experts for experts, and no non-expert can make head nor tail of it.

I came here because I have a noise-generating device that I sleep with. Among its myriad settings, it includes white noise and pink noise. I find the pink noise superior for sleeping, because it empirically has more bass than the white noise. I came here to learn just what the difference is between the two, but I leave with no increased knowledge, and a bundle of confusion. I'm still especially scratching my head trying to grasp how somehow speech and music are both examples of pink noise! I have the scores to all nine Beethoven symphonies, please point me to the bars where anything remotely like what I hear from my pink noise generator occurs.

I'm so flummoxed by what I read that it is hard for me to give suggestions for improvement. But one thought that occurs to me is that it might help to provide some specific concrete examples when making grandiose sweeping statements. For example, the claim that the pitch sequence in all melodies is basically pink noise. — Preceding unsigned comment added by 71.212.96.159 (talk) 15:59, 23 May 2016 (UTC)Reply

Hear
Part of the problem is that the entire idiomatic understanding of log bundling (any interval) is insufficiently conveyed ... a fancy way of saying that anyone who has a smartphone RTA will be utterly flummoxed here by the lack of frank depiction and clarifying of pink noise as a flat line in audio displays! So easy, and so ignored. It is altogether typical of wikipedia stubbornness to lack common sense. Why not actually lead with Pink noise is yada yada human hearing yada depicted yada and then show an RTA (any rez!) graph. I raised this long ago at the outset of this fool article and got nowhere. Why oh why show white noise (rising to the ear, same as in a log-bundled graphing) as a flat line. I mean, seriously. You could even have a sidebar or something on pn filtration, why it is done, and possibly even how. Davidrmoran (talk) 02:47, 8 November 2024 (UTC)Reply

Low frequency noise

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There is much interest in the source, nature, effect, and suppression of low-frequency noise, however you don't hear much talk about the use of 1/f noise to excite target phenomena.

For example, soothing music is said to contain 1/f noise; what woud be the effect if the level of 1/f in said music was increased by artificial or natural means? more soothing?
Experiments on human subjects have been done for reducing blood pressure simply by staring at a flickering candle flame. Would the candle flame not be a rich source of 1/f "noise". I know that it is soothing to me when my blood pressure drops, so perhaps that is the effect of the candle flame and music.
I think it might also be true that if a person was placed in an environment where there was no 1/f present whatsoever (to any of the five senses), that person might go stark, raving mad?

-Charles Trotter, Consultant (Definition of Consultant: Someone who knows about the same as everyone else but has it organized and gives slide shows.)

Reducing ambient noise

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i've heard of the use of pink noise in reducing ambient noise, as pink noise would maskerade human voice. Like a silencer. Is it true? If it is it should be pointed in the article.

-alexandre van de sande


alexandre, the use of noise (white, pink, etc.) to mask other sounds is often misunderstood/overrated. trusting a noisemaker for masking can in some cases have the opposite of its intended effect. for example, i recall seeing a film where a psychologist turned on a small nearby noisemaker prior to a session with a client, with the intention of keeping those in nearby rooms from following their conversation.

"small" is important there, because it means the noise probably won't have much low end; therefore, it won't go through walls very well. "nearby" is even worse, because if the noisemaker is close to them, the result will be that they talk louder to hear themselves over the noise. somebody in a room might then hear them better with the noisemaker than without.

almost any noise of moderate bandwidth can mask other sounds near the same frequencies. white and pink noise are often used because they are at constant levels, not having pauses through which the protected sounds may be discerned. an argument can be made that a better masking source would have some irregular nature to it, making it harder for a determined listener to tune out. the level, however, should remain mostly consistent. in any case, the locations of the sound sources and the potential listeners are crucial.

in the above example, the psychologist and his client would be better off moving toward the center of the room (away from walls and vents), and placing low-to-mid frequency noise sources along every wall and vent through which they don't want their conversation heard. that way they will keep their voices low (being further from the noise), and the relative mix downstream will have more noise in it, not only because of the new mix inside the room (more noise than voices), but because the low and mid frequencies will go through the walls better, and because the noise source is now closer (therefore louder) than the voices.

