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Karl Weierstrass 1
Karl Weierstrass 1 -
Karl Weierstrass 2
Karl Weierstrass 2Karl Weierstrass 2
This is a robot car which follows some rules. -
Karl Weierstrass 3
Karl Weierstrass 3Karl Weierstrass 3
This is a robot car which follows some rules. -
All About - Karl Weierstrass
All About - Karl WeierstrassAll About - Karl Weierstrass
What is Karl Weierstrass? A report all about Karl Weierstrass for homework/assignment. Karl Theodor Wilhelm Weierstrass (; 31 October 1815 – 19 February 1897) was a German mathematician often cited as the "father of modern analysis". Despite leaving university without a degree, he studied mathematics and trained as a teacher, eventually teaching mathematics, physics, botany and gymnastics. Intro/Outro music: Discovery Hit/Chucky the Construction Worker - Kevin MacLeod (incompetech.com) Licensed under CC-BY-3.0 Text derived from: http://en.wikipedia.org/wiki/Karl_Weierstrass Text to Speech powered by voice-rss.com Imag -
Karl Weierstrass - Google
Karl Weierstrass - GoogleKarl Weierstrass - Google
Karl Theodor Wilhelm Weierstrass (German: Weierstraß; 31 October 1815 – 19 February 1897) was a German mathematician often cited as the "father of modern analysis". Despite leaving university without a degree, he studied mathematics and trained as a teacher, eventually teaching mathematics, physics, botany and gymnastics. Weierstrass formalized the definition of the continuity of a function, and used it and the concept of uniform convergence to prove the Bolzano–Weierstrass theorem and Heine–Borel theorem. -
Bolzano Weierstrass rap (Down with that)
Bolzano Weierstrass rap (Down with that)Bolzano Weierstrass rap (Down with that)
The great Steve Sawin of Fairfield U. -
Matematici Cattolici Parte 02 - Karl Weierstrass
Matematici Cattolici Parte 02 - Karl WeierstrassMatematici Cattolici Parte 02 - Karl Weierstrass
-
Karl W T Weierstrass, Grace Tolliver Block 1
Karl W T Weierstrass, Grace Tolliver Block 1Karl W T Weierstrass, Grace Tolliver Block 1
This is my presentation on my mathematician for Advanced Algebra. Enjoy!:) -
Karl W.T. Weierstrass
Karl W.T. WeierstrassKarl W.T. Weierstrass
melissa smith and macie petrich. -
Funcion de Weierstrass en Octave
Funcion de Weierstrass en OctaveFuncion de Weierstrass en Octave
Más info en la descripción La gráfica en sí consiste en que tomes 2 puntos reales cualesquiera y en medio encuentres 1 pico, es decir, todos los puntos sean no diferenciables, pero continuos, esta función la encontré en el libro Analysis Real de Robert Bartle, y acá sólo muestro la gráfica primero con pocos y luego varios puntos. Música de Fondo: https://www.youtube.com/watch?v=rKzbIyYLlD4 Algoritmo para octave(matlab también funciona) aqui :c %Funcion de Karl Weierstrass clear a=1/2; b=3; %limite superior de la sumatoria j=10; %Amplitud del vector i=1000000; X=linspace(-3,3,i); Y=linspace(0,0,i); %Sumatoria para obtener Y for n=0:j aux -
Tangerine Dream - Silver Siren (and Julia fractals)
Tangerine Dream - Silver Siren (and Julia fractals)Tangerine Dream - Silver Siren (and Julia fractals)
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least approximately) a reduced-size copy of the whole,... -
Tangerine Dream - Aurora Borealis (and flame fractals)
Tangerine Dream - Aurora Borealis (and flame fractals)Tangerine Dream - Aurora Borealis (and flame fractals)
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least approximately) a reduced-size copy of the whole,... -
Macrocosm and Microcosm - Fractal Journey
Macrocosm and Microcosm - Fractal JourneyMacrocosm and Microcosm - Fractal Journey
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least approximately) a reduced-size copy of the whole,... -
Macrocosm and Microcosm - Fractal Journey
Macrocosm and Microcosm - Fractal JourneyMacrocosm and Microcosm - Fractal Journey
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least approximately) a reduced-size copy of the whole,...
