Talk:Meridian arc

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Unsigned interjection

Latest comment: 7 years ago1 comment1 person in discussion

Uh, about this meridian arc.. How long is it, then? Would be nice to see how far off the mark they were when they defined the meter.

The section "Numerical expressions" gives the length of the quarter meridian as 10001965.729 m which is 0.2% larger than 10000000 m. cffk (talk) 22:41, 8 June 2016 (UTC)Reply

Major edit

Latest comment: 13 years ago28 comments3 people in discussion

I had originally intended only to clarify the glaring error in the previous version of this page, namely the fact that meridian distance and meridian radius of curvature were confused: an integral is necessary in the definition of meridian distance. Alas, I was carried away with tidying up and adding wee bits here and there. Very little was removed but much was moved around. I hope this edit meets with approval.    Peter Mercator (talk) 18:25, 2 October 2010 (UTC)Reply

The structure and coherency appears improved. Thank you. Some comments:

• I think calculations, if given at all, should be given on the WGS 84 or an IERS ellipsoid. The geographical applicability of Airy seems unnecessarily restricted. I’m sure someone will come in and replace what’s there eventually unless there is some rationale given for Airy specifically.

Yes. I hope some one is willing to do this.  Peter Mercator (talk) 20:37, 4 October 2010 (UTC)Reply

• Wikipedia uses block formatting, so the five space indentations will be removed by a clean-up bot eventually anyway, I’m guessing.

It will probably happen. Unfortunately wiki defaults of layout (and heading fonts) were not defined by printers. Most books I read have paragraph indents. I would go so far as to suggest they should be compulsory on mathematical pages. Otherwise there is no way of telling whether the text following an equation is part of the same paragraph as the equation or starts a new paragraph. Not a principle I am inclined to die for.  Peter Mercator (talk) 20:37, 4 October 2010 (UTC)Reply

Either indentation or double-spacing between paragraphs is normal typography, but not both together. Sadly the math expressions come with several problems, as you’ve doubtless noticed. Strebe (talk) 02:18, 5 October 2010 (UTC)Reply

• I do think the lede needs to retain the astronomical definition.

I honestly didn't understand what that sentence was meant to convey.  Peter Mercator (talk) 20:37, 4 October 2010 (UTC)Reply

• The Comment paragraphs will get integrated into the text or removed eventually, presumably. The comment on notation, for example, appears to refer to the previous revision of the article. I do not think there is any need for that. It may suffice to note that the notation varies in the literature and to state what the article’s conventions are.

Agree. The comment should go.  Peter Mercator (talk) 20:37, 4 October 2010 (UTC)Reply

Again, thanks for the considerable effort. Strebe (talk) 20:58, 2 October 2010 (UTC)Reply

Many thanks to 官翁 for his thorough check. Particularly picking up the error in the e2/n ratio and my omission in the expression for m in terms of elliptic integrals. (A typing error for it's correct in my notes). PLEASE check the statements about the theta substitution. I am fairly sure that it is the complement of the reduced latitude so the square root should be there. Have you checked through the details of the substitution? (I can't bear to write co-reduced latitude in English!)

Greetings. Sorry for my misunderstanding. I replaced with "co-reduced latitude" (or "reduced co-latitude"? This phrase could be found in Karney (2010)). 官翁 (talk) 23:03, 6 October 2010 (UTC)Reply

The phrase "co-reduced latitude" is meaningless and "reduced co-latitude" is ambiguous. The nomenclature is being discussed elsewhere and Karney(2010) may be amended. In the mean time let's stick to "complement of reduced latitude" which is certainly correct.  Peter Mercator (talk) 16:00, 10 October 2010 (UTC)Reply

I have several minor questions about these edits.

• The phrase "may be analagous" to Ell3 integrals is very confusing since the substitution leads directly to an Ell2 integral. Mathematicians never say "may be": a statement is true or false. (I suppose unproven hypotheses are an exception but that's not the case here).