an even better example, though crude, is the behavior of folks using the toilet when a loud fan is overhead. they have the illusion that people outside hear the same mix they do. however, much of the fan's noise (mid-to-high frequency) is masked by the door and walls, whereas the, um, "natural" sounds are quite audible, and sometimes even louder than they would be if the donor didn't have that loud fan in his ears. a similar example is how people try to hold conversations with somebody running water at a kitchen sink; the proximity of the running water makes it hard for the person at the sink to hear, whereas the noise:voice mix for the person across the room is negligible.

re "silencer", the use of that word in this context is misleading. masking can only silence things relatively. the overall level is always increased, unless anti-noise is the masking source. however, though anti-noise works great in headsets and other tightly controlled environments, it's far more position dependent then brute force masking (drowning out), and isn't the panacea it's often portrayed. SaltyPig 06:25, 10 Jan 2005 (UTC)

White vs pink

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SaltyPig, from our edit summaries we both feel we have corrected the article, though our edits appear to be the opposite. Please explain where I am wrong. Hyacinth 18:31, 9 Jan 2005 (UTC)

  • major correction: The human auditory system...does not perceive equal magnitude at all frequencies, thus whitwhite noise is not perceived as white noise, but pink noise is." -- Hyacinth 15:00, 11 Aug 2004
  • "The human auditory system...does not perceive equal magnitude at all frequencies..." section. incorrect -- SaltyPig 01:30, 9 Jan 2005
Well, we hear according to the Equal-loudness contours, right? - Omegatron 19:56, Jan 9, 2005 (UTC)

hi, Hyacinth. please excuse if i've stepped across wiki protocol. i don't have much experience with contested edits. glad you brought it up. the logical conclusion from acknowledging the distortion of the human ear is that nothing is heard as it is, rendering moot the pointing out that we don't hear one certain thing as what it is. what's crucial is that we hear white noise as our version of white noise; we recognize it for what it is. we can tell the difference between that and pink noise. should we say that we don't hear a cat's meow as a cat's meow until it's been run through an arbitrary filter to make it closer to what a mic hears?

the previous version asserted that "white noise is not perceived as white noise, while pink noise is." does that mean pink noise is perceived as white noise, or pink noise is perceived as pink noise? either way, it's incorrect. pink noise is not adjusted accurately for the human ear. if there's a color of noise (say for example, "fletcher-munson-bark") which is adjusted for the human ear, it might be worth a mention. however, it would still be misleading to say that "fletcher-munson-bark noise" is perceived as white noise.

let me know what you think of that. and please feel free to revert until we clear this up. my overall feeling is that the paragraph is unnecessary. whether your version or mine, i'd like it removed. pink noise has no direct bearing to bark, fletcher-munson, et al, nor should we forget that all such quantifications of human perception are arbitrary, and hardly suited to equating with such a tightly specified, verifiable thing as pink noise. SaltyPig 22:48, 9 Jan 2005 (UTC)

It's worth noting that '1/f noise' is not limited to sounds like the samples played on the site. Music and speech both have 1/f noise spectra (Voss & Clarke, 1975). —WebDrake 12:09, 20 April 2006 (UTC)Reply

The noise of financial markets?

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1/f noise is found in a wide variety of physical phenomena. Examples include ... financial markets, astronomy, and human coordination.

What exactly does it mean for financial markets, astronomy, and human coordination to produce noise? Obviously this isn't talking about physical sound (stars don't make sound that travels through space), but since the article does appears to be talking about sound, this should be made clear. — Asbestos | Talk 10:03, 14 Apr 2005 (UTC)

'Noise' is a meaningful term with respect to all signals, not just sound. The original discovery of 1/f noise was in current fluctuations in vacuum tubes (Schottky, 1918, 1922; Johnson, 1925). With respect to financial markets you can look at e.g. volatility (fluctuations in the amplitude of price movements): the autocorrelation shows power-law decay. I'll try to add some references here. —WebDrake 11:58, 20 April 2006 (UTC)Reply

True pink noise

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I have some problems with the recent entry. It says:

"Producing true pink noise is notoriously difficult. Most digital and analog "pink noise" generators don't produce mathematically perfect 1/f noise; instead they start with white noise and filter it to remove more and more energy at succesively higher frequencies (about 3 dB per octave). This produces a more or less acceptable approximation to pink noise, depending on how many filters are used, but true pink noise cannot be produced from white noise with a finite set of filters."

