Who Was Riemann?
The website visitors who are mathematicians can attest to the fact that you have mentioned the Riemann Hypothesis at least once in your career. It is actually a conjecture or a proposition in which no evidence exists to prove or disprove it. To put it simply, the Riemann Hypothesis states that the Riemann zeta function only has its zeros at the negative even integers and complex numbers with real part 1/2.
This statement was coined by a renowned German mathematician by the name of Georg Friedrich Bernhard Riemann. Who was he? How did he come up with the Riemann Hypothesis?
Georg Friedrich Bernhard Riemann
Here on our website, we try to dive deep into the lives of the authors of these conjectures to have a better understanding of the problem and how they came up with the hypothesis. One of the seven unsolvable problems in mathematics is the Riemann Hypothesis. It was a brilliant mathematician in the 1820s who captured the interest of this occurrence in mathematics.
Aside from the Riemann hypothesis, Bernhard was also known for his formulation of the Riemann integral. It defined the formation of an integral of a function on an interval. Another one of his popular achievements is his contributions on the Fourier series. This is a combination of harmonically related sinusoids.
He was born in 1826 at the time when the Napoleonic wars were happening. He was a very timid boy who found himself having a lot of nervous breakdowns. But even if he is not the usual kid in town, he displayed amazing mathematical skills and other computational talents.
He went to the University of Göttingen with the plan of finishing a degree in Theology. But upon meeting with Carl Friedrich Gauss, a famous mathematician and physicist, the latter recommended that Riemann give up on his theology degree and take up a mathematics course. His father approved and he went to the University of Berlin.
He gave a good deal of his time in geometry and complex analysis. He also engaged well in the real analysis where he developed the Riemann integral. He also made a lot of important contributions to analytical number theory.
Browse more of our pages to see tech blogs about his hypothesis and other works.