Talk:Straightedge and compass construction

(Redirected from Talk:Compass-and-straightedge construction)
Latest comment: 5 months ago by 2601:14F:8000:B3B0:0:0:0:5733 in topic Bad external links
Former featured article candidateStraightedge and compass construction is a former featured article candidate. Please view the links under Article milestones below to see why the nomination was archived. For older candidates, please check the archive.
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Did You KnowA fact from this article appeared on Wikipedia's Main Page in the "Did you know?" column on March 20, 2004.

introduction to the compass... a contradiction?

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And I quote from the first subsection "compass and straightedge tools", first bullet point:

Circles can only be drawn starting from two given points: the centre and a point on the circle. The compass may or may not collapse when it's not drawing a circle.

I think these two sentences are contradictory. The first seems to imply a collapsing compass, as you must pre-define the radius and center point in order to draw the circle there. If a rigid compass were permissible then you need only a center point in order to draw a circle whose radius youve already defined with the compass.

You could fix it however you like, possibly best to point to Compass equivalence theorem, they're completely equivalent. Dmcq (talk) 19:09, 13 July 2018 (UTC)Reply

older entries

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At some time in the past I Heard the commentators for professional wrestling refer to the ring in which activity takes place as the "squared circle". This is an excellent example of pseudo-science in the service of pseudo-sport. Eclecticology

We need more on doubling the cube and angle trisection. The Anome

Thanks, Pierre! The Anome

Mathematicians are notoriously incompetent historians. Gauss NEVER gave a proof of the necessity of the constructibility of the regular n-gon. WANTZEL proved this in 1837. If you read otherwise, it's because mathematicians are sloppy historians. Revolver

Or is it the historians who are sloppy, notoriously incompetent mathematicians?  ;-)
Herbee 18:43, 2004 Mar 13 (UTC)
No, the people doing the history are mathematicians specialising in history of math, not the other way around. (True for most sciences...you have to have some understanding of the material.) Revolver 13:08, 14 Nov 2004 (UTC)
It is definitely the fault of mathematicians here. Some VERY famous names aided and abetted this myth, without checking into it themselves. You'd think being math people, they would question things. Revolver 13:09, 14 Nov 2004 (UTC)

'Compass' vs 'compasses'

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The article mixes the two words compass and compasses with obviously the same meaning. Both words are acceptable according to Webster's, but for the sake of consistency I'm changing all to compass. Why not compasses? Because that way I don't have to move the article, and anyway "ruler and compasses construction" is less agreeable to the ear.
Herbee 18:43, 2004 Mar 13 (UTC)

merge

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MERGE: This needs to be merged with Constructible number and all the other articles on specific impossibility proofs. These overlap a lot, yet none of them should try to cover every topic. Revolver 13:08, 14 Nov 2004 (UTC)

I think there's room for a lot of reorganization here. Some pages should be merged; some new ones should be split off. I just ran into a problem with Regular polytope; somebody got carried away with the difference between real and ideal construction. That's a whole subject in itself; but it's not math. John Reid 22:15, 27 March 2006 (UTC)Reply

largest regular polygon

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The regular polygon with the largest number of sides that was ever actually drawn with a ruler and compass had 1,024 sides. It was drawn by graduate student Mr. Sam Bronstein at the University of Kentucky in 1963, a feat that took him 33 days and a sheet of paper 9 meters square.

Is it really as imprtant to be here? Tosha 03:37, 18 October 2005 (UTC)Reply

No, but it might go to Polygon. John Reid 23:33, 30 March 2006 (UTC)Reply

Drawing A Regular Hexagon

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technically, using a compass and a straightedge to draw a hexagon is impossible, since the circumference is 2Πr. not 2(3)r.

there is a slight distortion. the only true way to draw a real hexagon is to 1. bisect the circle at any point 1/2 way between the center[o] and an edge[e] to form point [a] 2. using point [a] as a center, draw a line [b] perpendicular to the angle formed between [e] and [o] 3. mark the two points where [b] intersects the circles radius 4. repeat 180 from [e] across [o]

above unsigned comment 17:39, 8 December 2005 Kargoneth

I'm not a mathematician, but I don't see why the hexagon construction doesn't work. Is it because pi is irrational? Can someone clarify this?
(Also, this proposed construction seems rather vague. How do you draw a line perpendicular to an angle? What does "180 from [e] across [o]" mean? It is decipherable, but it takes some work.) Imaginaryoctopus 05:30, 10 December 2005 (UTC)Reply
Addition: I did a little research, and it seems to me that the hexagon construction is fine. From the "Constructible polygon" page:
"A regular n-gon can be constructed with compass and straightedge if n is the product of a power of 2 and any number of distinct Fermat primes."
We let n=6 (representing a hexagon). We know that 2^1=2 and that 3 is a Fermat prime, so we can say 3*2=6.
Even if you don't buy this, the construction itself comes straight from Proposition 15 in Euclid's Elements, Book IV. Imaginaryoctopus 05:56, 10 December 2005 (UTC)Reply

For the record, a regular hexagon is constructible. John Reid 23:36, 30 March 2006 (UTC)Reply

"Ruler" or "Straightedge"

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A ruler is commonly understood to be marked; this type of construction specifically forbids markings. John Reid 19:18, 26 March 2006 (UTC)Reply

As you say most people commonly think of a ruler as being a "marked" one (technically called a "measure"). However a ruler can also be unmarked. See ruler) for a fuller discussion of all this. Paul August 16:47, 28 March 2006 (UTC)Reply

A ruler is a marked straightedge; this is explicitly forbidden in compass and straightedge construction. For practical purposes the ruler is the more generally useful tool, certainly the more popular; thus it's not hard to see why the term is also more popular. But this is one of those times that the Google test gives a false indication.

To the quibble: Yes, strictly speaking, a "ruler" is a straightedge only, a tool for ruling (drawing straight lines). A tool for measuring is a "scale"; thus the commonplace object found in home and office is truly a ruler with a scale printed upon it -- a dual-purpose tool. It is, however, ambiguously called a ruler; and the less-common "straightedge" is clearly and unambiguously unmarked. John Reid 23:55, 28 March 2006 (UTC)Reply

Being a quibbler by nature, I cannot resist pointing out that the "unambiguous umarkedness" of the straightedge may not be straightforward: [1][2][3]. LambiamTalk 05:29, 9 April 2006 (UTC)Reply
The verb "rule" is sometimes synonymous with "measure" or "judge". Therefore, I suggest that all wording in this article be changed to "straightedge" instead of "ruler". SharkD (talk) 07:39, 18 December 2007 (UTC)Reply

Does it actually matter if a ruler is marked or not?