Producing "true" pink or white noise is impossible - it would require infinite energy to generate the high frequencies all the way out to infinity. That means that these faulty pink noise generators don't start with true white noise to begin with. When you say that it takes a number of filters, you must be talking about a practical limitation, not a mathematical one. If you had the right kind of filter, and you had noise that was white over the bandwidth of interest, you would only need one filter. So when you talk about a number of filters, you must be talking about a specific kind of filter. Which kind? PAR 05:43, 25 September 2005 (UTC)Reply

Good points. Why don't you be bold and fix the article? —Keenan Pepper 12:54, 26 September 2005 (UTC)Reply

Ok - I did. PAR 02:06, 29 September 2005 (UTC)Reply

Producing theoretically perfect pink noise with filters is impossible, even if you did have perfect white noise to start with. This is because a single filter pole produces a rolloff of 6dB/oct, whereas the required response is 3dB/oct - a half-pole filter! This response has to be approximated with multiple stages, and the approximation will never be entirely accurate, though it is possible to produce good approximations for certain bands of interest (pink audio noise to 1dB accuracy, for example). This is the "notoriously difficult" of the original paragraph.Electricdruid (talk) 22:09, 14 June 2013 (UTC)Reply

References

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I've expanded the reference list. It now includes both of Schottky's early papers in the Annalen der Physik as well as Johnson's 1925 Physical Review paper, which I think is the earliest English-language reference. I've also included the Press (1978) and Dutta and Horn (1981) reviews, and a recent review of scale-free biological phenomena.

With regard to 1/f noise in neural signals, it's probably worth looking at the work of Walter J. Freeman: if anyone can get hold of Mass Action in the Nervous System (Academic Press, New York, 1975), that might contain appropriate data. Another one, which I'll try to get hold of, is in Brain Res. 65, 91–107. (1974). I have some of his more recent papers, but they are simulation papers, not the original data. Funnily enough the Gisiger review does not reference them. I'll look around and see what else I can find.

The William H. Press review covers at least some of the astrophysics and other data. As for financial markets etc., again, I'll see what I can find that feels appropriate. If anyone knows of a more recent, comprehensive review of 1/f noise, that would be very helpful.

One brief note — I've kept the Schottky papers because they were already referenced (and are historically important), but from my understanding they are not actually on 1/f noise. My impression is that Schottky discovered the existence of fluctuations in the current, and theorised that they should be white noise: Johnson (1925) measured the effect more precisely and showed the 1/f phenomenon. This is implicit in Johnson's paper and also the "pedagogical review" by Milotti, but I would like confirmation (I've tried and failed to get the Schottky papers out of Wiley).

Cheers, —WebDrake 13:05, 20 April 2006 (UTC)Reply

Split

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"Pink" is a word to describe the character of noise, and is unrelated to its source or the medium it exists in. It's just a description of the noise's frequency content. For instance, statistics of natural phenomena can be pink without involving electronics at all.

"Flicker" noise is a specific phenomenon found in electronic circuits, which happens to have a pink spectrum. Flicker noise should not redirect here. — Omegatron 14:06, 1 September 2006 (UTC)Reply

If you want to write a detailed article on flicker noise, that's fine with me. —Keenan Pepper 16:15, 1 September 2006 (UTC)Reply
Well, I'll start it, anyway.  :-) — Omegatron 17:00, 1 September 2006 (UTC)Reply
Oh good! I was worried it would languish as a stub, but it looks quite decent. —Keenan Pepper 21:45, 1 September 2006 (UTC)Reply
Actually, I would like to propose it come back into the main pink noise article, for reasons discussed on Talk:Flicker noise. Basically I feel that we can do the particular subject justice in the present article, and also that both subjects gain from being included together: flicker noise, from being discussed in the wider context of possible 1/f noises, and pink noise, because flicker noise is one of the most important historical examples. —WebDrake 22:16, 28 December 2006 (UTC)Reply

1/f noise: some clarifications and a rename/merge proposal

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First of all, a query: can someone who knows about this side of things clarify whether "pink noise" refers generally to noise with a   spectrum (at least within the range   or whether it refers to strict 1/f noise (  only)?

