Difference between revisions of "Jadhav Triads"
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| − | + | Jadhav Triads are groups of any 3 consecutive positive numbers which follow a pattern, discovered by Jyotiraditya Jadhav. | |
| − | Jadhav Triads are | + | |
== Statement == | == Statement == | ||
| − | If any 3 consecutive numbers | + | If any 3 consecutive numbers a, b and c are taken then the square root of the product of the first and the third number will be approximately equal to the middle term or the 2nd term. |
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| − | + | Variable format : | |
| − | + | * <math>\sqrt{ac} ≈ b</math> | |
| − | + | * <math>\sqrt{αγ} ≈ δ</math> | |
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== Applications == | == Applications == | ||
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== Notable Error == | == Notable Error == | ||
| − | It is found that the square root of the product may | + | It is found that the square root of the product may differ to maximum of 0.3 from actual middle number, but this is negligible unless talking about big units such as meters. |
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| − | + | {{delete|lacks notability}} | |
Revision as of 16:25, 14 February 2025
Jadhav Triads are groups of any 3 consecutive positive numbers which follow a pattern, discovered by Jyotiraditya Jadhav.
Statement
If any 3 consecutive numbers a, b and c are taken then the square root of the product of the first and the third number will be approximately equal to the middle term or the 2nd term.
Variable format :
- $\sqrt{ac} ≈ b$ (Error compiling LaTeX. Unknown error_msg)
- $\sqrt{αγ} ≈ δ$ (Error compiling LaTeX. Unknown error_msg)
Applications
Can be used to find approximate square roots of the numbers which are also the product of numbers which differ by 2.
Notable Error
It is found that the square root of the product may differ to maximum of 0.3 from actual middle number, but this is negligible unless talking about big units such as meters.
| This article has been proposed for deletion. The reason given is: lacks notability
Sysops: Before deleting this article, please check the article discussion pages and history. |