I amended the phrase. Could you check the main article. 官翁 (talk) 23:03, 6 October 2010 (UTC)Reply

Please check change. I think we should stick to new NIST notation. It will be the standard for the next fifty years. The wiki articles will need editing!  Peter Mercator (talk) 16:05, 10 October 2010 (UTC)Reply

• I am not sure whether every possible form of the n-series should be described. My vote would be for the UTM version since it is widely used. Slow convergence is hardly relevant to modern computing. By all means give the earliest known attributions but I believe it would also help to give more recent English references. You are good at finding references on the web so I hope you may be willing.

I intended to note the fact of chronological detail concerned with usage of parameter "n", not to diversify the explanations. If everyone does not care slow convergence, we do not have to use n instead of e in the first place... 官翁 (talk) 23:03, 6 October 2010 (UTC)Reply

• I would wish to restore my comment at the end of n-series which points out that they can be derived from Delambre by substituting e2 in terms of n.

May be it is possible to perform the substitution itself, but very difficult to follow in order to understand. Since the n-series which appears in the DMA document (to order ${\displaystyle n^{5}}$  in the original) is completely coincident with that in the Hinks' report (including the comment about err of the coefficient of ${\displaystyle \sin 8\phi }$ ), I think it is suitable to refer Hinks' report. 官翁 (talk) 23:03, 6 October 2010 (UTC)Reply

• "Helmert . . . derivation has been unclear . . ." What does this mean? Not clear to whom? Helmert, yourself, or all mathematicians. The sentence should cut be cut unless you can convince on this page.

I tried to elaborate my intention with my awkward English in the main article. Could you check it. 官翁 (talk) 23:03, 6 October 2010 (UTC)Reply

• Is the Japanese reference your own paper. Has it been published in English?

Peter Mercator (talk) 21:12, 4 October 2010 (UTC)Reply

To 官翁. If you don't object I will tidy up your English and make some other small changes during the next two or three days. Time to slow down the edits. I still have a problem with the addition of your own (unreferenced) java code: I suspect that this is very much against wiki guidelines in the sense that "Encyclopedic content must be verifiable". I think you should be content to leave the Kawase material with just the simple comment that it reduces to the previous series. Sadly, Japanese references are fairly inappropriate in the English wiki. Peter Mercator (talk) 20:33, 7 October 2010 (UTC)Reply

I see your point. I have just got rid of JavaScript code, and I am waiting quietly for your edit. 官翁 (talk) 22:06, 7 October 2010 (UTC)Reply

Brief comment on your para "Although . . . the process of derivation has been unclear owing to mere extraction ("ausmultipliziert") of ${\displaystyle (1-n^{2})^{2}\,\!}$  from Bessel's series in order to yield the denominator factors ${\displaystyle (1+n)\,\!}$ . Especially it is difficult to find an outlook towards the methodology of derivation for further higher terms."

"Ausmultipliziert" here implies nothing more that Helmert gets from eq6.4 (in his text) to eq7.1 by multiplying by unity, written as (1+n)/(1+n), and simply "multiplying out" (the literal translation) all the numerator terms. Nothing mysterious here.

It is also very easy to find a general term for the Bessel series which is presented by Helmert in para6. (I haven't accessed Bessel's own paper because it is a "pay to view" page).

I could access it freely. I would like to introduce an alternative meterial which is a reprint version of Bessel's original:

Engelmann, R. ed. (1876): Abhandlungen von Friedrich Wilhelm Bessel, 3, Verlag von Wilhelm Engelmann, Leipzig, 41–47, [2].