I have the impression that the term "pink noise" is only really used in the context of acoustic noise, can anyone comment on this as well?

More generally, I would propose that this article be renamed 1/f noise, and Brownian noise should be merged into it, with "pink noise" and "brown noise" being subsections of a more general, larger article on all noises with a   spectrum.

Thoughts? —WebDrake 01:06, 29 December 2006 (UTC)Reply

I've always known pink noise to be strictly 1/f, used in any context; acoustic or otherwise, and definitely distinct from Brownian noise. For an article that summarizes everything with a   spectrum, see Colors of noise. — Omegatron 07:00, 29 December 2006 (UTC)Reply
No, that article is inadequate to what I have in mind.   noise occurs in nature with a variety of   values; strict exponents of 1 or 2 are only two possibilities. For example if you look at the flicker noise review by Voss and Clarke (1976) they cite exponents varying between 1.0 and 1.4. What makes   noise distinct is that it is simply integrated white noise, so not necessarily a reflection of a complex underlying process. If we look at the items cited in the pink noise article not all of them have spectra with exponents precisely 1. It follows that if pink noise has such a strict interpretation this is an inappropriate title for the article. —WebDrake 19:15, 31 December 2006 (UTC)Reply
Then those items don't belong in this article. — Omegatron 19:37, 31 December 2006 (UTC)Reply
The article really discusses 1/f noise (a term which is used in my experience to refer to any noise with a   spectrum) in general, and does so quite well. I propose it should be renamed accordingly and "pink" noise be noted as a special case. —WebDrake 11:43, 1 January 2007 (UTC)Reply

a term which is used in my experience to refer to any noise with a   spectrum

Aha. You think that "1/f" actually means "1/fα"? Why do you think that? I'm pretty sure "1/f" just means "1/f". "1/f noise falls off at 3 dB per octave", for instance. — Omegatron 16:25, 1 January 2007 (UTC)Reply
I think that because it is my experience based on reading the scientific literature. For example if you read the review by Dutta and Horn cited in the main article, they use the term "  noise" in the title, but as the text of the article makes clear, they actually address noises where the spectrum has a variety of different exponents between 0.9 and 1.4. You might also see Voss and Clarke (1975, 1976), in Nature and Phys. Rev. B. —WebDrake 22:16, 1 January 2007 (UTC)Reply
Further to the above, a quote from Marvin S. Keshner (1982). "  noise". Proceedings of the IEEE. 70: 212–218.
The   noise is a random process defined in terms of the shape of its power spectral density  . The power or the square of some variable associated with the random process, measured in a narrow bandwidth, is roughly proportional to reciprocal frequency:
  where  
and   is usually close to 1.
I don't think you could have a clearer demonstration of the broadness with which the term is used. Many 1/f noise sources indeed have exponents of 1 or close to 1 but it is not the definition.
Now we need to address the question: is "pink noise" synonymous with 1/f noise in this sense, or does it strictly mean an exponent of 1? I suspect the former, since in colour terms after all, pink may be paler or darker. —WebDrake 15:13, 2 January 2007 (UTC)Reply
So most define pink noise as exactly 1/f, and others loosen the definition to apply to naturally-occuring noise sources that are "roughly proportional" to 1/f. I don't see what the problem is. — Omegatron 18:46, 2 January 2007 (UTC)Reply
There are several issues. One is that I believe the term "1/f noise" to be much more widespread than "pink noise". Second, if pink noise is so strictly defined (which it might be, since most definitions I've read on the web refer to equal energy per octave), most natural 1/f noises do not conform to this definition and we should rewrite appropriately. Third, it would be nice to have the concept of   noises discussed collectively in a manner that goes beyond what Colors of noise does. The "colours" are a rather vague way of discussing the issue. —WebDrake 19:04, 2 January 2007 (UTC)Reply

One is that I believe the term "1/f noise" to be much more widespread than "pink noise".

