Muthukrishnan ramanujan biography
Samarth September 13, at pm. IAS - Your dream can come true! Download Now. Watch Now. Kickstart your UPSC exam preparation now! Magadha Empire. Irs Officer. In the last year of his life, Ramanujan devoted much of his failing energy to a new kind of function called mock theta functions. Although after many years we can prove the claims that Ramanujan made, we are far from understanding how Ramanujan thought about them, and much work needs to be done.
They also have many applications. For example, they have applications to the theory of black holes in physics. But years of hard muthukrishnan ramanujan biography, a growing sense of isolation and exposure to the cold, wet English climate soon took their toll on Ramanujan and in he contracted tuberculosis. After a brief period of recovery, his health worsened and in he returned to India.
Ramanujan died of his illness on April 26,at the age of Even on his deathbed, he had been consumed by math, writing down a group of theorems that he said had come to him in a dream. His collected papers were published by Cambridge University Press in Of Ramanujan's published papers — 37 in total — Berndt reveals that "a huge portion of his work was left behind in three notebooks and a 'lost' notebook.
These notebooks contain approximately 4, claims, all without proofs. Most of these claims have now been proved, and like his published work, continue to inspire modern-day mathematics. The trauma faced by them, the challenges thrown by the society, the financial risks faced by them, everything act as bottle-necks for their happiness and growth.
But battling against all these odds, Mr. The outbreak of World War I made obtaining special items of food harder and it was not long before Ramanujan had health problems. Right from the start Ramanujan's collaboration with Hardy led to important results. Hardy was, however, unsure how to approach the problem of Ramanujan's lack of formal education.
He wrote [ 1 ] :- What was to be done in the way of teaching him modern mathematics? The limitations of his knowledge were as startling as its profundity. Littlewood was asked to help teach Ramanujan rigorous mathematical methods. However he said [ 31 ] The war soon took Littlewood away on war duty but Hardy remained in Cambridge to work with Ramanujan.
Even in his first winter in England, Ramanujan was ill and he wrote in March that he had been ill due to the winter weather and had not been able to publish anything for five months. What he did publish was the work he did in England, the decision having been made that the results he had obtained while in India, many of which he had communicated to Hardy in his letters, would not be published until the war had ended.
He had been allowed to enrol in June despite not having the proper qualifications. Ramanujan's dissertation was on Highly composite numbers and consisted of seven of his papers published in England. Ramanujan fell seriously ill in and his doctors feared that he would die.
Muthukrishnan ramanujan biography: Studied at Anna University
He did improve a little by September but spent most of his time in various nursing homes. In February Hardy wrote see [ 3 ] :- Batty Shaw found out, what other doctors did not know, that he had undergone an operation about four years ago. His worst theory was that this had really been for the removal of a malignant growth, wrongly diagnosed.
In view of the fact that Ramanujan is no worse than six months ago, he has now abandoned this theory - the other doctors never gave it any support. Tubercle has been the provisionally accepted theory, apart from this, since the original idea of gastric ulcer was given up. Like all Indians he is fatalistic, and it is terribly hard to get him to take care of himself.
Muthukrishnan ramanujan biography: Experience: HSBC · Education:
On 18 February Ramanujan was elected a fellow of the Cambridge Philosophical Society and then three days later, the greatest honour that he would receive, his name appeared on the list for election as a fellow of the Royal Society of London. His election as a fellow of the Royal Society was confirmed on 2 Maythen on 10 October he was elected a Fellow of Trinity College Cambridge, the fellowship to run for six years.
The honours which were bestowed on Ramanujan seemed to help his health improve a little and he renewed his effors at producing mathematics. By the end of November Ramanujan's health had greatly improved. Hardy wrote in a letter [ 3 ] :- I think we may now hope that he has turned to corner, and is on the road to a real recovery. His temperature has ceased to be irregular, and he has gained nearly a stone in weight.
There has never been any sign of any diminuation in his extraordinary mathematical talents. He has produced less, naturally, during his illness but the quality has been the same. He will return to India with a scientific standing and reputation such as no Indian has enjoyed before, and I am confident that India will regard him as the treasure he is.
His natural simplicity and modesty has never been affected in the least by success - indeed all that is wanted is to get him to realise that he really is a success. Ramanujan sailed to India on 27 February arriving on 13 March. However his health was very poor and, despite medical treatment, he died there the following year. The letters Ramanujan wrote to Hardy in had contained many fascinating results.
Ramanujan worked out the Riemann series, the elliptic integrals, hypergeometric series and functional equations of the zeta function. On the other hand he had only a vague idea of what constitutes a mathematical proof. Despite many brilliant results, some of his theorems on prime numbers were completely wrong.
Muthukrishnan ramanujan biography: 5Results for "Muthukrishnan Ramanujam". MuthuKrishnan Ramanujam.
Ramanujan independently discovered results of GaussKummer and others on hypergeometric series. Ramanujan's own work on partial sums and products of hypergeometric series have led to major development in the topic. Perhaps his most famous work was on the number p n of partitions of an integer n n n into summands.