I hope you can access it freely. The Bessel's series which appears in the main article keeps the original result as it is. 官翁 (talk) 08:49, 10 October 2010 (UTC)Reply

Thanks. I read this ok but, unless I am mistaken, there is no derivation of his result for m(\phi). I haven't emended the reference yet for it would be good to find a paper with the derivation somewhere. Peter Mercator (talk) 16:15, 10 October 2010 (UTC)Reply

The general terms of Bessel's series have already been derived as I mentioned at the bottom of comment at 08:15, 10 October. The outline of derivation is regarding the integrand of ${\displaystyle m(\phi )}$  as a generating function of Gegenbauer polynomials ${\displaystyle C_{n}^{3/2}(\cos 2\phi )}$  and expanding it to series of trigonometric functions in accordance with well known formulae for instance NIST library[3]. It would not be mysterious to reach the final result by rearranging the suffix of the summation. If you think it is necessary to show the derivation of the Bessel's result and do not object, I think I would introduce the above outline into the main article by setting up the reference of the previous Kawase's report. 官翁 (talk) 08:20, 12 October 2010 (UTC)Reply

I think we should prevent the page getting too heavy so I have reservations about adding another large chunk of mathematics. For Delambre the derivation of the low order series could be outlined in two or three lines. I don't think this can this be done so easily for the Bessel low order series? A reference to an (English) source for the Bessel proof would be nice. (I hesitate to recommend my own notes). But, why not draft your proposed addition (to the "General" section) in your own Sandbox and let me know (here or by email) when it is available. I suspect that the general reader will be satisfied with the stated low order series without any proofs. Only advanced readers will follow the discussion of the general terms.  Peter Mercator (talk) 11:53, 12 October 2010 (UTC)Reply

Thank you so much for your suggestion and instruction at the bottom. The proposed draft is available from here. Although everything is all right in order to obtain first several terms and of course I understand that it is enough for almost all people, it still seemed to me that it was difficult to generalize Helmert's approximation by simple multipling 1-2n^2+n^4 with Bessel's general formula. So I have taken another approach in the above draft. 官翁 (talk) 23:21, 13 October 2010 (UTC)Reply

The integrand involves the product of the two series given in eq6.3. (See my derivation in modern notation at [4]). The series are of the form

${\displaystyle {\begin{aligned}&a_{0}+a_{1}z^{1}+a_{2}z^{2}+a_{3}z^{3}+a_{4}z^{4}+\cdots \\&a_{0}+a_{1}z^{-1}+a_{2}z^{-2}+a_{3}z^{-3}+a_{4}z^{-4}+\cdots \end{aligned}}}$ 

where the coefficients are known binomial coefficients augmented with a power of n. (a_k is of order n^k) The coefficient of sin(2n\phi) after integrating comes from the coefficient of (z^n + 1/z^n) in the product of the above series. For example the coefficient of sin6\phi is (a0a3+a1a4+a2a5+...) This is an infinite series but if we truncate at some power n^N the series terminates with the product of two a's for which the sum of their indices is N (or N-1). It would be easy to construct the general term . . . and I suspect it would be less mysterious than that of Kawase! Please try it out.

In general Helmert's series has the best convergence (factor of n^2, so better by a factor of 16 than Dalembert). I suspect that Helmert also knew of the general formula but presented only the finite series that were more than adequate for practical purposes. Look how many numerical examples he gives. I suspect he also knew of the complete ausmultipliziert form which is of course that of Hinks and UTM. Note also how Helmert derives the Dalembert e2 series in eq7.2. The other way is just as easy.

More edits tomorrow. Peter Mercator (talk) 15:56, 9 October 2010 (UTC)Reply

You mentioned that "In general Helmert's series has the best convergence." I also completely agree with your point. I am interested in the reason why Hinks and UTM (as well as [5]) did not adopt the Helmert's series. If the reason were your comment; "Slow convergence is hardly relevant to modern computing", I think it does not seem to be scientific attitude . . .

