Statements (48)
| Predicate | Object |
|---|---|
| gptkbp:instanceOf |
mathematical series
|
| gptkbp:associated_with |
the_Indian_mathematician_Ramanujan
|
| gptkbp:basedOn |
modular forms
|
| gptkbp:contributedTo |
mathematics
|
| gptkbp:evaluates |
the value of pi
|
| gptkbp:expansion |
other mathematical constants
|
| gptkbp:has_a_focus_on |
mathematical education
mathematicians worldwide |
| gptkbp:hasPrograms |
computational mathematics
|
| https://www.w3.org/2000/01/rdf-schema#label |
Ramanujan's series for pi
|
| gptkbp:includes |
rapidly converging series
|
| gptkbp:influenced |
further research in number theory
modern mathematical analysis |
| gptkbp:is_a |
asymptotic analysis
creative mathematical insight |
| gptkbp:is_a_celebration_of |
its historical importance
|
| gptkbp:is_a_resource_for |
computational efficiency
|
| gptkbp:is_a_source_of |
inspiration for mathematicians
|
| gptkbp:is_a_subject_of |
mathematical conferences
mathematical research transcendental number theory the study of pi |
| gptkbp:is_a_time_for |
calculating pi
|
| gptkbp:is_evaluated_by |
infinite series
subsequent mathematicians |
| gptkbp:is_featured_in |
documentaries about mathematics
|
| gptkbp:is_known_for |
its extraordinary convergence properties
|
| gptkbp:is_part_of |
gptkb:Ramanujan's_collected_papers
the history of mathematics Ramanujan's_legacy |
| gptkbp:is_recognized_for |
its elegance and simplicity
mathematical circles |
| gptkbp:is_used_in |
educational materials
scientific computing academic papers mathematical literature numerical analysis mathematical textbooks Machin-like formulas computer algorithms for pi calculation millions of digits of pi |
| gptkbp:isConnectedTo |
the Riemann zeta function
|
| gptkbp:isUsedFor |
the theory of modular forms
Ramanujan's_work_on_continued_fractions |
| gptkbp:produces |
gptkb:Srinivasa_Ramanujan
|
| gptkbp:publishedBy |
1910
|
| gptkbp:related_to |
the theory of partitions
the theory of elliptic functions |