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Does it actually matter if a ruler is marked or not. It is a trivial matter to produce a marked straight edge from an un marked straight edge and a compass. Step 1: draw a small circle, call the radius of the circle your unit. Next draw a straight line with the ruler, pick some point on the line to be zero, using the compass set to the unit radius mark off one unit from zero. Move the point of the compass to the first unit, mark of the second unit, .... The same procedure can be repeated for any straight edge in the diagram, effectivly giving the same construction possible as with a marked streight edge and compass. --Salix alba (talk) 00:09, 29 March 2006 (UTC)Reply
See Doubling the cube for a "ruler (straightedge with two marks)" and compass construction which cannot be simulated by a "ruler and compass" construction. — Arthur Rubin | (talk) 00:46, 29 March 2006 (UTC)Reply
One can indeed create a Cartesian grid (as described in the article) with equally spaced out points along the axes. However, although it may look like you've effectively constructed a replacement for a marked straightedge, the point is that you are still only allowed certain operations with your straightedge and compass. So you are still restricted as to how you can use elements of this "grid" and you will not be able to double the cube, etc. Now if you were to actually violate the rules for a Euclidean construction somehow, you can double the cube. For example, see the particular example Arthur gave. In that example, one creates a point of intersection between two lines by measuring along a marked straightedge, which is disallowed under the normal rules. --C S (Talk) 09:10, 30 March 2006 (UTC)Reply

The distinction is essential, which is why I am involved. You can, indeed, create a scale of any constructible numbers along a line. If you were to look at that, it would appear to be a ruler, in common speech. In order to use it as a new tool, though, you would have to cut it out from the paper on which it was drawn and translate it. If translation by a non-constructible distance is permitted -- and we generally understand that two objects may be offset, relative to one another, by any real-number distance -- then this opens the door to all three classic forbidden constructions.

If cut-and-translate is permitted, then it's not even necessary to produce a scale. See Tomahawk.

The issue of the marked straightedge is of a class distinct from that of the non-collapsing compass. Euclid I.2 and .3 justify the non-collapsing compass and show that any construction possible with the non-collapsing compass can be performed with the collapsing. The definition of the compass never changes throughout Euclid; but later constructions are simplified. It is understood that any of them could be expanded on demand. This is important; the actual process of duplicating a given line segment is hellishly complex compared to the ease of simply drawing a new circle with the old radius held in the compass. But the latter operation is only justified by the proof of the former.

It is exactly this kind of subtle distinction between permitted and forbidden operations that invites so many cranks to waste their lives on fallacy. And this is why I feel so strongly about the issue of term used to describe this subject. John Reid 23:32, 30 March 2006 (UTC)Reply

One of the biggest issues I have with a marked ruler - beyond the fact that it is capable of extending constructibilty - is the simple fact that it introduces measure, a metric, into the plane. This turns geometry from something more abstract and geometric, to something more algebraic. 134.204.1.226 (talk) 16:57, 11 January 2024 (UTC)Reply


The following discussion is an archived debate of the proposal. Please do not modify it. Subsequent comments should be made in a new section on the talk page. No further edits should be made to this section.

The result of the debate was move, by a 13:7 margin. —Nightstallion (?) Seen this already? 07:07, 3 April 2006 (UTC)Reply

Move of page to "Compass and straightedge"

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Opinions

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Add *Support or *Oppose followed by an optional one-sentence explanation, then sign your opinion with ~~~~
I'd hate you to think I was criticizing your vote; I'm not. But you do suggest that a ruler marked in constructible ratios could not be employed to perform impossible constructions; it's my understanding that it can indeed. Any marked ruler -- even one with but two arbitrary marks -- is sufficient. John Reid 22:56, 31 March 2006 (UTC)Reply
I think I must not have expressed myself clearly enough. An infinite ruler with two marks on it only provides a single unit of length which can be used anywhere in a construction. As we are only interested in ratios, this cannot allow any new constructions (any construction with compass and straightedge can start with the creation of an arbitrary distance using the compass). Likewise, no new constructions are possible using a ruler with any number of marks on it as long as the ratio of any two distances between marks is constructible using compass and straightedge (i.e. any ratio must be a solution to a quadratic equation). A ruler would only permit new constructions if a ratio of distances between marks is not constructible (for example, a ruler with three marks at 0, 1 and  ). Would you agree with this view of the situation? Elroch 15:50, 1 April 2006 (UTC)Reply
It's not just a matter of being able to construct the length between the marked segments; it's the fact that you can construct it in an unconstructable position. Have a look at Archimedes' trisection of the angle. The key step is to produce a line segment which a) passes through a given point on a circle, and b) has a length of 1 between the other intersection with the circle and the intersection with an extended diameter. You can easily do this by sliding around a marked ruler whose marking has length 1, but it's impossible otherwise (since it trisects the angle, for one). Another way to look at it is: no particular distance is unconstructable, because the plane doesn't have a preferred coordinate system. Only once you draw your first circle do you establish a metric. So if you have any marked ruler you can trivially make the marking a constructible length by making it the unit distance in your coordinates. Ryan Reich 16:30, 1 April 2006 (UTC)Reply
Thank you for pointing this out. I was assuming neusis was not a permitted construction (it is far less direct than normal compass and straightedge constructions), but including it leads to an important superset of the compass and straightedge constructions. In light of this, I change my vote back to "Support". Elroch 17:28, 1 April 2006 (UTC)Reply
Of course, neusis is not a permitted construction, but I understand what you mean. Anyway, glad I could help. Ryan Reich 18:59, 1 April 2006 (UTC)Reply

Oppose

Dummit and Foote, Abstract Algebra, 2nd edition, refers to it as Straightedge and Compass. Plus the book is really thick. Ryan Reich 20:38, 29 March 2006 (UTC)Reply
  • I'd never heard of "straightedge and compass" or "compass and straightedge" before this discussion. (And I was designated crank-reader at Caltech for a short period of time, so I saw a lot of bad "ruler-and-compass" angle trisections. This doesn't necessarily indicate the correct term, but it certainly indicates the term popular among crackpots.) — Arthur Rubin | (talk) 00:24, 30 March 2006 (UTC)Reply
  • Use the most common term AdamSmithee 07:07, 30 March 2006 (UTC)Reply
  • Never heard of straightedge. —Nightstallion (?) Seen this already? 11:38, 30 March 2006 (UTC)Reply
  • I was going to jump in and vote oppose when I first saw the vote started, but I thought I'd wait and see if any arguments swayed me, first. Having been in the 'neutral' camp for a day or two, I've now plumped for oppose. I've never heard of 'straightedge'; the "ruler and compass" words seemed familiar as soon as I saw them, and I didn't make an assumption that the ruler was used for length measurement; the resources identified below are by no means unambiguous. Noisy | Talk 10:06, 31 March 2006 (UTC)Reply
  • The negative statements - the things that can't be constructed with compass and straightedge - are simply not true in general for ruler and straightedge. Therefore the current name could be seen as misleading. On the other hand, it's naming policy to use the most widely familiar name, even where that name contains factual inaccuracies. Such inaccuracies should be clarified in the article text, ideally in the intro, not corrected in the title. If the "compass and straightedge" name were equally widespread, or even half as widespread, I might agree to prefer it. Deco 01:35, 2 April 2006 (UTC)Reply

Google hits

For all that's worth, the google returns 110,000 answers to Straightedge and Compass construction and 378,000 to ruler and compass construction. Not scientific by any measure, obviously, but worth keeping in mind. Oleg Alexandrov (talk) 21:46, 29 March 2006 (UTC)Reply

How many does it return for compass and straightedge constrution? Kevin Baastalk 17:22, 31 March 2006 (UTC)Reply
Woa, never mind, i did it and it's only 5 digits. weird. Kevin Baastalk 17:25, 31 March 2006 (UTC)Reply

Google hits are misleading here. If you click search results to the very end, you will notice that both give nearly the same number of unique google hits. `'mikka (t) 18:12, 31 March 2006 (UTC)Reply

Consequnces

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Whatever the outcome be, IMO it would be bad idea to chase each and every reference in wikipedia articles and replace by one and the same. This would be imposing a POV bias unto the readers, since in real world both terms are used interchangeably. `'mikka (t) 18:16, 31 March 2006 (UTC)Reply