My comment on convergence was misleading. Improvement of convergence is always vital in big computing programs. It's just not a serious problem in calculating these truncated series on a modern machine. In my own notes I was trying only to construct the series as used by osgb (and my source was Rapp in Survey Review).  Peter Mercator (talk) 16:25, 10 October 2010 (UTC)Reply

Although I seeked for the material about meridian distance, I have not still been able to find the document which introduced the Helmert's series with his name except of Rapp (1991): Geometric Geodesy, Part I [6], 36–40. Of course there are several example which introduce only seties itself without direct reference of Helmert such as Комаровский (2005) [7], 69–71 and Hofmann-Wellenhof et al., (2001): Global Positioning System: Theory and Practice [8], I could not find the Helmert's reference in them. So I suspect that many people were not conscious of the exsistence of Helmert's series or concerned about the ambiguity of the procces of its derivation. It was one of the trigger for me that I have decided to introduce the exsistence of Helmert's series on Wikipedia.

By the way, it has been mentioned that a general term for the Bessel series would be derived as

${\displaystyle m(\phi )=a(1-n)^{2}(1+n)\sum _{j=0}^{\infty }\left(\prod _{k=1}^{j}\delta _{k}\right)^{2}\left\{\phi +\sum _{l=1}^{2j}{\frac {\sin 2l\phi }{l}}\prod _{m=1}^{l}\delta _{j+(-1)^{m}\lfloor m/2\rfloor }^{(-1)^{m}}\right\},}$ 

where

${\displaystyle \delta _{i}=-{\frac {n}{2i}}-n,}$ 

in the Kawase's report. But this series is still inefficient . . . 官翁 (talk) 08:15, 10 October 2010 (UTC)Reply

Major tidy now completed. Page going up now. At the end of the day it seems to me that Bessel's step was the most important. Helmert only made a small change from the Bessel formula. Grateful for check of typos and other infelicities -- as well as comments here.  Peter Mercator (talk) 16:31, 10 October 2010 (UTC)Reply

I amended the fractional coefficient of ${\displaystyle n^{5}}$  in ${\displaystyle D_{6}}$  of Bessel series. In addition, I added ${\displaystyle n^{5}}$  terms to UTM series since both the original Hinks' report and DMA-TR TM 8358.2 display to ${\displaystyle n^{5}}$  order, which is equivalent or inferior to the Helmert's series. On the contrary to your impression, it was much easier for me to follow the process of derivation of Bessel's series than that of Helmert's. I would appreciate it if you could elaborate the outline of Helmert's small change of simply "multiplying out" all the numerator terms. 官翁 (talk) 23:01, 11 October 2010 (UTC)Reply

Am I missing something? After deriving the Bessel series Helmert just reorganizes the result:

${\displaystyle {\begin{aligned}(1-n)^{2}(1+n)D_{0}&={\frac {1}{1+n}}(1-n)^{2}(1+n)^{2}D_{0}={\frac {(1-n^{2})^{2}}{1+n}}D_{0}\\&={\frac {1-2n^{2}+n^{4}}{1+n}}\left(1+{\frac {9}{4}}n^{2}+{\frac {225}{64}}n^{4}+\cdots \right)\end{aligned}}}$ 

gives ${\displaystyle H_{0}/(1+n)}$  on multiplying out. (Similarly other terms). This is a trivial step. The Bessel series is the important one for it already has the n^2 convergence. The factor befor the bracketed series need be evaluated once only so, although it is simpler for Helmert, it is no big deal. The big time saving is the fast convergence.  Peter Mercator (talk) 14:50, 12 October 2010 (UTC)Reply

Summary of errors in series

Latest comment: 11 years ago1 comment1 person in discussion

(This is in preparation for a discussion of possible changes in the article.)

All errors are converted into true distance (meters)

Delambre, Bessel, Helmert, UTM refer to the sections of the Meridian Arc article. "Helmert via parametric latitude" refers to the expressions Helmert gives for the meridian arc in terms of the parametric latitude. (Bessel gave the same direct series in his paper on geodesics. Helmert also gives the reverted series, beta(mu), in the section on geodesics.)

"mean rad" give error in estimate of mean radius (leading term in expansion) = 1/4 meridian / (pi/2).

