G. H. Hardy Biography

G. H. Hardy, Mathematician
Born asGodfrey Harold Hardy
Occup.Mathematician
FromUnited Kingdom
BornFebruary 7, 1877
Cranleigh, Surrey, England
DiedDecember 1, 1947
Cambridge, Cambridgeshire, England
CauseNatural Causes
Aged70 years
G. H. Hardy, or Godfrey Harold Hardy, was an extremely prominent British mathematician born on February 7, 1877, in Cranleigh, Surrey, England. Throughout his life, Hardy made significant contributions to the field of mathematics, which have actually remained to be relevant well after his fatality on December 1, 1947.

Hardy was the youngest of 4 siblings in his family, and he showed his outstanding mathematical talents from a very early age. After finishing his early education and learning at a local prep school, he took place to Winchester University, a prestigious boarding college in England. In 1896, Hardy secured his location at Trinity College, Cambridge, where he examined mathematics as well as gotten a bachelor's level in 1900. After college graduation, he stayed at Trinity College for his post-graduate research studies as well as won a research study fellowship in 1902.

Throughout his time at Cambridge, Hardy dedicated himself to pure mathematics, focusing on number concept, evaluation, and the concept of infinite series. He collaborated with John Edensor Littlewood, a fellow British mathematician, as well as together, they formed the Hardy-Littlewood collaboration, which was highly efficient in the world of mathematical research study. The duo authored more than 100 influential papers on topics like circulation of prime numbers, Waring's problem, and Riemann zeta feature, to name a few.

In 1910, Hardy ended up being a fellow of the Royal Society, a prestigious organization identifying impressive achievements in the field of science. In 1913, after checking out a letter from an unidentified Indian mathematician, Srinivasa Ramanujan, Hardy acknowledged the capacity of this young man as well as invited him to Cambridge, where they began their renowned partnership. Their work revolutionized many elements of mathematical theory, including number concept, dividing concept, as well as the evaluation of certain essential.

Throughout World war, Hardy came to be progressively important of the battle and also the army applicability of his work. Therefore, in 1920, he determined to leave Cambridge and accepted a setting at the College of Oxford as the Savilian Chair of Geometry, an article he held till 1931. During his time at Oxford, Hardy remained to release groundbreaking work in maths, including his popular publication "A Program of Pure Math", which ended up being an essential textbook for undergraduate trainees.

In 1931, after the fatality of his friend and also Oxford's Teacher of Math, E. T. Whittaker, Hardy went back to Cambridge as the Sadleirian Teacher of Pure Math, a position he held up until his retired life in 1942.

One of Hardy's many popular works is his 1940 essay, "A Mathematician's Apology", in which he passionately defended the beauty and value of pure mathematics. He thought that pure mathematics might elevate the human spirit as well as provide meaning to life.

Throughout his job, G. H. Hardy waited his belief in the inherent value of pure mathematical pursuits, picking to remain uninvolved in applied maths or physics, famously mentioning that nothing he did would ever before be used practically. However, in paradox, his job would later on contribute to the understanding as well as growth of vital areas, including cryptography, computer science, and procedures research study.

G. H. Hardy died on December 1, 1947, at age 70 in Cambridge, England, leaving a long-term legacy worldwide of mathematics. His deal with John Edensor Littlewood as well as Srinivasa Ramanujan, in addition to his pioneering ideas in locations like number theory as well as analysis, have had a profound and also enduring impact on generations of mathematicians to find.

Our collection contains 11 quotes who is written / told by H. Hardy.
G. H. Hardy Famous Works:
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11 Famous quotes by G. H. Hardy

Small: It is not worth an intelligent mans time to be in the majority. By definition, there are already enough
"It is not worth an intelligent man's time to be in the majority. By definition, there are already enough people to do that"
Small: Beauty is the first test: there is no permanent place in the world for ugly mathematics
"Beauty is the first test: there is no permanent place in the world for ugly mathematics"
Small: Archimedes will be remembered when Aeschylus is forgotten, because languages die and mathematical ideas
"Archimedes will be remembered when Aeschylus is forgotten, because languages die and mathematical ideas do not"
Small: I am interested in mathematics only as a creative art
"I am interested in mathematics only as a creative art"
Small: A mathematician, like a painter or a poet, is a maker of patterns. If his patterns are more permanent t
"A mathematician, like a painter or a poet, is a maker of patterns. If his patterns are more permanent than theirs, it is because they are made with ideas"
Small: Young men should prove theorems, old men should write books
"Young men should prove theorems, old men should write books"
Small: There is no scorn more profound, or on the whole more justifiable, than that of the men who make for th
"There is no scorn more profound, or on the whole more justifiable, than that of the men who make for the men who explain. Exposition, criticism, appreciation, is work for second-rate minds"
Small: I was at my best at a little past forty, when I was a professor at Oxford
"I was at my best at a little past forty, when I was a professor at Oxford"
Small: A mathematician, like a painter or poet, is a maker of patterns. If his patterns are more permanent tha
"A mathematician, like a painter or poet, is a maker of patterns. If his patterns are more permanent than theirs, it is because they are made with ideas"
Small: I wrote a great deal... but very little of any importance there are not more than four of five papers w
"I wrote a great deal... but very little of any importance; there are not more than four of five papers which I can still remember with some satisfaction"
Small: Pure mathematics is on the whole distinctly more useful than applied. For what is useful above all is t
"Pure mathematics is on the whole distinctly more useful than applied. For what is useful above all is technique, and mathematical technique is taught mainly through pure mathematics"