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0:48
Karl Weierstrass 1
This is a robot car which follows some rules....
published: 24 Apr 2008
author: biloidhc
Karl Weierstrass 1
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Karl Weierstrass 1
- published: 24 Apr 2008
- views: 526
- author: biloidhc
This is a robot car which follows some rules.
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0:45
Karl Weierstrass 2
This is a robot car which follows some rules....
published: 24 Apr 2008
author: biloidhc
Karl Weierstrass 2
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Karl Weierstrass 2
- published: 24 Apr 2008
- views: 82
- author: biloidhc
This is a robot car which follows some rules.
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0:31
Karl Weierstrass 3
This is a robot car which follows some rules....
published: 24 Apr 2008
author: biloidhc
Karl Weierstrass 3
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Karl Weierstrass 3
- published: 24 Apr 2008
- views: 81
- author: biloidhc
This is a robot car which follows some rules.
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1:17
All About - Karl Weierstrass
What is Karl Weierstrass?
A report all about Karl Weierstrass for homework/assignment.
...
published: 08 Jan 2015
All About - Karl Weierstrass
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All About - Karl Weierstrass
- published: 08 Jan 2015
- views: 0
What is Karl Weierstrass? A report all about Karl Weierstrass for homework/assignment. Karl Theodor Wilhelm Weierstrass (; 31 October 1815 – 19 February 1897) was a German mathematician often cited as the "father of modern analysis". Despite leaving university without a degree, he studied mathematics and trained as a teacher, eventually teaching mathematics, physics, botany and gymnastics. Intro/Outro music: Discovery Hit/Chucky the Construction Worker - Kevin MacLeod (incompetech.com) Licensed under CC-BY-3.0 Text derived from: http://en.wikipedia.org/wiki/Karl_Weierstrass Text to Speech powered by voice-rss.com Images are Public Domain or CC-BY-3.0: Karl_Weierstrass.jpg from http://en.wikipedia.org/wiki/Karl_Weierstrass Karl_Weierstrass_2.jpg from http://tr.wikipedia.org/wiki/Karl_Weierstrass
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1:10
Karl Weierstrass - Google
Karl Theodor Wilhelm Weierstrass (German: Weierstraß; 31 October 1815 – 19 February 1897) ...
published: 18 Feb 2015
Karl Weierstrass - Google
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Karl Weierstrass - Google
- published: 18 Feb 2015
- views: 1
Karl Theodor Wilhelm Weierstrass (German: Weierstraß; 31 October 1815 – 19 February 1897) was a German mathematician often cited as the "father of modern analysis". Despite leaving university without a degree, he studied mathematics and trained as a teacher, eventually teaching mathematics, physics, botany and gymnastics. Weierstrass formalized the definition of the continuity of a function, and used it and the concept of uniform convergence to prove the Bolzano–Weierstrass theorem and Heine–Borel theorem.
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3:40
Bolzano Weierstrass rap (Down with that)
The great Steve Sawin of Fairfield U....
published: 01 Apr 2009
author: homieweierstrass
Bolzano Weierstrass rap (Down with that)
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Bolzano Weierstrass rap (Down with that)
- published: 01 Apr 2009
- views: 22120
- author: homieweierstrass
The great Steve Sawin of Fairfield U.