"distance" gives max error in meridian distance.

"rectif lat" gives max error in rectifying latitude, mu (converted to distance) using formula obtained by dividing out leading term and reexpanding. (Adams gives the formula in terms of phi.)

"inverse" gives the max error in the reverted series for the rectifying latitude, i.e., solving for phi (or beta) in terms of mu. (Adams gives the formula for phi(mu).)

Two ellipsoids are considered

A a = 6378137 f = 1/298.257223563 (WGS84)
B a = 6400000 f = 1/150 (NGA's SRMax)

order 4           5           6         (e^2 or n)

Delambre
A   5.71E-5     3.79E-7     2.52E-9     mean rad
B   0.00176     2.33E-5     3.08E-7     
A   8.85E-5     5.87E-7     3.91E-9     distance
B   0.00273     3.60E-5     4.76E-7     

Bessel
A   6.83E-10    6.83E-10    2.43E-15    mean rad
B   4.27E-8     4.27E-8     6.04E-13    
A   3.04E-7     1.05E-9     1.11E-12    distance
B   9.55E-6     6.57E-8     1.39E-10    

Helmert
A   5.57E-13    5.57E-13    6.14E-19    mean rad
B   3.48E-11    3.48E-11    1.52E-16    
A   6.34E-8     9.44E-11    1.48E-13    distance
B   1.99E-6     5.90E-9     1.84E-11    
A   8.88E-8     1.22E-10    2.07E-13    rectif lat
B   2.79E-6     7.64E-9     2.58E-11    
A   5.86E-7     1.60E-9     5.58E-12    inverse
B   1.83E-5     1.00E-7     6.93E-10    

Helmert via parametric latitude
A   1.22E-9     1.25E-12    1.35E-15    distance
B   3.84E-8     7.85E-11    1.68E-13    
A   4.11E-9     1.65E-12    3.94E-15    rectif lat
B   1.29E-7     1.03E-10    4.91E-13    
A   9.93E-8     2.38E-10    7.64E-13    inverse
B   3.11E-6     1.48E-8     9.49E-11    

UTM
A   1.07E-7     1.81E-10    3.04E-13    mean rad
B   3.37E-6     1.13E-8     3.79E-11    
A   2.47E-7     4.17E-10    7.01E-13    distance
B   7.78E-6     2.60E-8     8.74E-11    

cffk (talk) 09:44, 7 August 2012 (UTC) (Correct 1/4 meridian to mean radius cffk (talk) 19:08, 1 April 2013 (UTC))Reply

Some proposals for changes

Latest comment: 9 years ago5 comments1 person in discussion

First of all, congratulations to the editors of this page. It's much more professional than most of the articles in this field—properly sourced, an appropriate level of coverage, etc.

However(!), there's always room for improvement. Here are my $0.02.

Additional explanation

• Explain why the series in n have half the number of terms (invariance under interchange of a and b and φ and its complement). Similarly point out that a/(1 + n) = (a + b)/2.
• Refer to Clenshaw summation for how to sum the trigonometric series.
• The series in n do converge faster, but not for the reason given (namely, the fact that n is a quarter of e²)! In the absence of a real explanation (something to do with the symmetry?), it's fine to just include the statement that the convergence is faster (see previous section). (Also while halving the number of terms is nice, it does not lead to computation efficiently since the coefficients of the trig terms in the series would be evaluated just once per ellipsoid.)
• I'm uncomfortable with "This expansion is important, despite the poorer convergence of series in n, because it is used in the definition of UTM." because it implies (mistakenly, I believe) that this series (with its finite number of terms!) constitutes the definition of UTM. Instead, the UTM document defines UTM in terms of its fundamental properties (conformal, constant scale on a central meridian) and the series is just offered as a possible implementation.

