# Difference between revisions of "Jyotiraditya Jadhav"

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<math>\surd ac \approx b </math> | <math>\surd ac \approx b </math> | ||

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+ | '''[[Jadhav Angular Formula]]''' | ||

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+ | Jadhav Angular Formula evaluates the angle between any two sides of any triangle given length of all the sides. | ||

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+ | <math>\measuredangle = \cos^-1 [{a^2+b^2-c^2}(2ab)^-1] </math> |

## Latest revision as of 07:30, 12 May 2021

**Jyotiraditya Jadhav** is an **India-born Mathematician and a mathematical researcher**, who was titled "Mathematician" by **Proof Wiki** after publication of his impact-full formula, **Jadhav Theorem**.

## Researches

If any three consecutive numbers are taken say a,b and c with a constant common difference, then the difference between the square of the 2nd term (b) and the product of the first and the third term (ac) will always be the square of the common difference (d).

Representation of statement in variable :

In any isosceles triangle let the length of equal sides be "s" and the angle formed between both the sides be . then the area of the complete triangle can be found by Jadhav Isosceles Formula as below:

In an incomplete division process if the dividend is **lesser then** Divisor into product of 10 raise to a **power "k"**, and **bigger then** divisor into product of 10 with **power "k-1"** then there will be k number of terms before decimal point in an divisional process.

Jadhav Triads are **groups of any 3 consecutive numbers** which follow a pattern , was **discovered by Jyotiraditya Jadhav** and was named after him.

Jadhav Angular Formula evaluates the angle between any two sides of any triangle given length of all the sides.