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9:38
Matematici Cattolici Parte 02 - Karl Weierstrass
...
published: 27 Nov 2013
Matematici Cattolici Parte 02 - Karl Weierstrass
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Matematici Cattolici Parte 02 - Karl Weierstrass
- published: 27 Nov 2013
- views: 20
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4:59
Karl W T Weierstrass, Grace Tolliver Block 1
This is my presentation on my mathematician for Advanced Algebra. Enjoy!:)...
published: 20 Mar 2014
author: GraceTolly
Karl W T Weierstrass, Grace Tolliver Block 1
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Karl W T Weierstrass, Grace Tolliver Block 1
- published: 20 Mar 2014
- views: 14
- author: GraceTolly
This is my presentation on my mathematician for Advanced Algebra. Enjoy!:)
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3:04
Karl W.T. Weierstrass
melissa smith and macie petrich....
published: 17 Feb 2013
author: Lisa Zito
Karl W.T. Weierstrass
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Karl W.T. Weierstrass
- published: 17 Feb 2013
- views: 19
- author: Lisa Zito
melissa smith and macie petrich.
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4:42
Funcion de Weierstrass en Octave
Más info en la descripción
La gráfica en sí consiste en que tomes 2 puntos reales cualesq...
published: 24 Dec 2014
Funcion de Weierstrass en Octave
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Funcion de Weierstrass en Octave
- published: 24 Dec 2014
- views: 0
Más info en la descripción La gráfica en sí consiste en que tomes 2 puntos reales cualesquiera y en medio encuentres 1 pico, es decir, todos los puntos sean no diferenciables, pero continuos, esta función la encontré en el libro Analysis Real de Robert Bartle, y acá sólo muestro la gráfica primero con pocos y luego varios puntos. Música de Fondo: https://www.youtube.com/watch?v=rKzbIyYLlD4 Algoritmo para octave(matlab también funciona) aqui :c %Funcion de Karl Weierstrass clear a=1/2; b=3; %limite superior de la sumatoria j=10; %Amplitud del vector i=1000000; X=linspace(-3,3,i); Y=linspace(0,0,i); %Sumatoria para obtener Y for n=0:j aux=(a^n).*cos((b^n).*X); Y=aux.+Y; end plot(X,Y)
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4:46
Tangerine Dream - Silver Siren (and Julia fractals)
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of ...
published: 23 Oct 2010
author: AquariusPiotr
Tangerine Dream - Silver Siren (and Julia fractals)
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Tangerine Dream - Silver Siren (and Julia fractals)
- published: 23 Oct 2010
- views: 1349
- author: AquariusPiotr
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least approximately) a reduced-size copy of the whole,...
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8:07
Tangerine Dream - Aurora Borealis (and flame fractals)
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of ...
published: 24 Oct 2010
author: AquariusPiotr
Tangerine Dream - Aurora Borealis (and flame fractals)
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Tangerine Dream - Aurora Borealis (and flame fractals)
- published: 24 Oct 2010
- views: 3593
- author: AquariusPiotr
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least approximately) a reduced-size copy of the whole,...
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2:03
Macrocosm and Microcosm - Fractal Journey
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of ...
published: 24 Oct 2010
author: Trikonano
Macrocosm and Microcosm - Fractal Journey
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Macrocosm and Microcosm - Fractal Journey
- published: 24 Oct 2010
- views: 1084
- author: Trikonano
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least approximately) a reduced-size copy of the whole,...
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0:34
Macrocosm and Microcosm - Fractal Journey
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of ...
published: 24 Oct 2010
author: Virajananda
Macrocosm and Microcosm - Fractal Journey
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Macrocosm and Microcosm - Fractal Journey
- published: 24 Oct 2010
- views: 197
- author: Virajananda
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least approximately) a reduced-size copy of the whole,...
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0:43
trippy fractal Kaleidoscope visual
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of ...
published: 13 Aug 2010
author: Corey Holmes
trippy fractal Kaleidoscope visual
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trippy fractal Kaleidoscope visual
- published: 13 Aug 2010
- views: 2572
- author: Corey Holmes
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least approximately) a reduced-size copy of the whole,...
