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Similar triangles and proofs

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I don't have explicit literature reference at hand right now, but I think it should be mentioned that similar triangles are (or rather provide) an important proof technique in elementary geometry.--Kmhkmh (talk) 14:01, 11 April 2018 (UTC)[reply]

Added something. You may want more. --Bill Cherowitzo (talk) 23:20, 11 April 2018 (UTC)[reply]

Some results based on the triangle similarly

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1. If two angles are equiangular, then the ratio of the corresponding sides is same as the ratio of the corresponding medians.

2. If two angles are equiangular, then the ratio of the corresponding sides is same as the ratio of the corresponding angle bisector segments.

3. If two triangles are equi, then the ratio of corresponding sides is same as the ratio of the corresponding altitudes.

4. If one angle of a triangle is equal to one angle of another triangle and the bisectors of these equal angles divide the opposite side in the same ratio, then the triangles are similar.

5. If two sides and a median bisecting one of these sides of a triangle are respectively proportional to the two sides and the corresponding median of another triangle, then the triangles are similar.

6. If two sides and median bisecting the third side of a triangle are respectively proportional to the corresponding sides and the median of another triangle, then the two triangles are similar. Huzaifa abedeen (talk) 16:32, 18 February 2021 (UTC)[reply]

Lines?

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Can Lines (or line segments, or "sides" of a figure) be said to be "similar"? Usually it seems the word "proportional" is just used. But if curves (like parabolas) are described as being similar, it seems that all line segments must be similar. The lead paragraph just uses the word "objects" as what similarity applies to, and later in the article it says it applies to "polygons", and "curves". But what about lines (line segments, & "sides" of figures)? Limitations of what the term properly applies to is not clear, but lines (segments) aren't mentioned in the lists/examples. DKEdwards (talk) 02:10, 16 November 2021 (UTC)[reply]

I have added lines and line segments to § Similar curves. I have also clarified in the lead that congruent shapes are similar (this applies to lines but not to line segments). D.Lazard (talk) 10:17, 16 November 2021 (UTC)[reply]
(straight) lines and line segments on their ownare always similar (contrary to other curves), which is probably the reason it wasn't mentioned specifically as similarity in this case is automatically given and loses its distinguishing feature.--Kmhkmh (talk) 13:40, 16 November 2021 (UTC)[reply]

Example of coefficient on a new image

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Example of similarity that multiplies areas by 5.  Its coefficient is 

I propose to illustrate the current section titled “Ratios of sides, of areas, and of volumes” 
with the present image.
  Arthur Baelde (talk) 13:47, 14 January 2022 (UTC)[reply]

This triangle partition seems very specific to this triangle and this similitude ratio. So, instead of clarifying the concept, it may confuse non-mathematicians. I am against to add this image. D.Lazard (talk) 14:34, 14 January 2022 (UTC)[reply]
What specificity?  We are not in considerations of the article “Square‑cube law”.  We have to say neophytes that a similarity is an object of pure mathematics.  Its coefficient cannot always be written as a scale in percent like displayed by a machine that prints onto papers.  Of course I thought of √2 among irrational square roots of integers.  But isosceles right triangles are all similar,  and anyone will know one fine day the story that multiplies an area of square by 2,  if interested in mathematics.  And then I thought of a triangular tiling that would be √3 times as large as each element of tiling:  a right triangle having a 60 degrees angle.  But if we are moving away from √2,  we might as well choose √5.  Notice I am not the inventor of this kind of tiling,  the article could include a link to “Pinwheel tiling”.
  Arthur Baelde (talk) 10:42, 15 January 2022 (UTC)[reply]
Example of similarity that multiplies areas by 5
.Its coefficient is
You may prefer one equality only on the new image,  instead of three.  So here is on the right a possible version to insert in the article.
  Arthur Baelde (talk) 14:24, 18 January 2022 (UTC)[reply]
The first image in Pinwheel tiling is much clearer and much more aesthetic. It is thus more convenient for illustating the section on triangles. D.Lazard (talk) 15:24, 18 January 2022 (UTC)[reply]
Here you are talking about the first section,
so I repeat.  I propose to illustrate the fifth section titled “Ratios of sides, of areas, and of volumes”,   with one or the other image here presented.
  Arthur Baelde (talk) 17:53, 18 January 2022 (UTC)[reply]
The relationship of your image with this section is really unclear, and this makes the image unsuitable. Here, it is the square-cube law that deserves to be illustrated. A good choice would be an image of a Rubik's Cube, with the explanation that it is formed with cubes, counting the non-visible interior cube. D.Lazard (talk) 18:47, 18 January 2022 (UTC)[reply]
You look like someone who does not understand.  First I propose a square, not a cube.  Later perhaps we could include a more difficult three‑dimensional example.
  Arthur Baelde (talk) 14:12, 19 January 2022 (UTC)[reply]
A  similarity  of  ratio  2  multiplies  areas
by  Another multiplies areas by 5,

An infinite tiling can be contructed
from this triangular tessellation.

