General Mathematics

1703 Submissions

[12] viXra:1703.0279 [pdf] submitted on 2017-03-29 12:53:24

Question 2345 : Integral , Fractals , Pi

Authors: Edgar Valdebenito
Comments: 13 Pages.

An Integral for pi
Category: General Mathematics

[11] viXra:1703.0255 [pdf] submitted on 2017-03-27 10:44:14

The Answer to Riemann is Giant.

Authors: Nicholas R. Wright
Comments: 7 Pages.

We prove the Riemann Hypothesis, by means of the Extended Riemann Hypothesis, the Generalized Riemann Hypothesis, and the Grand Riemann Hypothesis. Quasicrystals are the answer to the Riemann Hypothesis. A solution could be found using Russell’s Paradox. Measurement is possible through nominative determinism. Deuring–Heilbronn repulsion phenomenon was useful in regression analysis. An index method of forecasting was overlooked for centuries. In summary, the Grand Riemann Hypothesis should be seen as the standard. Grand Riemann Hypothesis improves on the basics of more simplified Riemann Hypotheses.
Category: General Mathematics

[10] viXra:1703.0195 [pdf] submitted on 2017-03-20 13:17:51

The Polynomial P(x)=x^8+x^7-7x^6-6x^5+15x^4+10x^3-10x^2-4x+1

Authors: Edgar Valdebenito
Comments: 13 Pages.

In this note give some formulas related with the polynomial:p(g)=g^8+g^7-7g^6-6g^5+15g^4+10g^3-10g^2-4g+1
Category: General Mathematics

[9] viXra:1703.0160 [pdf] replaced on 2017-04-04 06:42:10

Logarithmic Extension of Real Numbers and Hyperbolic Representation of Generalized Lorentz Transforms

Authors: Grushka Ya.I.
Comments: 6 Pages. Mathematics Subject Classification: 12D99; 83A05. International Journal of Algebra, 11, (2017), no. 4, 159-170. DOI: https://doi.org/10.12988/ija.2017.7315

We construct the logarithmic extension for real numbers in which the numbers, less then $-\infty$ exist. Using this logarithmic extension we give the single formula for hyperbolic representation of generalized tachyon Lorentz transforms.
Category: General Mathematics

[8] viXra:1703.0156 [pdf] submitted on 2017-03-15 23:21:37

On Mandelbrot Shading

Authors: Clive Jones
Comments: 7 Pages.

Colourizing the Complex-Plane
Category: General Mathematics

[7] viXra:1703.0127 [pdf] submitted on 2017-03-13 12:58:37

Integrals

Authors: Edgar Valdebenito
Comments: 4 Pages.

this note presents a collection of integrals involving pi.
Category: General Mathematics

[6] viXra:1703.0126 [pdf] submitted on 2017-03-13 13:32:26

The Numbers: K1,k2,pi

Authors: Edgar Valdebenito
Comments: 10 Pages.

This note presents the numbers k1 and k2.
Category: General Mathematics

[5] viXra:1703.0088 [pdf] submitted on 2017-03-09 12:25:43

On Fermat's Last Theorem

Authors: R. Wayte
Comments: 13 Pages.

A solution of Fermat’s Last Theorem is given, using elementary function arithmetic and inference from worked examples.
Category: General Mathematics

[4] viXra:1703.0073 [pdf] replaced on 2017-03-30 02:27:52

On The Riemann Zeta Function

Authors: Jonathan Tooker
Comments: 13 Pages. 13 figures, fixed some stuff

We discuss the Riemann zeta function, the topology of its domain, and make an argument against the Riemann hypothesis. While making the argument in the classical formalism, we discuss the material as it relates to the theory of infinite complexity (TOIC). We extend Riemann's own (planar) analytic continuation $\mathbb{R}\to\mathbb{C}$ into (bulk) hypercomplexity with $\mathbb{C}\to\,^\star\mathbb{C}$. We propose a solution to the Banach--Tarski paradox.
Category: General Mathematics

[3] viXra:1703.0053 [pdf] submitted on 2017-03-07 02:13:29

A Type D Breakdown of the Navier Stokes Equation in D=3 Spatial Dimensions

Authors: Han Geurdes
Comments: 9 Pages.

In this paper a type D breakdown of the Navier Stokes equation in d=3 dimensions is demonstrated.
Category: General Mathematics

[2] viXra:1703.0052 [pdf] submitted on 2017-03-06 12:20:58

Fractal,Polynomial,pi

Authors: Edgar Valdebenito
Comments: 23 Pages.

This note presents formulas and fractals related with the polynomial:p(x)=x^8+4x^7-10x^6-16x^5+19x^4+16x^3-10x^2-4x+1.
Category: General Mathematics

[1] viXra:1703.0017 [pdf] submitted on 2017-03-02 12:03:30

Ramanujan's Issues N°1: the Radical R = (5^(1/4)-1)/(5^(1/4)+1)

Authors: Edgar Valdebenito
Comments: 17 Pages.

In this note we presents some formulas related with the radical:r=(5^(1/4)-1)/(5^(1/4)+1).
Category: General Mathematics