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0:56
Love and Math Synopsis
Love and Math. Synopsis
In this artistic, insightful and fervent book, Frenkel shows that ...
published: 15 Feb 2015
Love and Math Synopsis
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Love and Math Synopsis
- published: 15 Feb 2015
- views: 13
Love and Math. Synopsis In this artistic, insightful and fervent book, Frenkel shows that mathematics underlies everything and provides links between cultures. The book is much in the spirit of Russia’s culture, tradition, and national character. It’s partly autobiographical but it also entails the history of what is known as the Langland’s program. Frenkel demonstrates all the reasons he feels so passionate about mathematics, and leaves the reader with a sense of acquired understanding of his passion. He tells us that mathematics is not much different from "poetry, art, and music ". As the German mathematician Karl Weierstrass once said, "A mathematician who is not also something of a poet will never be a perfect mathematician". It’s certainly a positive addition in the genre of popular mathematics books.
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9:55
Bonn University.wmv
The University of Bonn (German: Rheinische Friedrich-Wilhelms-Universität Bonn) is a publi...
published: 30 Apr 2010
Bonn University.wmv
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Bonn University.wmv
- published: 30 Apr 2010
- views: 7522
The University of Bonn (German: Rheinische Friedrich-Wilhelms-Universität Bonn) is a public research university located in Bonn, Germany. Founded in 1818 the University of Bonn is today one of the leading universities in Germany. The University of Bonn offers a large number of undergraduate graduate and PhD programs in a range of subjects. Its library holds more than two million volumes. The University of Bonn has 525 professors and 30,800 students. Among its notable alumni and faculty are seven Nobel Laureates, two Fields Medalists, twelve Gottfried Wilhelm Leibniz Prize winners, Pope Benedict XVI, Joseph Goebbels, Karl Marx, Friedrich Nietzsche and Joseph Schumpeter. According to the Academic Ranking of World Universities compiled by researchers of the Shanghai Jiao Tong University the University Bonn is ranked 97th internationally and 6th nationally.[10] The Times Higher Education Supplement ranks the University of Bonn 53rd worldwide in the science category and 84th worldwide in the social science category.[11] Webometrics ranks the University of Bonn 126th worldwide, 32nd in Europe and 9th nationally.[12] In national rankings the University of Bonn is ranked in the top ten by the newsmagazine Focus[13] and the German Research Foundation.[14] The Humboldt Foundation ranks the University of Bonn fifth in the humanities and social sciences, sixth in the life sciences and seventh in science. To date, seven Nobel prizes and two Fields Medals have been awarded to faculty and alumni of the Rheinische Friedrich-Wilhelms-Universität Bonn: * Harald zur Hausen, alumni: physiology or medicine 2008 * Reinhard Selten, faculty member: economics 1994 * Wolfgang Paul, faculty member: physics 1989 * Luigi Pirandello, alumni: literature 1934 * Otto Wallach, faculty member: chemistry 1910 * Paul Johann Ludwig von Heyse, alumni: literature 1910 * Philipp Lenard, faculty member: physics 1905 * Gerd Faltings: Fields Medal 1986 * Maxim Kontsevich: Fields Medal 1998 Among its notable alumni and faculty are Pope Benedict XVI, Heinrich Heine, Heinrich Hertz, Friedrich Hirzebruch, Karl Marx, Friedrich Nietzsche, Friedrich August Kekulé von Stradonitz, Joseph Schumpeter, Konrad Adenauer, Max Ernst, Constantin Carathéodory, Joseph Goebbels, Karl Weierstrass, Karl Barth and Samson Raphael Hirsch.
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48:15
Mod-06 Lec-29 The Necessity of Elliptic Functions for the Classification of Complex Tori
An Introduction to Riemann Surfaces and Algebraic Curves: Complex 1-Tori and Elliptic Curv...
published: 20 Sep 2013
author: nptelhrd
Mod-06 Lec-29 The Necessity of Elliptic Functions for the Classification of Complex Tori
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Mod-06 Lec-29 The Necessity of Elliptic Functions for the Classification of Complex Tori
- published: 20 Sep 2013
- views: 443
- author: nptelhrd
An Introduction to Riemann Surfaces and Algebraic Curves: Complex 1-Tori and Elliptic Curves by Dr. T.E. Venkata Balaji, Department of Mathematics, IIT Madra...