I agree with the recommendation, although I don't see it as a PoV issue. If we leave this alone, eventually the inward links should divide in proportion to all editor's feelings. This is the wiki process at work. Septentrionalis 20:48, 31 March 2006 (UTC)Reply

Discussion

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I don't agree with the move of the page to ""Compass and straightedge". As i wrote above I think that "ruler and compass constructions" is the most common name for the subject of this article. In any case if we were to replace "ruler" by "straightedge", the article should be rewritten to reflect that change, and the title should be "Compass and straightedge constructions". I am going to move the article back until we can arrive at a consensus. Paul August 17:08, 28 March 2006 (UTC)Reply

I think "Straightedge-and-compass constructions" would be better. "Ruler" is technically incorrect, as one can construct cube roots (not normally considered a ruler-and-compass construction) using a straightedge with two marks and a compass.Arthur Rubin | (talk) 18:37, 28 March 2006 (UTC)Reply
Never mind. Already discussed at ruler. I recommend moving it back. — Arthur Rubin | (talk) 18:40, 28 March 2006 (UTC)Reply
Agree with moving it back. "Ruler and compass" is by far the most common name. Oleg Alexandrov (talk) 18:53, 28 March 2006 (UTC)Reply
What evidence is there that it's the most common? I myself never hear it, and never use it, and have been indoctrinated against its use. Ryan Reich 02:29, 29 March 2006 (UTC)Reply
It took me over 7 hours to correct every link in every related article, fix every category tag, and rewrite several snippets of text. I'm really sorry I haven't gotten around to the rewrite of Compass and straightedge, but I intend to do so. Please note that the issue is not merely this article title; it is also the linking text and other references to the subject scattered throughout the project. I have corrected them all, with a few notable exceptions, each of which I'm prepared to defend.
I don't care a fig for what is the most common usage; only what is more correct. We're not in the business of perpetuating error. Fine to have redirects from all possible variations, including those with "ruler" in the title. Not okay to title the article page itself that way; that's just plain wrong -- and I think everyone tangent to this discussion knows why.
I'd like to make it clear that no consensus existed in the project before I did my work over these last few days. The subject was referred to by no less than 16 alternate, inconsistent titles. The actual title of the article is not the biggest deal but it's just plain silly to war over it. I think we all know what's right.
Now for the boring, point-by-point argument -- feel free to skip this if you already know better:
  • "straightedge" over "ruler" -- see Ruler. Note that the "common usage" argument fails to endorse "ruler", because a ruler is marked in common usage. Adherence to strict interpretation fails as well: if "ruler" is strictly interpreted to be unmarked then this jerks the rug from under any claim to "common usage" for "ruler and compass". "Straightedge" is unambiguous, strict, and still commonly understood.
  • "compass and straightedge" over "compass and straightedge construction" -- The preference is shorter, therefore presumably better barring some other argument. The former is quite unambiguous, in the sense that the pairing of these two tools is universally understood to apply equally to the set of tools, to the operations that may be performed with them, and to the theory which governs all. Thus there is no need to disambiguate by adding the needless word "construction".
Note that any argument supporting "construction" might apply to "method". No extra word is needed.
I have, in some cases, retained the word "construction" in the text of other articles, where appropriate.
  • "compass and straightedge" over "straightedge and compass" -- All constructions can be performed with compass alone; thus it is the senior tool.
  • "compass and straightedge" over "compass-and-straightedge" (and all hyphenated forms) -- In this case, hypenation is simply poor English style.
Until I started work, nobody had made any effort to untangle the rat's nest of links, descriptions, redirects, categories, and general blundering surrounding this subject. Now, with the exception of the rewrite of the main article (and perhaps one other task, that of an article for angle trisection), we have it all correct. Please, for heaven's sake, let's not screw it all up now. John Reid 21:08, 28 March 2006 (UTC)Reply

I must agree that the "compass and straightedge" has its points. For one thing, it permits the marked, or markable, object to be called a ruler within the article, and then we can discuss the neusis constructions which permit the ssolution of quartics.

Common usage should decide; Wikipedia is no place for "correctness" - but only if it is -er- decisive. I am not convinced that "ruler and compass" dominates the field.

I would oppose any effort to make ruler and compass a different article, however. If it redirects here, is there really a problem? Septentrionalis 23:55, 28 March 2006 (UTC)Reply

Wikipedia is no place for "correctness" - Soon to be quoted in a news story about Wikipedia, to be sure. Joshua Davis 14:23, 29 March 2006 (UTC)Reply
Oh, I'm sure; but it is policy: See WP:UE. Equally quotable is WP:V:The criterion for inclusion is verifiability, not truth. Septentrionalis 16:40, 29 March 2006 (UTC)Reply

There are three issues:

  • Which is the correct (most accurate) term?
  • Which is the common (most popular) term?
  • Which of these should name the article?

To answer these questions someone should really survey the literature for the opinions of "experts" (by the way, there are roughly zero references in the article). In lieu of doing that tedious work, I vote for what I see as correctness: name the article "compass and straightedge", mention all of the variations in the intro, and then redirect all of them here.

Apparently the larger issue is how to refer to these constructions in other articles; I submit that anyone reading the phrase "compass and straightedge construction" will automatically translate it into "ruler and compass construction" or whatever their favorite variant is, so accomodating popular usage is not really so crucial. Joshua Davis 14:23, 29 March 2006 (UTC)Reply

I perfectly agree with Paul August. It is not Wikipedia's purpose to decide which is the most correct way, rather, the most used way is chosen.
Writing an encyclopedia is hard enough without us spending time on aruging which terminology is the right one. Just use the existing one. Oleg Alexandrov (talk) 16:19, 29 March 2006 (UTC)Reply
I'd like to ask Oleg: What do you mean by "existing (terminology)"? Do you mean the inconsistent text (at least 16 alternate forms) that existed before I standardized on one form? Do you mean the consistent text that existed before Paul's counter-move? Or do you mean the inconsistent text that exists now, wherein all linking articles use one term and the article itself uses another? Please don't take this as a confrontation; I'd like to know your preference. John Reid 23:06, 29 March 2006 (UTC)Reply
Existing terminology is "ruler and compass" as far as I am concerned. I am not taking it as a confrontation, but please don't stress so much that "all linking articles use one term and the article itself uses another". That is easy to fix one way or another. Let us be patient for a few days and see which way the consensus goes. Oleg Alexandrov (talk) 23:34, 29 March 2006 (UTC)Reply
At what time in the history of this project has "ruler and compass" been the standard term for this concept? It has been mentioned in many other articles, with a wide range of terms. The last time you (Oleg) edited the text of Euclidean geometry ([4]), you chose to retain the text compass and an unmarked straightedge. Did you think, then, that you were right but you think, now, you were wrong then? Or it just doesn't matter what we call it?
Don't stress the inconsistency? This is the root of the whole problem. Inconsistency makes us look like fools and amateurs. It was not easy to fix -- not one way, not at all. I spent at least 7 hours fixing links, text, and redirects. Now that I've paid for my concerns in sweat, yes, it's easy for you to run a bot -- because I brought order from chaos. Don't stress the inconsistency? If you don't think it's important what we call it, why oppose the effort to gain consistency? John Reid 04:53, 30 March 2006 (UTC)Reply
John, you seem to be conflating the issue of what we title the article with how we describe or refer to these constructions in other articles. As I tried to explain in our discussions on my talk, whatever we choose to title this article, we can describe to these constructions in different ways, in different contexts. Here is what I wrote:
Understand that I'm only talking about titles of articles here. Elsewhere, there is more latitude. For example one may choose to describe things rather than name them. So for example if I wanted to describe these constructions I might write "constructions using only a straightedge and compass" for clarity, while if I wanted to refer to them by name I might write "traditionally called ruler and compass constructions", perhaps noting what is meant by "ruler". Or if I was writing for mathematicians I would just write "ruler and compass constructions".
I don't think such variations are "inconsistent", nor do I think this make us look like "fools and amateurs".
Paul August 16:41, 30 March 2006 (UTC)Reply
To me the issues are one and the same. I think that, as a project, we should agree on one correct term for every concept and replicate it throughout all articles, much as we settle on one correct style for, say, taxoboxes. There may be exceptions, but each requires a local justification. You may not see it that way and I don't think this is the place for metaphysical argument. But I don't generally like misleading pipelinks. John Reid 03:21, 31 March 2006 (UTC)Reply
You seem to be saying "I worked my ass fixing all of those articles and links, therefore, how dare you all people argue with me?" Maybe that's not what you mean, but if that is what you mean, that's a lame way of making a point. And we are not arguing about inconsistency here, we are arguing about the most appropriate name. In short, yes, you did a lot of work, but you are also making too much fuss about it. Oleg Alexandrov (talk) 05:03, 30 March 2006 (UTC)Reply
Thank you, Oleg; you are exactly correct, although I might have put it more delicately. I paid for my preference in the only coin of value here. The more that you denigrate my effort, the less respect I have for your point of view. Sorry.
I would never have been so bold as to overturn a clear consensus of any kind if that is what I had seen. I did not. I saw a raggedy, mixed-up scatter of references to the subject, some clearly ignorant, others thoughtless. Regardless of the merits of my preference, at least I made a choice and did the work required. Now I find I'm asked to spend an equal amount of time debating the issue. My work is beginning to seem a poor investement; perhaps I should have permitted the mess to fester as it was. But if you will not do the work yourself, I ask that you allow me to do so. John Reid 23:05, 30 March 2006 (UTC)Reply