Candidates for addition

• Series for rectifying latitude μ in terms of φ, obtained by dividing the leading term in Helmert's series.
• The reverted series for φ in terms of μ given, e.g., by Adams in his 1921 monograph.
• Equivalent series in terms of the parametric latitude β. From "Summary of errors" above, it's clear that these converge faster than the corresponding series in φ. In addition these series occur naturally in the computation of geodesics (where β is the latitude on the auxiliary sphere). An historical note: Helmert observed that the series in β converge faster than the corresponding series in φ in section 5.11 of Helmert (1880), "Meridian Arcs by Means of Reduced Latitude." cffk (talk) 15:41, 25 July 2014 (UTC)Reply

Candidates for removal

• Bessel and UTM series (leaving the references). These have much poorer convergence and I can't envision the circumstance in which they would be preferred over the Helmert series. (I would leave in Delambre's series for its historical interest.)

cffk (talk) 10:27, 7 August 2012 (UTC)Reply

Start of spring cleaning

I've made a start on these changes on my user page at User:cffk/Meridian arc. The only sections I'm changing are

• Meridian distance on the ellipsoid
• Polar distance

which become

• Meridian distance on the ellipsoid
• The inverse meridian problem for the ellipsoid

I still have some editing to go (I hope to be done by 2014-09-15), but, for the most part you should be able to see where I'm headed. Some highlights:

• Mention Euler's expansion.
• Include Bessel's series in terms of parametric latitude.
• Include inverse problem (solution by Newton's method plus series reversions for geographic and parametric latitudes).
• Remove Bessel's series in terms of geographic latitude.
• Remove UTM series since new NGA definition of UTM makes this obsolete (but will retain the reference).
• Give Bessel's and Helmert's generalized series and but retain references to Kawase.
• Give all series in uniform notation.
• Use "quarter meridian" instead of "polar distance".
• Remove Muir's approximation (it's just equivalent to including the O(n^2) correction.

Comments are welcome, of course. cffk (talk) 20:26, 7 September 2014 (UTC)Reply

Made a couple of changes... cffk (talk) 20:48, 8 September 2014 (UTC)Reply

OK, I've finished. I'm sure some errors have crept in and that the explanations could be improved. Feel free to fix. Please hold off on major changes until they've been discussed on this Talk page. cffk (talk) 08:19, 12 September 2014 (UTC)Reply

Meridian distance on the ellipsoid

Latest comment: 10 years ago2 comments2 people in discussion

Be very careful copying length parameterization (curvature,compenent accelerations) formulas from books! Or even explaining them.

You suggested that the distance equation is an easy subst. and while it may be "within tolerance" or for some reason had canceled and be ok: in general it isn't at all.

swok calc p 771 def 15.16 "arc len" x=f(s), y=g(s) so that if s == C (a length) P(x,y) is answer.

However s is NOT L (arc Length of r from 0 to P) as one would assume. s must be an equation that when substituted in r causes r to have arc length c when s(c) is the parameter of r. That's more complicated than s simply s == L == sqrt( dx^2 + dy^2) by far you have to work to find that equation it's not automatic.

(it's more than just knowing the the distance formula, which is a specially adjusted (reimann) integral. and it is NOT the formula which has unit length for s substituded either nor that you substitute unit length or time or angle in)

in other words: if they start saying parameteric parameter. be very wary authors do not always state if "x" is "dx/dt" or "dx" or "dx/ds". the equations are totally different and difficult to convert between in the general sense. — Preceding unsigned comment added by 72.219.202.186 (talk) 05:18, 3 April 2014 (UTC)Reply

The above appears to be mainly nonsense. I have added a link to the derivation of curvature from first principles.  Peter Mercator (talk) 20:34, 3 April 2014 (UTC)Reply

Merging history section

Latest comment: 9 years ago2 comments2 people in discussion

There is presently a proposal to merge the historical section with History of Geodesy. I am against this for the present article is nicely self contained. I prefer a little duplication rather than a spaghetti wiki structure. Any comments? Or will someone remove the merger banner. Peter Mercator (talk) 14:37, 13 January 2015 (UTC)Reply

Done (remove the merge banner). cffk (talk) 00:24, 17 January 2015 (UTC)Reply

Ambiguous notation in formulas

Latest comment: 8 years ago6 comments2 people in discussion

Hi, I recently added ([9]) parentheses around the arguments of trigonometric functions in order to remove the ambiguity but got reverted by two editors stating that "mathematicians would not use brackets in this way" and that the brackets were "clutter" and that "nobody who could use these formulas is confused by this notation".