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5:05
Circunferencias tangentes
Problema de aplicación de teoremas sobre circunferencias tangentes....
published: 19 Nov 2014
Circunferencias tangentes
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Circunferencias tangentes
- published: 19 Nov 2014
- views: 3
Problema de aplicación de teoremas sobre circunferencias tangentes.
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7:42
EXPO GRUPO 6.MP4
Exposición sobre KARL WEIERSTRASS, Juan Sebastián Moreno,Sebastián Sanchez y Juan Camilo G...
published: 15 Nov 2011
author: Carlos Avila
EXPO GRUPO 6.MP4
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EXPO GRUPO 6.MP4
- published: 15 Nov 2011
- views: 17
- author: Carlos Avila
Exposición sobre KARL WEIERSTRASS, Juan Sebastián Moreno,Sebastián Sanchez y Juan Camilo García.
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3:42
Inecuaciones
Aquí muestro un método básico para resolver inecuaciones sencillas...
published: 10 Oct 2014
Inecuaciones
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Inecuaciones
- published: 10 Oct 2014
- views: 3
Aquí muestro un método básico para resolver inecuaciones sencillas
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10:10
Fractal a auto similaridade no infinito e a Teoria do Caos #MysteryHunter
Fractais (do latim fractus, fração, quebrado) são figuras da geometria não-Euclidiana.
A ...
published: 08 Jan 2015
Fractal a auto similaridade no infinito e a Teoria do Caos #MysteryHunter
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Fractal a auto similaridade no infinito e a Teoria do Caos #MysteryHunter
- published: 08 Jan 2015
- views: 11
Fractais (do latim fractus, fração, quebrado) são figuras da geometria não-Euclidiana. A geometria fractal é o ramo da matemática que estuda as propriedades e comportamento dos fractais. Descreve muitas situações que não podem ser explicadas facilmente pela geometria clássica, e foram aplicadas em ciência, tecnologia e arte gerada por computador. As raízes conceituais dos fractais remontam as tentativas de medir o tamanho de objetos para os quais as definições tradicionais baseadas na geometria euclidiana falham. Um fractal é um objeto geométrico que pode ser dividido em partes, cada uma das quais semelhante ao objeto original. Diz-se que os fractais têm infinitos detalhes, são geralmente autossimilares e independem de escala. Em muitos casos um fractal pode ser gerado por um padrão repetido, tipicamente um processo recorrente ou iterativo. O termo foi criado em 1975 por Benoît Mandelbrot, matemático francês nascido na Polónia, que descobriu a geometria fractal na década de 70 do século XX, a partir do adjetivo latino fractus, do verbo frangere, que significa quebrar. Vários tipos de fractais foram originalmente estudados como objetos matemáticos. História: Durante séculos, os objetos e os conceitos da filosofia e da geometria euclidiana foram considerados como os que melhor descreviam o mundo em que vivemos. A descoberta de geometrias não-euclidianas introduziu novos objetos que representam certos fenômenos do Universo, tal como se passou com os fractais. Assim, considera-se hoje que tais objetos retratam formas e fenômenos da Natureza. A ideia dos fractais teve a sua origem no trabalho de alguns cientistas entre 1857 e 1913. Esse trabalho deu a conhecer alguns objetos, catalogados como "demônios", que se supunha não terem grande valor científico. Em 1872, Karl Weierstrass encontrou o exemplo de uma função com a propriedade de ser contínua em todo seu domínio, mas em nenhuma parte diferenciável. O gráfico desta função é chamado atualmente de fractal. Em 1904, Helge von Koch, não satisfeito com a definição muito abstrata e analítica de Weierstrass, deu uma definição mais geométrica de uma função similar, atualmente conhecida como Koch snowflake (ou floco de neve de Koch), que é o resultado de infinitas adições de triângulos ao perímetro de um triângulo inicial. Cada vez que novos triângulos são adicionados, o perímetro cresce, e fatalmente se aproxima do infinito. Dessa maneira, o fractal abrange uma área infinita dentro de um perímetro infinito. Também houve muitos outros trabalhos relacionados a estas figuras, mas esta ciência só conseguiu se desenvolver plenamente a partir dos anos 60, com o auxílio da computação. Um dos pioneiros a usar esta técnica foi Benoît Mandelbrot, um matemático que já vinha estudando tais figuras. Mandelbrot foi responsável por criar o termo fractal, e responsável pela descoberta de um dos fractais mais conhecidos, o conjunto de Mandelbrot.