I do not see consensus here, but I have added the normal move vote format above, this page should also be listed on WP:RM, I suppose, but those of us talking about it now should probably get their chance to vote first. Septentrionalis 16:46, 29 March 2006 (UTC)Reply

I find David Kernow's preference for construction/s tempting. Of the two, construction is better; this is about the process of construction in general, more than a list of constructions. On the whole, I prefer the shorter name: it is also a direct link in phrases like can be drawn with compass and straightedge.

I am also somewhat concerned by Nightstallion's never having heard of straightedge. How general is this, do you suppose? (I don't think this should decide the issue by itself, but it is an issue.) Septentrionalis 15:13, 30 March 2006 (UTC)Reply

As someone who learned about this (twice) in undergraduate and graduate studies within the past several years, I would note that it was introduced both times as "straightedge and compass" with both professors, at different institutions, commenting on the difference between a straightedge and a ruler specifically to eliminate confusion.

I know that I am jumping in late here, but I support the more accurate title, and I think that historical precedence is an absurd reason to continue the propagation of ambiguous terminology. Marc Harper 19:54, 3 April 2006 (UTC)Reply

Discussion of List of terminology references

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It's important that we sign our own comments, but I don't think it's appropriate for us to take credit for public references in this section. John Reid 04:28, 30 March 2006 (UTC)Reply

Ok, sorry, I missed this comment earlier. I think we should at least annotate the refs though so it's easy to see at a glance what the ref's position is. --C S (Talk) 04:37, 30 March 2006 (UTC)Reply
John, I would prefer if we only added book references, preferably well-known textbooks and the like. I don't believe getting a cross section of Google hits will be nearly as helpful or representative of what may be considered "authoritative" usage. --C S (Talk) 04:43, 30 March 2006 (UTC)Reply
Annotate if you like, but Mathworld and AMM are pretty authoritative. Septentrionalis 04:56, 30 March 2006 (UTC)Reply
(edit conflict) Are we now to take this as endorsement by AMM? Or are you going to go through all AMM articles and see if one usage is preferred? A simple JSTOR search shows the Monthly lets authors use whatever term they like. --C S (Talk) 05:12, 30 March 2006 (UTC)Reply
Not endorsement by AMM; but an AMM article is a credible source, just like somebody's algebra textbook. Septentrionalis 17:34, 31 March 2006 (UTC)Reply

You missed nothing, friend. I just put it there. Thought it made sense.

I agree with you that it's wise to annotate each ref with the term chosen by the ref's author. I don't agree that web refs are automatically uncitable. I do agree that a random smattering of web refs is substandard. I chose refs such as an article published in AMM and the highly-respected and popular Math Forum at Drexel. Certainly some nutball crank in a high school in Outer Okeefenokee who happens to have a page on cube doubling is uncitable. John Reid 05:02, 30 March 2006 (UTC)Reply

See my response right above; the Monthly definitely is not endorsing a particular terminology. What if someone else decides to put another Monthly ref indicating "ruler and compass" is preferred? Where will this end? Anyway, I'm going to create a "books" subsection then. I think there are several others besides me that would find a separate section useful. --C S (Talk) 05:12, 30 March 2006 (UTC)Reply

I tabulated, retaining your division into three classes. We may argue about it, but at least we will do so neatly. John Reid 05:31, 30 March 2006 (UTC)Reply

List of terminology references

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citation preference note
Books
I Stewart: Galois Theory Ruler and Compass Had an interesting note about how in ancient Greece, they did not have access to marked rulers, so for them a ruler was just a straight edge.
Dummit and Foote, Abstract Algebra, 2nd edition Straightedge and Compass explicitly mentions the distinction between a marked ruler and plain straightedge in explaining preference for "straightedge"
Ellis: Rings and Fields ruler and compass with the text saying unmarked ruler
Isaacs: Algebra: A Graduate Course compass and straightedge.
E. Artin: Galois Theory (2nd ed) ruler and compass
Michael Artin's Algebra (1st ed) constructions with ruler and compass however the text in the section sez "Note that our ruler may be used only to draw straight lines through constructed points. We are not allowed to use it for measurement. Sometimes it is referred to as a "straight-edge" to make this point clear."
Hardy and Wright, Introduction to the theory of numbers (5th ed.) 'Euclidean' constructions, by ruler and compass discussing Gauss' construction of the 17-sided regular polygon.
Morris Kline, Mathematical thought: from ancient to modern times straightedge and compass only repeated reference
I.N. Herstein, Topics in algebra (2nd ed.), construction by straightedge and compass section with this title; repeated use of straightedge and no mention of "ruler".
M.Anderson,T.Feil: A First Course in Abstract Algebra:Rings, Groups and Fields, second edition, Chapman & Hall/CRC, Boca Raton, 2005, 673 pp., USD 89,95, ISBN 1-58488-515-7 straightedge and compass cited in Newsletter of the European Mathematical Society 59 Mar 2006 review PDF
Diggins, Julia, String, Straightedge and Shadow, Viking Press, 1965 straightedge cited by The Early Greeks Contribution to Geometry by Joseph A. Montagna of Yale-New Haven Teachers Institute. "This book was written for students of middle school age."


