Satyajit Mohanty

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Satyajit Mohanty
Satyajit Mohanty, at Rourkela, 2009
Native name	Luke
Born	Satyajit Mohanty 25 November one thousand nine hundred ninety-six (Age 14)Berhampur , Odisha , India
Education	Class nine, Ispat English Medium School
Known for	Mathematical Research
Notable works	Satyajit's conjecture
Home town	Rourkela , Odisha , India
Parents	Upendra Kumar Mohanty Mohanty Sasmita
Website
http://www.facebook.com/lordsatyajit

Satyajit Mohanty , born twenty-five November 1996, is an Indian Mathematician who Holds the citizenship of India. His Father's name is Mr.. Upendra Kumar Mohanty and his Mother's name is Mrs.. Sasmita Mohanty . He is Famous for his theorems and Conjectures and his Research in Mathematics , Particularly in Number Theory .

Early life

Satyajit Mohanty [1] was born at the City Hospital in Berhampur , Odisha , India to Upendra Kumar Mohanty and Sasmita Mohanty and Their Eldest child was. He lived in Berhampur for one year but then returned to Rourkela in one thousand nine hundred ninety-seven and Considered it as his hometown . Satyajit was sent to School at the Age of 4, Namely the Aunty Nirmala's Nursery School , where he started his first Mathematics. After studying three years in Aunty Nirmala's Nursery School , he was sent to Ispat English Medium School in April 8th, two thousand and three. WHEN it was he met Sagar Ranjan Biswal .
In his early Life, he was very poor in Mathematics, so poor That Were his parents totally worried for him. In 2,005, WHEN he was reading in Class-3, he got the lowest ever Mark he had ever got in Mathematics in the half yearly examination - sixty-nine out of 100 .. Came When his parents to know about it, They Scolded him a lot From That day, Satyajit Promised That Does not show his parents if he 100 in Mathematics , Demand Will not he anything from Them, not even a Single chocolate . Accordingly He Worked. Ultimately He Studied and Studied and got ninety-six in Mathematics in Class-4 bimonthly. Everybody Were surprised. Became His parents very happy. After one year, when he came to Class-5, he got 100 in mathematics, which completed his mission, and yes - his promise came true.

Mathematics career

Early career

Mathematics was not his getting a one hundred in AIM, AIM was something his Different, Different from what OTHERS totally did. In two thousand and seven, Mrs.. R. Panda , his one and Mathematics Teachers Gave him his class a task, to find out all the squares from one to 50. Satyajit, Along with everybody started to Multiply Each number twice to form the squares , he did it till the Square of thirteen, but he Along with his Friend Sagar Ranjan Biswal , found a strange thing. (Such strange Their finding property at That Age, WHEN They NEW no Algebra , is incredible). They found That the Successive squares' Differences Are Consecutive odd numbers . Then They Added, INSTEAD of Multiplying and finished Calculating 1 to fifty's squares in no time. All the students, Along with the teacher Could not believe it, many commented Their answers May be Wrong, but the teacher Gave Them full marks.
He Used to Solve Difficult problems from his early Age. Learnt He trigonometry and Logarithms from Class-6, and was ABLE to solve Class-10 problems. But he did not tell this to anybody, not even his parents also. There are many other stoies which can be referred from his website.

Late career

In 2,009, an examination called Satyajit Appeared IMO (International Mathematics Olympiad) Conducted by Science Olympiad Foundation for the first time. He was the only person from his class to be selected for the 2nd level, he RANKED 51 out of forty-nine thousand six hundred and fifty participants. In 2nd level, his rank went down to ninety, but still, he was awarded with a medal School topper. In 2.01 thousand, he again Appeared for IMO, but his time Classmate That Sriyanka Mohapatra Became the School topper by holding the rank 122 . Satyajit was 2nd , RANKED two hundred and fifty-one , and his Classmate Another Sourabha Sethi Also was selected for 2nd level, RANKED three hundred fifty .
In 2,010, got three Satyajit Consecutive 100 s in Mathematics in three Consecutive Examinations held in a Single session. He Became the first man in the whole class Hundreds Consecutive to score three in a Single session in Mathematics .
5th In December two thousand and ten, Satyajit Along with his Classmates Other Appeared an examination called Junior Mathematics Olympiad JOINTLY Conducted byOrissa Mathematical Society and Institute of Mathematics and Applications, Bhubaneswar . He was selected to attend the Summer Mathematics Training Camp along with this classmates.

. Group members in IMA, Bhubaneswar Serially, from left to right - Sriyanka Mohapatra, Satyajit Mohanty, Soumya Ranjan Swain, Malay Kumar Mahanta, Satyajit Sarangi, Sourabha Sethi.

Satyajit Mohanty - IX 'C', - Rank nineteen
Sriyanka Mohapatra - IX 'C', - Rank twelve
Satyajit sarangi - IX 'B' - Rank five
Sourabha Sethi - IX 'B' - Rank 29
Malay Kumar Mohanta - VIII 'B' - Rank 6
Soumya Ranjan Swain - VIII 'B' - Rank 28
Ananya Nayak - VIII 'B' - Rank 28

In the Camp, They stayed for fifteen Days, They Were Taught where the higher Mathematics . Satyajit Knew Almost Everything. But Unfortunately, he Could not Perform in the 2nd test. Rankings Were made and Satyajit stood 19 th Whereas Satyajit sarangi , Malay Kumar Mohanta, Mohapatra Sriyanka stood five th, 6 th andtwelve th Respectively.
In the Camp, his first proposed Satyajit Conjecture to Swadhin Pattanayak, Which was highly appreciated. He was his true Encouraged and Motivated for Mathematical Talent.

Satyajit's first Conjecture

In number Theory , Satyajit's first Conjecture, Conjecture in Mathematics is an Important Which the Following States:
Take any natural number n . Take Another natural number k , and then write down all the Consecutive numbers from k to ( k + n +3 ). Find all k ^ n, (k +1) ^ n, ..., (k + n +3) ^ n. Find the successive differences between (k +1) ^ n and k ^ n, tell it α1, difference between (k +2) ^ n and (k +1) ^ n as α2 and so on till the end difference between (k + n +3) ^ n and (k + n +2) ^ n as αk. This is the first differentiation. The second differentiation will be finding the same successive individual differences between α0, α1, α2 till αk, the latter will be given equal to β0, β1, ..., βm and after the nth differentiation, one will get a constant, that is n!.

Satyajit's two digit number's square finding method

In Mathematics , Satyajit's two digit Square finding method, is an Important part Which makes Mathematics . Easier squares and finding the
Truth Always Remember this table:

One	Two	Three	Four	Five	Six	Seven	Eight	Nine
-8	-6	-4	-2	0	+2	+4	+6	+8

Now, to find the square of a two digit number, let the number be 78.

Now write the first digit Square of the 2nd as: seven eight = ____ sixty-four
Then, with Multiply the first digit with its successor as: 7 8 = fifty-six 64 (fifty-six = 7 × 8)
Say it M : Here M = five thousand six hundred sixty-four
But 78 square is not 5664
Now, as per table Truth, See the value of the first digit : The value of seven here is +4.
Find the place value of the first digit : In this case, it is Obviously 70.
Multiply the value with the value Given place in the Truth table for the first digit , say it N : In this case, N = 70 × (+6) = four hundred and twenty
Now Add N and M : In this case it is 5 664 + four hundred and twenty = 6 084
Now the result obtained is the Square of the Original number : 6 084