I'd say it's the opposite.  :-) Google test says "pink noise" is 1.3 times as popular, but that's not conclusive.

Second, if pink noise is so strictly defined (which it might be, since most definitions I've read on the web refer to equal energy per octave)

I think it is.

most natural 1/f noises do not conform to this definition and we should rewrite appropriately.

Should probably just be in its own section.

Third, it would be nice to have the concept of   noises discussed collectively in a manner that goes beyond what Colors of noise does.

That would be better in another article, but what would it contain that's not in the colors of noise article? — Omegatron 19:43, 2 January 2007 (UTC)Reply
Try searching on Google Scholar and "1/f" comes out on top, winning not simply in absolute numbers but by an order of magnitude. 1/f is the scientific term. ;-)
I think the "colors of noise" article gives a simplistic interpretation of a complex phenomenon. Most naturally occurring noises do not have power spectra that follow an integer power of f. Mandelbrot and Van Ness suggested the term "fractional noise", in analogy to fractional Brownian motion, to reflect this (I've since seen "fractal noise" used with similar intent).
I suggest that I take the existing 1/f noise page and replace the redirect with a writeup along the lines of what I want. If it works out we can make appropriate alterations to pink noise, brown noise and colors of noise. I will do my best to make minimum disturbance to the existing structure of the noise pages, for the time being (we may end up making major changes, but I won't force them:-). Sound all right? —WebDrake 20:04, 2 January 2007 (UTC)Reply

Try searching on Google Scholar and "1/f" comes out on top, winning not simply in absolute numbers but by an order of magnitude. 1/f is the scientific term. ;-)

Ok.  :-)

I suggest that I take the existing 1/f noise page and replace the redirect with a writeup along the lines of what I want. If it works out we can make appropriate alterations to pink noise

I think 1/f noise and pink noise are closely enough related that they should be the same article. Either move this article to 1/f and rewrite it, or do as you suggested and overwrite this article when you're done. I don't think we should have separate articles for each term.

I think the "colors of noise" article gives a simplistic interpretation of a complex phenomenon. Most naturally occurring noises do not have power spectra that follow an integer power of f.

I'd say the noise colors are simple and well-defined integer powers, while the naturally-occurring noises are grouped into whatever color bin they are closest to. "The noise caused by x is approximately pink", for instance. The colors of noise article is mostly meant to define the various terms and, I hope, will someday explain where they came from as well. It originated from an unsourced newsgroup posting that was passed around for several years, and I think has improved drastically in comparison.

Mandelbrot and Van Ness suggested the term "fractional noise", in analogy to fractional Brownian motion, to reflect this (I've since seen "fractal noise" used with similar intent).

Fractional noise could be a very good place for this, linked to from the second paragraph of Colors of noise. We already have Fractional Brownian motion. — Omegatron 20:30, 2 January 2007 (UTC)Reply
Sadly "fractional noise" would not be a good term, as the name never caught on.
I will use the 1/f noise page for now and, when done, we can decide whether to merge back into pink noise or replace pink noise with a redirect. —WebDrake 20:35, 2 January 2007 (UTC)Reply
I see a lot of references to "fractional noise". It's ok to use a less common term for an article title if it's more accurate than the more common term. I don't think we should have an article called "1/f noise" that's actually about "1/fβ noise". — Omegatron 21:44, 2 January 2007 (UTC)Reply
With what search? Searching Google Scholar for "fractional noise" (including quote marks, so searching for the phrase) gets just 644 pages, compared to around 2700 for "pink noise" and about 17,000 for "1/f noise". It's not a term used in science in my experience. —WebDrake 00:26, 3 January 2007 (UTC)Reply

Update & merge proposal

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I note that someone removed the redirect from 1/f noise, which was unfortunate, because I had not yet brought the proposed article to a high enough standard.

Can I suggest that we do not yet merge anything one way or the other, but take the time to finish the new article, then decide how we want to proceed? In the meantime it might be better to reinstate the redirect while 1/f noise remains incomplete.

