Talk:Vedic square

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hi vedic squares are great u should like totally go to tgs to go and learn about them go and try thrm any day u want on here come and have a look plz plzzzzz —Preceding unsigned comment added by 82.35.174.78 (talk) 16:47, 12 September 2008 (UTC)Reply

What should the article ultimately involve?

Latest comment: 14 years ago1 comment1 person in discussion

I mostly came across this article by accident but I think it's got some serious potential, and is just requiring the attention of someone who really knows what they are talking about. I think when this article is complete it should have a structure something like:

• introduction+example
• Geometric properties
  • The Vedic Square in Art
• Algebraic properties
  • Generalisations
• References etc

Although there may be more topics deserving of a mention than I realise. Where do you see this article going - how much do you reckon it should involve? --Paul Carpenter (talk) 12:55, 25 September 2009 (UTC)Reply

Very Big Concept

Latest comment: 14 years ago2 comments2 people in discussion

This is called Group Theory & this is very easy to understand Modulle concept. I want to highlight some operations in given example it says that o but actually this is called operations which we need to perform on the figure.

A group is a set G, together with an operation '*' that combines any two elements a and b to form another element denoted a * b, then this is formed called (G,*)satisfy below requirement called Group

Operation 1--> Closure For all a, b in G, the result of the operation a * b is also in G

Operation 2--> Associativity For all a, b and c in G, the equation (a * b) * c = a * (b * c) must satisfy

Operation 3-->Identity element There exists an element E in G, such that for every element a in G, the equation E * a = a * E = a

Operation 4 -->Inverse element For each a in G, there exists an element b in G such that a * b = b * a = E, where E is the identity element

If anobody have any qestions or concern please mail me on nitu612@gmail.com

Thanks, Nitin Lawand —Preceding unsigned comment added by 167.88.178.70 (talk) 11:01, 7 May 2010 (UTC)Reply

I'm not entirely sure how this is relevant to the article in question - the article actually mentions how the vedic square forms a semigroup but not a group. Paul Carpenter (talk) 16:23, 9 May 2010 (UTC)Reply

Change colour scheme

Latest comment: 1 year ago1 comment1 person in discussion

 

Digital roots with similar patterns are coded with similar hues

Does the current colour scheme for shading the digital roots have any significance? If not, may I suggest changing it to one in which the digital roots with similar patterns (simply rotated 90°) have similar colours? I've chosen

• Red for 1 and 8: the most prominent colour for the "ellipses"
• Blue for 2 and 7: a less prominent colour for the simplest pattern
• Green for 3 and 6: to match yellow for some Vedic cube slices
• Grey for 4 and 5: the least prominent colour for the "arcs"
• Yellow for 9: it has no complement and dark yellow looks off)

as in the attached image, but am open to suggestions for change.

Cheers,
cmɢʟee⎆τaʟκ 16:14, 11 January 2023 (UTC)Reply