Journal articles
Compass and straightedge in the Poincare disk American Mathematical Monthly 108 Jan 2001, Chaim Goodman-Strauss PDF Compass and straightedge in title


Websites
The Geometry Junkyard David Eppstein UC Irvine Compass and Straightedge in subtitle; notable in that this is a broad cross-section of related pages, presumably collected by author without a narrow outlook
Geometry Construction Reference Paul Kunkel Compass and straightedge follow links to individual constructions to see each word in context
Geometric Construction MathWorld Geometric Construction in title; text includes straightedge and compass and Although the term "ruler" is sometimes used instead of "straightedge," the Greek prescription prohibited markings that could be used to make measurements.
Geometry Constructions with Compass and Straightedge Dr. Math, The Math Forum Drexel University Compass and Straightedge in title; note consistent use of this term across dozens of related Math Forum pages


Seeking consensus

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The poll seems to have stalled, with about a 2 to 1 preference for Compass and straightedge. This is not a clear consensus but neither is it a ringing endorsement of Ruler and compass constructions. Let's see if we can get together behind something.

I'd like to ask 2 questions, very different. John Reid 23:00, 2 April 2006 (UTC)Reply

1. If your support or opposition was marginal or indecisive, can you imagine any circumstance under which you might consider reversing your position or becoming fully neutral? What might that be?


2. No matter your position on the poll, please propose alternate titles for the article that satisfy your concerns.

A 2/3 majority is quite a strong endorsement for the suggested, less ambiguous title. On a related point, I have noticed that at present we have some double redirects to the article. Hopefully, if the name is changed (or if, as now seems unlikely, decided to be not changed) all redirects (of which a large number are needed) will be changed to being direct. By the way, I hope my slightly more formal section on the interpretation of geometric constructions as operations in the complex field is helpful. Further work needed includes removing some of the repetitions in other sections, and a description with a diagram (or alternatively a link) for the geometric construction for each arithmetic operation. Elroch 00:17, 3 April 2006 (UTC)Reply
The above discussion is preserved as an archive of the debate. Please do not modify it. Subsequent comments should be made in a new section on this talk page. No further edits should be made to this section.

General improvement

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At the end of the move discussion, Elroch wrote (in part): Hopefully...all redirects (of which a large number are needed) will be changed to being direct. By the way, I hope my slightly more formal section on the interpretation of geometric constructions as operations in the complex field is helpful. Further work needed includes removing some of the repetitions in other sections, and a description with a diagram (or alternatively a link) for the geometric construction for each arithmetic operation.

I went around to all linking articles and fixed all links to point directly to Compass and straightedge. I'll take a look and check to see that all are still correct and all rds direct and single.
Before the move discussion, I'd intended to finish up my work with a rewrite of this article. Now that the page is "hot", there have been plenty of edits so I'll hold off on a comprehensive rewrite; it may not be necessary with many hands on the page.
One particular plan of mine for this field is to deal with Trisecting the angle. Like Doubling the cube and Squaring the circle, this is one of the 3 classic impossible constructions. I think either one article Impossible constructions? should stand for all or each should have its own page. I intend to slim down description of these subjects in the main article, in proportion.
I can provide good graphics for any construction if someone will kindly indicate what's required. Let's get together in a corner and thrash it out. John Reid 05:00, 4 April 2006 (UTC)Reply
Ref proof of impossibility - this article is probably a good enough place to refer in general to all three. 131.107.0.106 00:21, 13 April 2006 (UTC)Reply

Great job to everyone who has been working on all the article. I will try to get some time to help out also. --C S (Talk) 16:34, 4 April 2006 (UTC)Reply

Galois theory?

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Currently the intro mentions that the proofs of impossibility of the famous classical constructions rely on Galois theory; even the Galois theory article makes this assertion. However, the proofs just rely on basic field theory with no need of Galois groups, etc. The current phrasing would even seem to take credit away from Pierre Wantzel, giving it to Galois. I think a change is needed. --C S (Talk) 16:42, 4 April 2006 (UTC)Reply

Ok, I fixed it. Hopefully it is acceptable. The page on Galois theory though now needs to be fixed. --C S (Talk) 08:29, 7 April 2006 (UTC)Reply

Approximate constructions

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It might be worth mentioning that it _is possible to solve these problems to arbitrary accuracy (just not exactly). Simlply draw a cartesian grid of whatever scale is required (if you make it fine/big enough you can get any desired level of accuracy). Only mathematicians make a distiction between "as close as you like" and exact. --Pog 15:21, 25 April 2006 (UTC)Reply

Firstly, this is an article about a topic in mathematics, not about practical drafting methods. That should really be clear from the article. Secondly, it is true but rather a minor point that approximate constructions for squaring the circle, etc, exist: approximate constructions exist for every single point in the plane, since the constructible points are dense in the plane (I have added a statement to this effect). Hence adding this note would be like adding a note in the article Rational number to say that Pi could be approximated as accurately as one wished with a rational number. This is true, but also true of all other real numbers and that wouldn't be the right place for it. Elroch 21:42, 25 April 2006 (UTC)Reply

I disagree - I think there should be some mention of this, to inform the casual reader, (without being overly technical) that compass and straight edge are at least as powerful as the rational numbers, and can be used to solve any problem to arbitrary precision. The important point is that they cannot represent all of the real numbers - so one can produce an infinitely good approximation, given infinite time, but can never produce an exact answer in the strictly mathematical sense (because they lack the expressive power in the same way as the rational numbers cannot express the exact solution).

"Extended constructions" section

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Shouldn't this be moved to the "Constructible Number" article, since they have little to do with compass and straightedge directly?

Whether moved or not, the second sentence in the section on marked rulers is completely obtuse. Someone who understands it in detail should just yank this particular sentence and rewrite it wherever it belongs. "This would permit them, for example, to take a line segment, two lines (or circles), and a point; and then draw a line which passes through the given point and intersects both lines, and such that the distance between the points of intersection equals the given segment." Between which points of intersection -- all three? How does a distance "equal" a segment? Can we stop jamming "for example" appositives everywhere they are grammatically legal? (140.232.0.70 (talk) 21:47, 14 January 2011 (UTC))Reply

"Constructible Angles" section

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Shouldn't this define what is meant by an angle of finite order or link to a definition? --OinkOink 13:52, 18 July 2006 (UTC)Reply

Constructing with only ruler or only compass

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A further generalisation of this theorem (due to K. Venkatachala Iyengar) gives constructions using only a ruler given a point and five distinct points equidistant from it.

This is false - for example, given (0,0), (0,1), (0,-1), (1,0), (-1,0), and (1/√2,1/√2), the points that can be constructed with only a straightedge have coordinates in Q[√2]. Even supposing specific special points (x1,y1), ..., (x6,y6) (rather than arbitrary points), all points constructible with only a straightedge would have coordinates in Q[x1,y1,...,x6,y6], which cannot capture the closure of Q under square roots (which is what ruler and compass can construct).

I suspect that this false generalisation is due to a misinterpretation of another result - given those 6 points, one can construct arbitrarily many points of the circle given by those 5 equidistant points, as well as its center. If one actually had the circle and its center, that would be enough, but having arbitrarily many points on it isn't.

David.applegate 18:33, 9 August 2006 (UTC)Reply

Origami

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The brief plug to Mathematics of paper folding under impossible constructions is poorly worded. It needs to be brought up to the level normally present on Wikipedia. --Whiteknox 01:39, 17 November 2006 (UTC)Reply

Newton

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Obsessed as he was with a belief that gravity was known to the ancients, Isaac Newton used a compass and straightedge construction to illustrate his theory of gravitation, rather than the fluxions he had invented (differential equations), which would have been more natural. He chose this more awkward method so as to demonstrate that the theory would have been accessible to the ancient pythagorans, unaware that Archimedes had infact known of greatly more advanced analytical geometric methods.

