Simple proofs for $\sum_{k=1}^\infty {1\over k^2} = {\pi^2\over 6}$ and $\sin x = x \prod_{k=1}^\infty (1-{x^2\over k^2\pi^2})$
Publication year
1996Author(s)
Source
Mathematics Magazine, 69, 2, (1996), pp. 122-125ISSN
Publication type
Article / Letter to editor
Display more detailsDisplay less details
Organization
Mathematical Physics
Journal title
Mathematics Magazine
Volume
vol. 69
Issue
iss. 2
Page start
p. 122
Page end
p. 125
Subject
Mathematical PhysicsThis item appears in the following Collection(s)
- Academic publications [243859]
- Faculty of Science [36904]
Upload full text
Use your RU credentials (u/z-number and password) to log in with SURFconext to upload a file for processing by the repository team.