The Man: Who Knew Infinity Index
The most frequently cited individuals are:
Notably, Indian mathematicians contemporary with Ramanujan (e.g., S. Chandrasekhar, though slightly later) appear less frequently than English socialites who merely hosted dinners. This suggests that the index—and by extension the biography—frames Ramanujan’s genius through Western validation.
For the mathematically inclined, the index is a gateway to specific concepts: the man who knew infinity index
If you are searching for "The Man Who Knew Infinity index" online, you likely want to know the major signposts. Below is a categorized index of the most critical subjects within Kanigel’s work.
| Period | Key Events | Approximate Chapters | |--------|------------|----------------------| | 1887–1903 | Childhood in Kumbakonam; early fascination with numbers | 1–2 | | 1904–1912 | College failures; independent research; notebook period | 3–5 | | 1913 | First letters to G.H. Hardy at Cambridge | 6–7 | | 1914–1916 | Voyage to England; collaboration with Hardy | 8–12 | | 1917–1918 | Wartime hardships; illness; FRS election | 13–16 | | 1919 | Return to India; final year | 17–18 | | 1920 | Death in Kumbakonam | 19–20 | The most frequently cited individuals are:
In Robert Kanigel’s biography, significant attention is given to Ramanujan's work on pi ($\pi$). The paper Modular Equations and Approximations to $\pi$ is famous because it provided the foundation for the fastest algorithms used by modern computers to calculate the digits of pi.
One of the most famous formulas from this work (often cited in the book and popular math) is: $$ \frac1\pi = \frac2\sqrt29801 \sum_k=0^\infty \frac(4k)!(1103+26390k)(k!)^4 396^4k $$ Style: A polished period drama focusing on the
This series converges extremely rapidly and was a major breakthrough in number theory.