Unsourced; and largely false. Archimedes' more "advanced analytical method" was the Method of exhaustion, which Newton knew about, and used; it's in Euclid. Newton published his results with Euclidean proofs because these proofs were, and were understood to be, rigorous; Newton's fluxions were not, and would become so for another two centuries. Septentrionalis PMAnderson 19:03, 20 February 2007 (UTC)Reply

In my long-lost undergraduate days, I came across a sourcebook with an interesting letter from Newton in which he defined what we now know as the derivative with *exactly* the "modern" notion of a limit (given verbally, but precisely). It's bizarre that this took centuries to be rediscovered.--OinkOink 21:22, 20 February 2007 (UTC)Reply

Featured Article

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Do you think that the article is ready to become a featured article? Tomer T 18:44, 23 March 2007 (UTC)Reply

Sections on Constructible points and lengths and Compass and straightedge constructions as complex arithmetic

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These two section appear to have almost identical content. Should they be merged? --Salix alba (talk) 23:37, 10 May 2007 (UTC)Reply

I absolutely agree that they should be merged. Compass and straightedge constructions as complex arithmetic seems a touch more understandable to me, BTW. Root4(one) 16:13, 15 May 2007 (UTC)Reply

General Tone

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IMO, this article spends most of its time reviewing (a) what can't be done and (b) complicated proofs of this and complicated proofs of some thinghs that can be done. It appears to lack almost completey a review of what can be done and of how to do (some) of these constructions. I was tempted to add the following (next para) but thought I'd put it here for comment first.

"An example of a simple achievable construction is to divide a line into two sections of ratio 1 : N (integer). First construct perpendicular lines at each end of the target line, next construct, with the compass, one target line length 'down' on the 'left' and N target line lengths 'up' on the 'right'. Join the two resultant points for a 1:N intersection."

-- SGBailey (talk) 23:10, 31 May 2008 (UTC)Reply

About the definition of "straightedge"

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"Infinite in length and only having one side." Isn't that physically impossible? 207.62.186.233 (talk) 02:59, 3 June 2008 (UTC)Reply

Information-free example

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The fourth paragraph of the introductory section reads as follows:

"The most famous ruler-and-compass problems have been proven impossible in several cases by Pierre Wantzel, using the mathematical theory of fields. In spite of these impossibility proofs, some mathematical novices persist in trying to solve these problems. Many of them fail to understand that many of these problems are trivially solvable provided that other geometric transformations are allowed: for example, doubling the cube is possible using geometric constructions, but not possible using ruler and compass alone.."

Regarding the end of this last sentence: If an example is offered, it should be given, not withheld. Doubling the cube is "possible" using what geometric constructions?Daqu (talk) 23:01, 26 March 2009 (UTC)Reply

Do you see how the text "doubling the cube" in that sentence appears in blue, perhaps with an underline? That means that you can click on it, and read in detail about the problem of doubling the cube. In that article there is a section titled "Solutions" that answers your question. —Dominus (talk) 06:36, 28 March 2009 (UTC)Reply

Reviving name debate

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The discussion on moving the article seems to have stalled a while ago with no decision. As a purely practical matter, it's usually much easier to make a link to the article when the article name is singular.--RDBury (talk) 05:40, 27 June 2009 (UTC)Reply

Incorrect proof

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Moved this here from the article:

Suppose an algorithm that gives you a point as a result. The point will always be given by intersection of two lines (or line and circle or two circles. See previous elemental operations), but there are infinite points in a classical euclidean space.
Regardless of the algorithm we use, we can only perform a finite number of steps. Therefore, no matter what algorithm we use to determine them, there will always be points that we cannot mark by crossing of two lines (same holds if we mark the point as intersection of a line and a circle, or of two circles)


This sounds nonsensical to me. A finite (but unbounded) number of operations can certainly produce an infinite number of possible points. All rational points on the plane can be constructed, even though there are infinitely many of them. The real impossibility proof is that the number of constructible points is countably infinite but there are uncountably infinitely many reals. If anyone wants to write it up, go for it. Arvindn (talk) 18:17, 1 September 2009 (UTC)Reply

60 degree angles

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Is it mentioned anywhere how to construct 60 degree angles? It is one of the simpler constructions. SharkD  Talk  04:03, 28 November 2009 (UTC)Reply

Trisecting a segment with ruler and compass.

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thumbnail doesn't seem to animate, tho the gif itself does. --Arkelweis (talk) 07:54, 28 February 2011 (UTC)Reply

Recent (?) Results

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I would like to call into question the value of this section. First, the paper referred to is now 14 years old ... not particularly recent in my mind, so I find the section title a bit misleading. The section has been in the article since Sept. 2002, with no change in content (but there have been minor changes in how the reference is given). The single sentence is pure hype and does not add anything to the article. On the basis of Wikipedia:Notability I would say that the section should be struck. In support of this I note that according to Math Reviews, the paper that this section references has never been cited by any other mathematical article. As a Wikipedia editor I should not be commenting on the quality of referenced sources, but as a working mathematician I feel the need to point out that there are professional standards for published mathematical works and the paper being talked about fails to meet those standards in many ways. The fact that the author of the paper is also a founding editor of the journal in which this paper appears may explain how it got published in the first place. Comments? Bill Cherowitzo (talk) 03:33, 1 April 2012 (UTC)Reply

Three dimensions?

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Is there any analogous model where instead of limiting the compass and straightedge constructions to a single 2D plane, that we instead use them on a number of intersecting 2D planes in 3 dimensional space?siNkarma86—Expert Sectioneer of Wikipedia
86 = 19+9+14 + karma = 19+9+14 + talk
05:25, 19 December 2012 (UTC)Reply

Replacing circles with spheres so you look at points where lines or spheres intersect is the obvious extension. However you still don't get anything beyond doing square roots. Dmcq (talk) 10:51, 19 December 2012 (UTC)Reply

Bad move

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I've checked Google books and only found two instances of the name with hyphens in instead of spaces. Therefore this new hyphens name is not a common name and the article should be move back to its old title. Dmcq (talk) 22:43, 23 May 2013 (UTC)Reply

I did the checking by putting "compass-and-straightedge" with the quotes into Google Books. I did not do any special checking that hyphens were inappropriate and therefore an entry should be ignored. If some demonstration can be made that there is some criteria I should use which is better and changes the statistics enough to favour the hyphens from the 2% I found I'd like to see it. Dmcq (talk) 14:52, 24 May 2013 (UTC)Reply