I'm afraid I do not agree. Mathematicians (and teachers) do normally use brackets the way I used them here. And omitting them in cases like this one makes it unnecessarily difficult to interpret the formulas and causes confusion, except for in those who do "know what they meant".

Sure, there are cases, where parentheses are optional and where it is down to personal preferences or an attempt to achieve consistency in style within an article if they are used even though formally not required. However, the given case is a very clear-cut example where they are not optional, and where omitting them causes ambiguity. Without the brackets, these terms simply become incorrect, as formally there is no rule in mathematics which would give implied multiplication a higher operator precedence over explicit multiplication. In fact, the opposite is true and a student omitting the brackets in cases like this one would fail to get the mark. Anyone trying to parse the terms according to established operator priorities would get a wrong result, that's why the parentheses are needed here. Of course, the formulas would not make sense this way here, but it is only by "not making sense in this context" that a reader could deduce that the author must have meant something different. That's hardly a good basis to explain stuff.

In an encyclopedia for anyone it is our goal to express ourselves as clearly and formally correct as possible. The goal is to simply state what we mean and not to let the reader guess what we could have possibly meant. We cannot take it for granted that a reader might have seen such formulas often enough to guess what was meant (but not stated).

I am well aware of the fact that some authors tend to omit the brackets anyway, even in cases where they really must not, but that's just bad jargon and showing an inappropriate attitude towards readers. It's nothing that should be followed in general, and in particular not in a project like this.

--Matthiaspaul (talk) 14:50, 23 November 2015 (UTC)Reply

Are you saying that ${\displaystyle \sin 2\mu }$  needs parentheses, otherwise it's incorrect? I disagree; in standard trigonometric notation, multiplication by a preceding numerical coefficient takes precedence over function binding. See, for example, Abramowitz and Stegun, p. 72 (multiple-angle formulas). Including the parentheses is not wrong, but it make the formulas in an article like this look clunky. cffk (talk) 15:15, 23 November 2015 (UTC)Reply

Yes, a term like ${\displaystyle \sin 2\mu }$  is ambiguous because formally it means ${\displaystyle (\sin 2)\cdot \mu }$  which is obviously not the same as ${\displaystyle \sin(2\cdot \mu )}$ .

Unfortunately, there is no such "standard trigonometric notation", at least not any that is universally accepted or understood.

I have heard about ten conflicting interpretations from people of various disciplines and from various locations in regard to how they would interprete such terms, and you are certainly not alone in your interpretation, but it is not universal. You bind it on a preceding numerical coefficient, others on numerical vs. symbolic usage, or on the usage of implicit vs. explicit multiplication, yet others on the size of the whitespace used, on where it is located in a formula (in the middle vs. at the end), or on the other operators involved, some just attempt to guess what is meant by ruling out possible interpretations which don't make sense in a particular context and hope that there is only one "meaningful" interpretation left, some state that it is quite well-defined and therefore needing parentheses to combine multiple numbers into a single function argument (this is also what I have been taught originally and what I could find in mathematics and computer sciences books formally defining precedence orders), and some simply state it as undefined and therefore also needing parentheses to avoid possible misinterpretation. I have seen different calculators and CAS systems interpreting it differently over the years (and sometimes even depending on settings or revisions), therefore, I think, it is safe to assume that there is no single globally accepted standard for this, and therefore we must either explicitly define our intended usage in the article prior to using it (awkward), or simply avoid ambiguous terms like this (easy).