An equality such as  a/b = c/d ,  scarce in the current article,  is written in this improved drawing  ,  conceived with the present caption  for the section about area ratios   and volume ratios.  I'm finally ready to insert it.  Do you agree?
  Arthur Baelde (talk) 15:57, 15 March 2022 (UTC)[reply]

Against an obstructionism

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An  image  that  disturbs  D.Lazard.

The only one to answer me on the talk page had straight away blocked the discussion,  about an image proposed for the article.  At 14:34, 14 January 2022,  he wrote:
This triangle partition seems very specific to this triangle and this similitude ratio…
In other words, the only flaw of my example was to be an example.

At 18:47, 18 January 2022,  he argued that:
The relationship of your image with this section is really unclear, and this makes the image unsuitable…
So my example so specific ceased suddenly to be an example for the indicated section,  now titled “Area ratio and volume ratio”.  This utter contempt for the most elementary logic could have discouraged me from replying.

My opponent's inconsistency ended up being a luck when he inserted,  in the first section of article,  a ressembling image I had quoted.  I had been then careful not to criticise his ironic contribution on the talk page,  contenting myself to write,  at 17:53,  18 January 2022:
Here you are talking about the first section
so I repeat.  I propose to illustrate the fifth section…

Later I put on hold the semblance of discussion about my own image, and without writing any more on the talk page, I announced the deletion of the opposing image by correcting its caption at first.  And then I took advantage of the removal of the bad image to create the section titled “Similarity with a center”,  and insert two drawings there without having warned on the talk page.

Finally I inserted my image,  with slashes as fraction strokes in the caption like on the right.  I got three successive refusals of this caption.

  1. The similarity of ratio 2 is no more mentioned.
  2. Same refusal.
  3. Third refusal.

In short,  I am going to enhance the section despite D.Lazard,  upset to see my image inserted and eager to impoverish its caption.  Later he had also happened, more aggressive, to be surrounded by two ironic fellows, in order to delete several of my images here or there.
  Arthur Baelde (talk) 12:16, 21 February 2023 (UTC)[reply]

Apparently, you have not yet undeerstood what Wikipedia is (see WP:About) and what Wikipedia is not (see WP:Not). Also, the tone of this post shows that ignore the five pillars, and the fourth one in particular (WP:5P4).
As Wikipedia is a collaborative work, eveery change requires a consensus among editors. It is normal and very common that some autors disagree. In such cases, several dispute resolution methods have been established, which are described in WP:BRD. Also, when no consensus is reach, this is the previous stable version of the article that prevails. D.Lazard (talk) 14:30, 21 February 2023 (UTC)[reply]

Nothing on this talk page about your wrong deed in the article,  so my only reference will be what I read on the history page:
 Reverted 3 edits by Arthur Baelde (talk): Wrong (a ratio does not requires the defintion of a unit). Unsourced.. In any cse, such a major change requires a consensus on the talk page 

  1. I read nothing on the history page about my first contribution.  I deduce you agree to the insertion of my SVG image and its caption.
  2. In my comment of the image,  here is the first sentence:
     Mathematical writings and reasonings about sizes presuppose a unit is chosen.   You wrote  Wrong  on the history page,  because your mind hastily replaced “sizes” with “ratios”.  Yet you really agree that all our ratios don't depend on a length unit.  So your refusal of my second contribution is irrelevant.
  3. On the history page I read nothing about the article hierarchy.  I deduce you agree to my third contribution.
Another  alarming  image
for  my  opponent  D.Lazard.

I  think  you  could  have  written  as  justification:
 “ deletion  of  3  successive  contributions  all  equivalent  for  me ” 
I am going to restore my work and improve my comment.
  Arthur Baelde (talk) 13:26, 1 March 2023 (UTC)[reply]

Please, read WP:BRD again, and respect Wikipedia rules. If you continue to edit warring, you may be blocked for editing Wikipedia. D.Lazard (talk) 14:17, 1 March 2023 (UTC)[reply]
Please,  read again the Wikipedia rules.  You flouted this rule extracted from Wikipedia:BOLD, revert, discuss cycle:
Revert an edit if it is not an improvement,  and only if you cannot immediately refine it.
  Arthur Baelde (talk) 14:56, 1 March 2023 (UTC)[reply]