Fractal a auto similaridade no infinito e a Teoria do Caos #MysteryHunter
Published: 08 Jan 2015
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14:24
FRACTASTIC VOYAGE Part 2
Explore the wonderful world of fractal art. A fractal is "a rough or fragmented geometric ...
published: 06 Oct 2010
author: Don Garbutt
FRACTASTIC VOYAGE Part 2
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FRACTASTIC VOYAGE Part 2
- published: 06 Oct 2010
- views: 1216
- author: Don Garbutt
Explore the wonderful world of fractal art. A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least appr...
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15:01
Hunting The Hidden Dimensions - Fractals (part 1 of 4)
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of ...
published: 05 Dec 2010
author: ŠĩŗĜŕôŵåɭȍҭҭ
Hunting The Hidden Dimensions - Fractals (part 1 of 4)
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Hunting The Hidden Dimensions - Fractals (part 1 of 4)
- published: 05 Dec 2010
- views: 4429
- author: ŠĩŗĜŕôŵåɭȍҭҭ
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least approximately) a reduced-size copy of the whole,...
Hunting The Hidden Dimensions - Fractals (part 1 of 4)
Published: 05 Dec 2010
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0:29
Line Jaggedness Visualization with the Mandelbrot-Weierstrass Function
http://demonstrations.wolfram.com/LineJaggednessVisualizationWithTheMandelbrotWeierstrassF...
published: 10 Jul 2009
author: wolframmathematica
Line Jaggedness Visualization with the Mandelbrot-Weierstrass Function
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Line Jaggedness Visualization with the Mandelbrot-Weierstrass Function
- published: 10 Jul 2009
- views: 865
- author: wolframmathematica
http://demonstrations.wolfram.com/LineJaggednessVisualizationWithTheMandelbrotWeierstrassFunct/ The Wolfram Demonstrations Project contains thousands of free...
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10:12
Hunting The Hidden Dimensions - Fractals (part 3 of 4)
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of ...
published: 05 Dec 2010
author: ŠĩŗĜŕôŵåɭȍҭҭ
Hunting The Hidden Dimensions - Fractals (part 3 of 4)
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Hunting The Hidden Dimensions - Fractals (part 3 of 4)
- published: 05 Dec 2010
- views: 1168
- author: ŠĩŗĜŕôŵåɭȍҭҭ
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least approximately) a reduced-size copy of the whole,...
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10:23
Hunting The Hidden Dimensions - Fractals (part 4 of 4)
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of ...
published: 05 Dec 2010
author: ŠĩŗĜŕôŵåɭȍҭҭ
Hunting The Hidden Dimensions - Fractals (part 4 of 4)
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Hunting The Hidden Dimensions - Fractals (part 4 of 4)
- published: 05 Dec 2010
- views: 1455
- author: ŠĩŗĜŕôŵåɭȍҭҭ
A fractal is "a rough or fragmented geometric shape that can be split into parts, each of which is (at least approximately) a reduced-size copy of the whole,...
