About 34,400 results
|Euler's 6n'1 Theorem Every PRIME OF THE FORM 6n'1 can be written in the form |
x2'3y2:/ Euler's Addition Theorem Let ... dx ffiffiffiffiffiffiffiffiffi g(x) p 0gc0 dx
ffiffiffiffiffiffiffiffiffi g(x) p ; where c Euler's Distribution Theorem 961 b
ffiffiffiffiffiffiffiffiffi g(a) ...
|in any sense of these two propositions, since we have used in our proof of the |
prime number theorem a subsidiary theorem on the order ... Euler's purely formal
argument, which amounts effectively to saying that the right-hand side is [I (1-p-i)
|Euler's theorem entered economics in order to solve the problem whether, if each |
productive factor is paid at the rate of its ... William J. Baumol As soon as the
marginal productivity theory of distribution was propounded, a perplexing
|More radically, it was criticised – notably by Wicksell – as merely providing a |
description of current exchange relationships, not a theory of distribution. The
adding-up (or exhaustion-of-product) problem and the use of Euler's theorem The
|Putting aside questions of rigor, we see that Euler's powerful intuition had |
bridged the chasm between the harmonic series ... In the same 1737 paper,
Euler's attention was directed to a far more subtle theorem about the distribution
of primes, ...
|k k k EULER DISTRIBUTION 105 right, while when heads occurs the batch of the |
k particles is absorbed and the cells with the ... The q-factorial and the usual
factorial moments of the Euler distribution are derived in the following theorem.
|Apparently A.W. Flux, in a review of Wicksteed's 1894 Essay on the Laws of |
Distribution, was the first to point out the applicability of Euler's mathematical
theorem on homogeneous functions to the problem of product exhaustion. If a
function is ...
|... see: Distribution of prime numbers, Erdös problem; Graph, extremal; Metric |
theory of numbers; van der Waerden theorem ... Euler summation method; Euler
theorem, Euler transformation; Fermat great theorem; Fermat little theorem;
|Theorem 4.9 Let X be a π0-projectable vector field on R × M. (1) X is a point |
symmetry of λ if and only if it is a point symmetry of the Cartan form θλ. (2) X is a ...
If X is vertical then it is also a point symmetry of the Euler-Lagrange distribution ∆ε