Ramanujan - the great Indian mathematician

                                                        Ramanujan

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Ramanujan Was a very great Indian mathematician. He was born on 22 December 1887. He lived during the British rule in India. 

THE TRICKS PLAYED BY BRITISHERS ON INDIA

As per my study of history, I think that in India there was and now also a very vast sea of talents as well as intelligence. But the problem which Indians never realized was that they should have given some respect, some space to the people with extraordinary talents, abilities to express their infinite sky of knowledge. Days by days went on and the British started to take control over India. They realized that India is heaven and they decided to steal everything from heaven and make it a hell. British people stole the books of India which were worth trillions, most of the Indian gold, even the well known beautiful and precious Kohinoor Diamond. Most of the Indian historical things were stolen by Britishers. The British museums are now making lakhs of rupees with just a sword of India's great king "Shivaji Maharaj".

THE GREAT INTELLIGENCE OF RAMANUJAN

The same thing also happened with Ramanujan. Ramanujan is the God of Mathematics. It is a fact that Ramanujan could calculate difficult sums with just his eyes closed.  

LAST HOURS

Ramanujan lived his last moments of life on 26 April 1920 at Kumbakonam with amoebiasis. Amoebiasis, also known as amoebic dysentery, is an infection caused by any of the amoebae of the Entamoeba group.

Nowadays also many Indians are going to the USA and other such developed countries as such countries give 1st place to the talent but in India, the only thing which stops is the cast system.

If you want to know more information about Ramanujan short movie has also released on youtube. Just search Ramanujan short movie.

AN EQUATION OF RAMANUJAN

The story goes that Hardy was visiting Ramanujan in the hospital, and remarked offhandedly that the taxi he had taken had a "dull number," 1729. Instantly Ramanujan replied, "No, it is a very interesting number! It is the smallest positive integer expressible as the sum of two positive cubes in two different ways."

That is, $1729 = 1^3+12^3 = 9^3+10^3$.

Hardy and Wright proved in 1938 that for every $man$, there is a positive integer $\text{Ta}(n)$ that is expressible as the sum of two positive cubes in different ways. So $\text{Ta}(2) = 1729$. $($The value of $\text{Ta}(2)$ had been known since the $17^\text{th}$ century, which is in some sense characteristic of Ramanujan as well: as he was largely self-taught, he was often rediscovering theorems that were already well-known at the same time as he was constructing entirely new ones.$)$ The numbers $\text{Ta}(n)$ are called taxicab numbers in honor of Hardy and Ramanujan.

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