Comments on what has been written there so far would be welcome. —WebDrake 23:10, 17 January 2007 (UTC)Reply

All types of noise of the form 1/fa where a>=0 should be included in one all encompassing article about noise regardless of the source of the noise. Within the main article you can have sections on specific types of noise and their sources. That way if someone is looking for a specific type of noise but doesn't know what it's called they can go to the main article and read it until they find a description that fits their needs. For example I had never heard of flicker noise, although I have heard of electronic pink and white noise, until I went to the article on Pink Noise and saw the merge recommendation box at the top. Dr. Morbius 23:58, 16 February 2007 (UTC)Reply
We have Colors of noise, which already mentions it:

Many of these definitions assume a signal with components at all frequencies, with a spectral density per unit of bandwidth proportional to 1/fβ. For instance, white noise is flat, with β = 0, while brown has β = 2.

I think that would be the most appropriate place for an all-encompassing article. — Omegatron 16:46, 13 March 2007 (UTC)Reply

Flicker noise merge

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Flicker noise was explicitly split from this article because it's a different topic (a type of noise that happens to be pink). I obviously oppose a merge. — Omegatron 01:59, 12 January 2007 (UTC)Reply

I oppose as well. Flicker noise is a particular (distinct) type of pink noise.--Srleffler 03:14, 13 January 2007 (UTC)Reply

I support a merge. We're not building a dictionary. It is is better encyclopedic form to cover multiple closely related topics in a single article. --Kvng (talk) 00:13, 19 September 2011 (UTC)Reply

Natural images, and the number of dimensions

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Is it a big bug? I think the article is in error concerning the statistics of natural images. It states that natural images should have a 1/f spectrum (and from the text at the beginning it should be clear that this would apply to the power spectrum). But when reading the cited literature (and it is easy, just click the link) I find on page 2385, just below Fig. 7: "The amplitude falls off quickly by a factor of roughly 1/f (i.e., the power falls at 1/f2)." So either the definition of pink and Brownian (red) noise is incorrect, or natural images have a Brownian (red) noise power spectrum. Kaernbach 21:36, 10 July 2007 (UTC)Reply

I just verified with David Fields himself. And I got a very interesting answer. It is a question of the number of dimensions. Pink noise (which is self-similar on scaling) is 1/f in one dimension (acoustics), and 1/f^2 in two dimensions. The same is true for Brownian noise: 6 dB/octave in 1 dim, 12 db/octave in 2 dim (always referring to the power spectrum). So the reference to Fields (1987) is correct in the pink noise article, but the definition of pink noise should include the number of dimensions. Is there anybody volunteering for this change? Or should I? Kaernbach 17:53, 30 July 2007 (UTC)Reply

Hooge noise

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I found another name for this noise to be "Hooge noise", so I redirected it to this artcle. If that is something different, just let me know,--Rayc 18:10, 3 October 2007 (UTC)Reply

Hooge was one guy who did work on 1/f noise in materials. Sometimes references to him implicitly endorse an incorrect general empirical formula he proposed for the noise magnitude or even some fanciful pseudo-theories intended to explain the incorrect formula.[User:Mbweissman] — Preceding unsigned comment added by Mbweissman (talkcontribs) 23:32, 24 December 2010 (UTC)Reply

Images

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I'm all for showing pink being both flat and sloped, with the appropriate text telling the reader which scale, linear or log, is being depicted. I'd especially like it if the reddish-orange graph were available in both linear and log versions. Binksternet (talk) 04:18, 27 February 2009 (UTC)Reply

Well, OK, I've tried being nice. You are wrong. whether the x axis is lin or log makes no difference to the direction of the slope of the spectrum. What matters is how the spectrum was generated. If it is constant delta-f such as fft then white noise will be flat, if it is constant %age bandwidth such as octave filters then pink noise will be flat. Greglocock (talk) 04:48, 27 February 2009 (UTC)Reply

Objection! Given that noise has a power of zero at each exact frequency (like the probability is zero for a temperature to be exacty pi degrees centigrade), the vertical axis should not be named "dB" but should be a power density. As the frequency axis is logarithmic, it would make much sense to have a power density as log(Watts/octaves) instead of log(Watts/Hertz). Then, pink noise is a horizontal line. --Joern.loviscach (talk) 15:44, 24 January 2010 (UTC); edited Joern.loviscach (talk) 21:19, 24 January 2010 (UTC)Reply