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0:42
Dr. Thorsten Dickhaus CMCGS 2015
Dr. Thorsten Dickhaus
Weierstrass Institute for Applied Analysis and Stochastics
Berlin, G...
published: 03 Feb 2015
Dr. Thorsten Dickhaus CMCGS 2015
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Dr. Thorsten Dickhaus CMCGS 2015
- published: 03 Feb 2015
- views: 8
Dr. Thorsten Dickhaus Weierstrass Institute for Applied Analysis and Stochastics Berlin, Germany
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6:15
Yuja Wang plays Chopin: Nocturne in C minor, Op. 48, No. 1 at Jerwood Hall, LSO, St. Lukes.
Yuja Wang plays Chopin Nocturne in C minor, Op. 48, No. 1 at Jerwood Hall, LSO St. Lukes,...
published: 11 Aug 2014
author: Weierstrass
Yuja Wang plays Chopin: Nocturne in C minor, Op. 48, No. 1 at Jerwood Hall, LSO, St. Lukes.
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Yuja Wang plays Chopin: Nocturne in C minor, Op. 48, No. 1 at Jerwood Hall, LSO, St. Lukes.
- published: 11 Aug 2014
- views: 625
- author: Weierstrass
Yuja Wang plays Chopin Nocturne in C minor, Op. 48, No. 1 at Jerwood Hall, LSO St. Lukes, London, Friday the 21st of Februari 2014. This was a free concert,...
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3:55
Die Glocke - Zeitung in der Grundschule
Wie sieht eine Schulstunde mit der Zeitung aus? "Die Glocke" hat mal nachgeschaut und ist ...
published: 06 Apr 2011
author: GlockeOnline
Die Glocke - Zeitung in der Grundschule
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Die Glocke - Zeitung in der Grundschule
- published: 06 Apr 2011
- views: 343
- author: GlockeOnline
Wie sieht eine Schulstunde mit der Zeitung aus? "Die Glocke" hat mal nachgeschaut und ist zur Karl-Weierstraß-Grundschule nach Ostenfelde gefahren. Dort habe...
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1:29
John Wheeler 1
This is a walking robots which tries to break down a wall it it is in the middle of his wa...
published: 24 Apr 2008
author: biloidhc
John Wheeler 1
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John Wheeler 1
- published: 24 Apr 2008
- views: 379
- author: biloidhc
This is a walking robots which tries to break down a wall it it is in the middle of his way.
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9:57
8-9 - WITTGENSTEIN-LOGICA E MATEMATICA 22-04-99.wmv
Come stabilire i limiti delle interpretazioni? Il socratismo scettico di Wittgenstein. Tee...
published: 19 Apr 2010
author: mirkobe79
8-9 - WITTGENSTEIN-LOGICA E MATEMATICA 22-04-99.wmv
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8-9 - WITTGENSTEIN-LOGICA E MATEMATICA 22-04-99.wmv
- published: 19 Apr 2010
- views: 372
- author: mirkobe79
Come stabilire i limiti delle interpretazioni? Il socratismo scettico di Wittgenstein. Teeteto. Cosa intende Wittgenstein per empirismo? Sullerrore che Wittg...
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3:11
All About - John von Neumann
What is John von Neumann?
A report all about John von Neumann for homework/assignment.
...