I just did a check using "straightedge-and-compass construction" on Google Books and that did bring up the hyphens somewhat. There were six without hyphens and four with on the first page, the first five did not have a hyphen. It was 9 hyphens and 20 without and one I couldn't tell on the first three pages. Dmcq (talk) 16:14, 24 May 2013 (UTC)Reply
Just noticed I used "straightedge and compass construction" instead of "compass and straightedge construction". In fact straightedge and compass construction came up 1560 times on Google books but compass and straightedge construction only came up 900 times.
I think on this evidence the article should be titled "Straightedge and compass construction" rather than "Compass-and-straightedge construction". Dmcq (talk) 16:22, 24 May 2013 (UTC)Reply
I was also jarred by this move and did a little investigation myself. I have certainly seen the hypenated version but only rarely and a quick pass through my bookshelf did not turn up any instances of it. I also looked for the ruler and compass version with or without hyphens. The variations may be due to some grammatical rules (and I am no expert on those). The hyphens make straightedge-and-compass a compound noun, denoting a class of constructions, but one can also refer to the tools used in such a construction, in which case the hyphens should not appear. In using the compound noun, one can say that construction X is a straightedge-and-compass construction, but this article is concerned with straightedge-and-compass constructions. When the move was made, there were two changes, the hyphens were added and constructions was singularized. I think that the title should either be hyphenated with constructions, or no hyphens with construction. Bill Cherowitzo (talk) 18:11, 24 May 2013 (UTC)Reply
Well I think we should just follow WP:COMMONNAME unless it comes up wit something really stupid. Dmcq (talk) 19:33, 24 May 2013 (UTC)Reply
The usual rule for hyphens is to include them between words that together form a single adjective for something else in the sentence, and to leave them out when the words form a noun phrase that's not functioning as an adjective. For example, "a high-school opera" ("high-school" functions as an adjective for "opera") but "an opera performed in high school" ("high school" is a noun, the object of "in"). Similarly, "compass-and-straightedge constructions" but "constructions made with compass and straightedge". —Ben Kovitz (talk) 14:48, 25 May 2013 (UTC)Reply
Maybe but it doesn't follow WP:COMMONNAME that I can see and that is part of a Wikipedia policy. Is there a good reason to prefer grammar to common name in this instance? Also straightedge and compass construction is more common in books than compass and straighterdge construction. Dmcq (talk) 16:09, 25 May 2013 (UTC)Reply
I think including the hyphens follows the ordinary rules for punctuation, and forms the common name. Or am I misunderstanding you? I don't have an opinion (yet) on whether "compass" or "straightedge" customarily comes first. I'll do a little googling and see if my results agree with yours. —Ben Kovitz (talk) 16:21, 25 May 2013 (UTC)Reply
Googling books is what I did so please go ahead and check for yourself. I understand common name as meaning the name that is more common as written down in the major reliable sources rather than the name that follows grammar or is otherwise official in some way. Dmcq (talk) 16:27, 25 May 2013 (UTC)Reply
"compass and straightedge constructions" came up with 2250 books, and "straightedge and compass constructions" came up with 2,660. The books in the first couple pages of the latter seem more authoritative than the former: Springer-Verlag, etc. In the first 19 books in the straightedge-and-compass group, about a third had hyphens and two-thirds didn't. —Ben Kovitz (talk) 19:03, 25 May 2013 (UTC)Reply
More results from Google books: "compass and straightedge construction": 832 books, 4 out of the first 20 with hyphens. "straightedge and compass construction": 1,560 books, earliest hits from more-authoritative publishers, 6 out of the first 19 with hyphens.
Here's what I think is going on regarding the hyphens: While the hyphenated version clearly follows standard English punctuation for compound attributive nouns, sometimes copyeditors omit the hyphens when they seem unwieldy and there's no real ambiguity. This happens especially often in titles.
Personally, I find the version without hyphens jarring because it leads to a "garden-path" interpretation after "compass and". I'd prefer to stay with the hyphens. —Ben Kovitz (talk) 05:44, 29 May 2013 (UTC)Reply

Well I think that established 'Straightedge and compass construction' as a preferable title for Wikipedia, but should we even include the 'construction' bit? It seems a bit unnecessary to me and people more often just say something like 'using straightedge and compass'. Dmcq (talk) 13:38, 27 May 2013 (UTC)Reply

I think "construction" is definitely necessary in the title. It's part of the standard terminology of geometry, which distinguishes constructions from proofs. —Ben Kovitz (talk) 05:21, 29 May 2013 (UTC)Reply

polygons

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An alternate method for constructing polygons is by taking any two sides of a right-angle triangle as radii of a circle & its sectors,some of the results will be apeiroga,but most give good results.AptitudeDesign (talk) 08:53, 21 April 2014 (UTC)Reply

Needs history section

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Unless I missed something, the article currently contains no history prior to Gauss, except a brief mention that a proposition of Euclid's implies that it doesn't matter whether a compass is collapsible, a brief statement that the requirements can be expressed in terms of Euclid's first three postulates, and the dubious statement

The following three construction problems, whose origins date from Greek antiquity, were considered impossible in the sense that they could not be solved using only the compass and straightedge.

(I thought they kept trying rather than assuming impossibility--is that not right? The above assertion needs a citation.)

I think it would be worthwhile to have a history section that answers:

  • Did the ancient Greeks come up with the requirements of a straightedge and compass construction? In what context?
  • What lengths, angles, and figures could they construct? (E.g., could they do the regular pentagon? Did they think that all regular polygons ought to be constructible?)
  • What did they say about squaring the circle, doubling the cube, and trisecting the general angle? Did they think that these could be solved? Which trisectible angles did they know how to trisect?
  • How much of the above shows up in Euclid, and where?

Loraof (talk) 19:17, 11 January 2015 (UTC)Reply

I found a source and got a good start on a history section, but it needs to be beefed up with more material and more sources. Loraof (talk) 22:40, 11 January 2015 (UTC)Reply

Add a section " much used constructions" (name open for discussion)

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Could we make a section with much used constructions, so that readers have some directory linking to much used (but not bascic) constructions, I know the list should not be to long or maybe a seperate page for a longer list. but on this page a list refering to "midpoint of segment", "angle bisector" , "mirror point in line" and maybe 7 more is in order.WillemienH (talk) 08:55, 8 June 2015 (UTC)Reply

Unit distance graphs

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I have just removed an addition dealing with unit distance graphs. The quoted result says that for any algebraic number there is a graph (in the Euclidean plane) with a pair of vertices at this distance for any unit distance graph representation. If this was related to compass and straightedge constructions, it would be saying that all algebraic numbers are constructible - which is clearly false. If I am somehow mistaken, the section would have to indicate how it is related to the topic of this article before being replaced. Bill Cherowitzo (talk) 04:01, 26 November 2015 (UTC)Reply