Regarding implicit usage in Abramowitz & Stegun. I don't think it can be counted as reference for this, as it does not formally define or explicitly explain this usage. Have, for example, a look in its dedicated successor "NIST Handbook of Mathematical functions", which deliberately uses parentheses for all such terms in order to avoid the ambiguity. The same holds true for the "Atlas".^[1][2] See also the five pages discussion and formal definition in Bronstein & Semendjajew.^[3]

1. Olver, Frank W. J.; Lozier, Daniel W.; Boisvert, Ronald F.; Clark, Charles W., eds. (2010). NIST Handbook of Mathematical Functions. National Institute of Standards and Technology (NIST), U.S. Department of Commerce, Cambridge University Press. ISBN 978-0-521-19225-5. MR 2723248. {{cite book}}: Invalid |display-editors=4 (help) [1]
2. Oldham, Keith B.; Myland, Jan C.; Spanier, Jerome (2009) [1987]. An Atlas of Functions: with Equator, the Atlas Function Calculator (2 ed.). Springer Science+Business Media, LLC. doi:10.1007/978-0-387-48807-3. ISBN 978-0-387-48806-6. LCCN 2008937525.
3. Bronstein, Ilja Nikolaevič; Semendjajew, Konstantin Adolfovič (1987) [1929]. "2.4.1.1.". In Grosche, Günter; Ziegler, Viktor; Ziegler, Dorothea (eds.). Taschenbuch der Mathematik (in German). Vol. 1. Translated by Ziegler, Viktor. Weiß, Jürgen (23 ed.). Thun and Frankfurt am Main: Verlag Harri Deutsch (and B. G. Teubner Verlagsgesellschaft, Leipzig). pp. 115–120. ISBN 3-87144-492-8.

The bottom line: In an encyclopedia for anyone we should try very hard to avoid any unnecessary usage of non-standard or personal jargons which can make it unnecessarily difficult for readers to correctly interprete the contents of an article. Therefore, let's remove the ambiguity by adding parentheses.

Matthiaspaul (talk) 17:48, 23 November 2015 (UTC)Reply

The notation ${\displaystyle \sin 2\mu }$  is neither "non-standard" nor "personal jargon"; your insistence that it formally means ${\displaystyle (\sin 2)\cdot \mu }$  contradicts more than 200 years of mathematicial convention (dating back, at least, to Euler). An important quality of a good mathematical notation is that it conveys its meaning quickly to the human reader. Inserting parentheses into this expression makes the formulas more visually messy and hinders human recogntion. cffk (talk) 19:30, 23 November 2015 (UTC)Reply

Some additional remarks:

I agree that editors should avoid confusing readers and, in some cases, extra parentheses are needed. I just don't think they are needed here (and that their presence is a net negative). And I've seen no evidence that any reader (who at least knew the basics of trigonometry) was confused.

I distrust your use of "formal" here. It sounds like you want to create a grammar to allow machine-parsing of equations. However, mathematical notation is too organic for this to be feasible. For instance is "f(x+y)" a product or a function call? Well, it depends on the context. The fact that the initial letter is "f" suggests it's probably a function call; however, if the previous text was "we can factor Eq. (10) to give", then it's probably a product. It's going to be difficult to write down a set of cast-iron rules that work all the time. And I certainly wouldn't want to require disambiguating multiplication signs in such situations unless there was a real danger of misinterpretation.

Finally, blitzing through a bunch of articles that you have not contributed to in order to impose your own notions of "correctness" is likely to ruffle a few feathers!

cffk (talk) 20:36, 23 November 2015 (UTC)Reply

I've added a line to the article explained how terms like ${\displaystyle \sin 2\mu }$  should be interpreted. This makes the meaning of the trigonometric formulas clear while keeping the notation simple. cffk (talk) 12:15, 24 November 2015 (UTC)Reply

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