Film shot length compared to pink noise

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I removed this link:

It does not make any sense to me, because pink noise is filtered randomness, but the article says that pink noise in film shot length is related to attentions spans of viewers, with "attention spans of particular lengths were recurring at regular intervals." Pink noise has no regularly recurring data. Binksternet (talk) 18:37, 19 February 2010 (UTC)Reply

You only have your reading comprehension to blame for that, the article is fine. --188.102.158.197 (talk) 09:25, 24 April 2015 (UTC)Reply

Missing citations

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There are many theories of the origin of 1/ƒ noise. Some theories attempt to be universal, while others are applicable to only a certain type of material, such as semiconductors. Universal theories of 1/ƒ noise remain a matter of current research interest.

Which theories? Current research interest? References are missing. 84.88.76.28 (talk) 16:37, 9 February 2012 (UTC)Reply

Origin of the name

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The Wikipedia article currently says:

The name arises from being intermediate between white noise (1/ƒ0) and red noise (1/ƒ2) which is commonly known as Brownian noise.

However, I just read this that the name comes from what it looks like as visible light.[1]

References

  1. ^ Downey, Allen (2012). Think Complexity. O'Reilly Media. p. 79. ISBN 978-1449314637. In "pink" noise, low-frequency components have more power than high-frequency components. Specifically, the power at frequency ƒ is proportional to 1/ƒ. Visible light with this power spectrum looks pink, hence the name.

Which one is true? Does anyone have a citation for the article's explanation? --4368 (talk) 13:19, 6 March 2012 (UTC)Reply

I could not find a citation for white + red = pink. Yours is definitely a reliable source (here's a more specific link). I would encourage you to make the change and see if it sticks. --Kvng (talk) 14:52, 9 March 2012 (UTC)Reply
Done. Thanks for the direct link. --4368 (talk) 21:24, 13 March 2012 (UTC)Reply

"Infinite" energy...

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At some point in the article it was mentioned that at a point where the equation describing this noise would have f=0, producing a division by zero, that the result would be infinite energy. I may be wrong but I am under the impression that the notion of division by zero producing infinite values is archaic and has been disproven; perhaps that only applies to certain (or most?) schools of mathematics, but I believe that the statement should be revised for clarification to describe the statement asymptotically: as f approaches zero, the energy required to produce the sound wave increases infinitely. — Preceding unsigned comment added by 98.27.162.44 (talk) 16:03, 19 April 2012 (UTC)Reply

Yes, that section was OR and wrong. It does not necessarily take infinite energy to produce white noise up to a certain frequency, we can then passively filter it with a 3 dB/octave filter, and will get pink noise. The key word missing from any discussion is crest factor, and incidentally there is no requirement in the definition of pink or white noise that they should have gaussian amplitude distributions, which implies infinite instantaneous power. For instance the white noise produced by setting one bit to either zero or one randomly obviously only requires finite power. Greglocock (talk) 22:04, 19 April 2012 (UTC)Reply

Pink noise in DNA

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I saw that there is a request for clarification. I found a reference that can be of help but unfortunately I am not educated enough to use it and make my own contribution to this article. If someone can take initiative, here it is: http://linkage.rockefeller.edu/dnacorr/voss92.pdf — Preceding unsigned comment added by 81.218.88.234 (talk) 14:50, 14 January 2013 (UTC)Reply

Image depicting pink noise in time domain

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I don't know how to add the image given on this link: http://www.penguinproducer.com/Blog/wp-content/uploads/2012/01/PinkNoise.png This image clearly depicts pink noise in time domain and the page lacks such image. The image is covered under creative commons license so I guess we can use it. Anybody who knows how to edit wikipedia pages, PLEASE ADD THIS IMAGE TO THE PAGE. — Preceding unsigned comment added by 119.226.74.62 (talk) 05:03, 8 April 2013 (UTC)Reply

Accuracy of "pink" noise sample questioned

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I just analysed the "pink" noise sample-sound from this page (27 April 2016) and in fact it looks to be white (flat) from about 2kHz to 22kHz. It does rise in amplitude from 2kHz down to 200Hz.