Yes all algebraic numbers are constructable using unit-distance-graph constuructins. And yes unit-distance-graph constuructins is a type of geometric constructions (not worse that origami-constructions). --Tosha (talk) 12:54, 27 November 2015 (UTC)Reply
Then this is not constructible using straightedge and compass and so doesn't belong in this article. Perhaps Constructible number would be a better place for it. Bill Cherowitzo (talk) 13:25, 27 November 2015 (UTC)Reply
Yes that doesn't belong here, it is too general and unrelated, but a construction using linkages with no sliders would and that is practically the same thing. See [5]. I like the name isoklinostat too :) Dmcq (talk) 13:57, 27 November 2015 (UTC)Reply
F. Klein described another linkage machine in his "Famous problems of Elementary Geometry" (? - not sure I got that right, I'm not at home) that can do this as well, and we already have a page on it (sorry, don't remember the name). Perhaps we can extend this section to include these and the unit graph result. My earlier suggestion was made without looking at that page and I didn't realize that it was so limited. Bill Cherowitzo (talk) 19:39, 27 November 2015 (UTC)Reply
The difference with origami is there is an explicit construction for trisecting an angle at the article pointed at as an important part of the whole business, see Mathematics of paper folding#Trisecting an angle. The straightforward axioms can deal with cubics but not more complex polynomials. Dmcq (talk) 14:20, 27 November 2015 (UTC)Reply
It is mentioned in "Extended constructions", and it is an extended constructions. Yes it is related and yes it is quite general. By the way, if one consider multiple folds in origami constructions then you also get all algebraic numbers. I will undo your edits. Next time please discuss first. --Tosha (talk) 11:27, 28 November 2015 (UTC)Reply
You do not get all algebraic numbers with the Huzita–Hatori axioms for origami. The original research policy WP:OR says says in its nutshell "Articles may not contain any new analysis or synthesis of published material that serves to reach or imply a conclusion not clearly stated by the sources themselves." For the origami trisection there is a citation in the Mathematics of paper folding article explicitly talking about trisecting angles in origami and giving the construction and there's other citations which could be given giving the connection to the axioms if you'd like citations here. The linkage constructions I and Bill Cherowitzo mentioned above talk explicitly about trisecting and they do everything necessary and relevant as far as this article is concerned compared to that general paper. And it is normal to not put things back in but discuss it first when you are in a minority about the insertion. Dmcq (talk) 13:44, 28 November 2015 (UTC)Reply
1. you should read carefully what I wrote (I did not say that get all algebraic numbers with the Huzita–Hatori axioms for origami). See for example Theorem 1 in One-, Two-, and Multi-Fold Origami Axioms by Alperin and Lang.(In particular this is not original research) 2. I asked you to discuss before making changes, I think you should do it next time. (Note that it is not me who started this "war".) 3. For the rest I gave the answers already --- I will wait couple of days and undo you changes. I am 100% sure think this type of construction worth to be mentioned here. --Tosha (talk) 17:00, 29 November 2015 (UTC)Reply
I was aware you could get the further shapes if you extend those origami axioms but it isn't so easy to do them and there is no straightforward connection to trisecting. The basic axioms do that fine and there are citations for it. The thing you have to do to get any further here is get a citation directly linking unit graphs and trisection. And really I can't see why you are going on about that here, the linkages do the job straightforwardly and pretty much equivalent in idea and more to the point there are citations showing the link. No we don't leave things in if it is obvious they don't belong and there is consensus about that.Dmcq (talk) 18:25, 29 November 2015 (UTC)Reply
Dmcq Could you provide some reasons, why you object to include the linkage-construction? So far I did not see any. Please make it clear, maybe number them and either I will agree or I could explain what is wrong with them. (At the moment our discussion goes nowhere). --Tosha (talk) 22:38, 2 December 2015 (UTC)Reply
I do not object to a trisection linkage which has a good relevant citation. The classical impossible constructions are an important part of the article and there are citations talking about compass and ruler and the classical problems and directly connecting linkages with those. I do object to putting in things which don't mention a direct connection, that paper doesn't mention compass or ruler or anything like that. The WP:OR policy says we should not put things like that into articles. You should not be trying to push things like that in here unless somebody in the world at large has thought it worthwhile to publish a connection. I have explained this before, you seem to deny that is a real reason but it is pretty fundamental to Wikipedia.
If you really feel the need to stick that citation into some article you should find an appropriate article or set one up. An article on the various types of points that can be constructed using different axioms would be a notable topic I think - for instance subsets of Hilbert's axioms of Geometry allow one to generate various interesting subsets of the ones that can be constructed using compass and ruler and there's other constructions that lead to wider fields like the one with unit distances you found. I can't find an appropriate article on a quick search but there probably is one or one could be set up easily. It could include for instance the ones where   can be got but not   and such an article would be fine for a unit distance graph. Dmcq (talk) 02:24, 3 December 2015 (UTC)Reply

linking to euclidea

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I did like the link to [www.euclidea.xyz/game] Euclidea an online compass and straightedge construction game that was added 18 march 2016, but was removed soon after with as reason (revert - rm promotional link; this is not a web directory) I did like the link and would like it reinstated, because it is related , I like it (but that is personal and is not within the scope of Wikipedia:NOTDIRECTORY. Also I would like to add a link to [6] but that would have I guess the same result. WillemienH (talk) 18:36, 18 March 2016 (UTC)Reply

Doesn't seem to be add anything to the topic, it is just a nice game. Unfortunately I agree it comes under not a directory. Dmcq (talk) 00:06, 19 March 2016 (UTC)Reply

Basic Constructions

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Euclid seems to have had a broader view of what a "construction" is than this. For example, proposition 3.1 constructs the center of a circle from the circle. That can't be done with the basic constructions because there are no intersections to make a point from and no points to make a line or circle from. However, Euclid does it by drawing a chord through the circle at random, relying on the fact that the construction works no matter which chord one draws. Perhaps the definition of construction has changed? — Preceding unsigned comment added by Mrperson59 (talkcontribs) 23:04, 7 September 2018 (UTC)Reply

While there are certainly problems with Euclid's "proof" in III.1, I don't see where your objection is coming from. The circle has to be given (determined) in some manner, and Euclid does this by talking about the circle through the three points, A, B, C. Yes, that choice is arbitrary, but it is not part of the construction, rather it is part of the given. There is no aspect of the construction that uses random elements. --Bill Cherowitzo (talk) 03:53, 8 September 2018 (UTC)Reply
The other possibility is that the circle is determined by a center and a radius - but in that case one already has the center and so here is no need to construct it. Dmcq (talk) 09:17, 8 September 2018 (UTC)Reply

Move to 'Straightedge and compass construction'

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No move was done after the discussion at #Bad move where it seems 'Straightedge and compass construction' is more common. Also the version without hyphens seems more common but seems to occur about a third of the time. Any objections to a move now? Prefer hyphens? Dmcq (talk) 09:54, 8 September 2018 (UTC)Reply

I'd favor the move to "Straightedge and compass construction" (no hyphens). In analogy with the technically incorrect, but still common, ruler and compass construction, there are no hyphens and putting compass first is somehow jarring. I believe that this is a case where the rules of grammar are being ignored in favor of common practice, and we should follow suit. --Bill Cherowitzo (talk) 18:34, 8 September 2018 (UTC)Reply

From whence the restriction?

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The History section doesn't explain the origins of the compass and straightedge restriction, nor does it distinguish between eras in which the restriction was considered absolute and eras where constructions using other tools were considered legitimate but less aesthetic, less fundamental or otherwise second class. Shmuel (Seymour J.) Metz Username:Chatul (talk) 13:35, 20 May 2021 (UTC)Reply

== Regarding Doubling the cube: Is it still impossible? ==

This is the first time I have contributed anything to Wikipedia besides donations, so I'm not sure what exactly I'm doing here. And I am not a mathematician for sure, but I wanted to at least point out something in this article that may no longer reflect current knowledge. The latest Scientific American Magazine (October 2021 Volume 325, Issue 4 [7]) features an article on math entitled "Infinity Category Theory Offers a Bird's-Eye View of Mathematics"] [8] by Emily Riehl which seems to indicate that it is now possible to construct "with an imaginary straightedge and compass, of a cube with a volume twice that of a different, given cube".

Just trying to make Wikipedia better in my own diminutive way. I'll check back to see which part of subterranean garbage this post has been banished to bc that's how I learn. Thanks. Glenn Wiens GAWiens (talk) 06:25, 20 October 2021 (UTC) Reply

Please disregard my entry as it isn't relevant to the matter at hand. My bad - I'll stick with conventional contributions in the future. GAWiens (talk) 00:48, 22 October 2021 (UTC)Reply
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Article could use some cleanup, many external links have gone bad. I'd do it myself but I'm not a member so I don't know how to mark them and I don't want to start removing unsourced material if it can just be redirected to a different source. 2601:14F:8000:B3B0:0:0:0:5733 (talk) 20:45, 1 June 2024 (UTC)Reply