1 edition of Bernoulli numbers found in the catalog.
|Statement||edited by Karl Dilcher, Ladislav Skula, Ilja Sh. Slavutskiĭ.|
|Series||Queen"s papers in pure and applied mathematics ;, no. 87|
|Contributions||Dilcher, Karl, 1954-, Skula, Ladislav., Slavutskiĭ, Ilja Sh.|
|LC Classifications||QA3 .Q38 no. 87, Z6654.B47 .Q38 no. 87, QA246 .Q38 no. 87|
|The Physical Object|
|Pagination||iv, 175 p. ;|
|Number of Pages||175|
|LC Control Number||93104899|
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Bernoulli number is the product of all primes p such that p-1 divides Size: 5MB. The First Bernoulli Numbers book. Read reviews from world’s largest community for readers.
This book was converted from its physical edition to the d /5(5). Bernoulli numbers are used in some series expansions of several functions (trigonometric, hyperbolic, gamma, etc.), and are extremely important in number theory and analysis.
Bernoulli numbers are the values of the Bernoulli polynomials at $x=0$: $B_n=B_n(0)$; they also often serve as the coefficients of the expansions of certain elementary functions into power series. Bernoulli Numbers are also useful in finding the values of ζ (n) \zeta(n) ζ (n) for even n n n 's.
You may try this for its application. The values of the first few Bernoulli numbers are as follows. Source material on the Bernoulli numbers and the related Bernoulli polynomials is ubiquitous, and can be sampled, for example, in . References [6, 7] provide a valuable overview all at.
The Bernoulli polynomials satisfy the generating function relation. The Bernoulli numbers are given by. BernoulliB can be evaluated to arbitrary numerical precision. BernoulliB automatically threads over lists.