This isn't a comprehensive analysis, but I think this needs checking further... Is there a better source of pink noise to cite in Wikipedia?

217.33.180.66 (talk) 16:10, 27 April 2016 (UTC) Andrew Steer / http://techmind.org/audio/specanaly.htmlReply

Same sound spectrum with a slightly different pitch, or just volume, https://www.youtube.com/watch?v=ZXtimhT-ff4 prokaryotes (talk) 12:02, 5 September 2018 (UTC)Reply

The word pink

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What object has the approximate color that pink noise was named after? Out of context, the word pink describes an artificial, sharp color with discontinous mix of red and blue (like higher intensity purple), with the mids (green) scooped out, and this color is usually used in illustrations on sound. Wouldn't the the resulting color be closer to orange, like the sun with blue subtracted into the sky or a lightbulb? J7n (talk) 00:53, 7 March 2019 (UTC)Reply

Pink noise is a mix of red noise and white noise. Astute readers may be able to infer that from {{Colors of noise}} but this should be mentioned in the article, if not the lead. ~Kvng (talk) 15:30, 9 March 2019 (UTC)Reply
pink noise is 1/f. "red" noise is 1/f², white noise is 1. 1/f != 1/f²+1, so no, it is not a mix of red and white. anyhow, red and white do not mix to pink, red and blue do.
if you compute the RGB value of an optical 1/f spectrum, you get a pale orange, #ffbe96. I'm no woman, but that's not pink. Equally, the RGB of a 1/f² spectrum is #ffa96d, which is not exactly red either. 2003:F8:746:4B00:89B2:92E5:A50D:EDC3 (talk) 14:36, 1 June 2023 (UTC)Reply
The word pink refers to the flesh of the human hearing system. The first pink noise test signal was a -3dB/octave filter applied to the output of a white noise generator in the 1950s, as far as I can tell. Binksternet (talk) 15:21, 1 June 2023 (UTC)Reply
When I said mix of red noise and white noise I did not intend to imply any mathematical rigor. Pink noise has less low frequency energy than red noise and more than white noise. @Binksternet are you serious about pink referring to flesh? Sounds crazy but maybe you have a supporting citation. ~Kvng (talk) 15:46, 4 June 2023 (UTC)Reply
I looked just now but I can't find any published support for the claim that pink refers to human flesh. I was told in my audio engineering studies that pink noise was created to better track the human hearing system, and that the word pink referred to ears, ostensibly Caucasian ones. But my instructors never said anything about the visual equivalent of pink noise having a pink-ish appearance. So who knows? Binksternet (talk) 16:47, 4 June 2023 (UTC)Reply
Well, they were at least right about the tracking human hearing part. ~Kvng (talk) 13:18, 7 June 2023 (UTC)Reply

Pink Noise in log scale

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Isn't the Description section graph wrong? Shouldn't a pink noise probability be flat over the bandwidth in a log frequency scale? 12:30 13 march 2019 — Preceding unsigned comment added by 213.78.87.131 (talk) 12:27, 13 March 2019 (UTC)Reply

Only if it were binned in constant %bandwidth bins. I suspect that graph is linear frequency reszolution plotted on log scale. Greglocock (talk) 06:58, 14 March 2019 (UTC)Reply

Ok it's maybe a bit too technical for me, but isn't the definition of a pink noise to have an equal energy density for each octave? It's a bit confusing for the reader. unsigned comment added by 213.78.87.131 (talk) 12:27, 13 March 2019 (UTC)Reply

Yes, it is confusing. The lead says inversely proportional to frequency and the Definition section agrees. The Description section mentions equal energy per logarithmic frequency unit and, in the same sentence, power falling off at 3 dB/Octave. None of this is well cited. My recollection is that though these descriptions appear to be contradictory, all are legit. We need to work on sourcing and then help readers connect the dots. ~Kvng (talk) 15:30, 17 March 2019 (UTC)Reply