published: 08 Jan 2015
All About - John von Neumann
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All About - John von Neumann
- published: 08 Jan 2015
- views: 1
What is John von Neumann? A report all about John von Neumann for homework/assignment. John von Neumann (; December 28, 1903 – February 8, 1957) was a Hungarian and American pure and applied mathematician, physicist, inventor and polymath. He made major contributions to a number of fields, including mathematics (foundations of mathematics, functional analysis, ergodic theory, geometry, topology, and numerical analysis), physics (quantum mechanics, hydrodynamics, and fluid dynamics), economics (game theory), computing (Von Neumann architecture, linear programming, self-replicating machines, stochastic computing), and statistics. He was a pioneer of the application of operator theory to quantum mechanics, in the development of functional analysis, a principal member of the Manhattan Project and the Institute for Advanced Study in Princeton (as one of the few originally appointed), and a key figure in the development of game theory and the concepts of cellular automata, the universal constructor, and the digital computer. Intro/Outro music: Discovery Hit/Chucky the Construction Worker - Kevin MacLeod (incompetech.com) Licensed under CC-BY-3.0 Text derived from: http://en.wikipedia.org/wiki/John_von_Neumann Text to Speech powered by voice-rss.com Images are Public Domain or CC-BY-3.0: JohnvonNeumann-LosAlamos.gif from http://en.wikipedia.org/wiki/John_von_Neumann 200px-JohnvonNeumann-LosAlamos.gif from http://es.wikipedia.org/wiki/John_von_Neumann John_von_Neumann_ID_badge.png from http://en.wikipedia.org/wiki/John_von_Neumann 220px-JohnvonNeumann-LosAlamos.jpg from http://en.wikiquote.org/wiki/John_von_Neumann John_von_neumann_tomb_2004.jpg from http://en.wikipedia.org/wiki/John_von_Neumann John_von_Neumann.jpg from http://commons.wikimedia.org/wiki/File:John_von_Neumann.jpg
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6:00
Gamma Function - Part 5 - Gamma of 0.5 ( one half)
Topic: We will evaluate the value of the Gamma Function for s=0.5 What you should know: - ...
published: 02 Mar 2012
author: MrYouMath
Gamma Function - Part 5 - Gamma of 0.5 ( one half)
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Gamma Function - Part 5 - Gamma of 0.5 ( one half)
- published: 02 Mar 2012
- views: 3849
- author: MrYouMath
Topic: We will evaluate the value of the Gamma Function for s=0.5 What you should know: - Relation : Gamma(s)*Gamma(1-s)=pi/sin(pi*s) - Substitution in Integ...
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26:13
8/9/2012 蔡宜洵 教授, Elliptic functions and theta functions Part III
...
published: 09 Aug 2012
author: NCTSNorthPhysics
8/9/2012 蔡宜洵 教授, Elliptic functions and theta functions Part III
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8/9/2012 蔡宜洵 教授, Elliptic functions and theta functions Part III
- published: 09 Aug 2012
- views: 210
- author: NCTSNorthPhysics
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67:50
Jean-Pierre Bourguignon, The 1808 memoir of Joseph-Louis de Lagrange...
Jean-Pierre Bourguignon, Institut des Hautes Études Scientifiques, Bures- sur - Yvette The...
published: 17 Apr 2013
author: Scuola Normale Superiore
Jean-Pierre Bourguignon, The 1808 memoir of Joseph-Louis de Lagrange...
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Jean-Pierre Bourguignon, The 1808 memoir of Joseph-Louis de Lagrange...
- published: 17 Apr 2013
- views: 694
- author: Scuola Normale Superiore
Jean-Pierre Bourguignon, Institut des Hautes Études Scientifiques, Bures- sur - Yvette The 1808 memoir of Joseph-Louis de Lagrange and the Birth of Symplecti...
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3:31
Finding the simple patterns in a complex world
Professor Michael Barnsley has developed a new way to uncover simple patterns that might u...
published: 02 Dec 2014
Finding the simple patterns in a complex world
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Finding the simple patterns in a complex world
- published: 02 Dec 2014
- views: 910
Professor Michael Barnsley has developed a new way to uncover simple patterns that might underlie apparently complex systems, such as clouds, cracks in materials or the movement of the stockmarket. The method, named fractal Fourier analysis, is based on new branch of mathematics called fractal geometry. The method could help scientists better understand the complicated signals that the body gives out, such as nerve impulses or brain waves.
Finding the simple patterns in a complex world » (The Australian National University)
Professor Barnsley's work draws on the work of Karl Weierstrass from the late 19th Century, who ...
noodls 2014-12-03Love and Math: A Modern Russian's Lara Poem
As the famous German mathematician Karl Weierstrass said, "A mathematician who is not also something ...
Huffington Post 2014-01-15Mathematician who excelled in spite of prejudice
... auditing lectures but she received private tuition from the great mathematician Karl Weierstrass.
The Irish Times 2013-09-19- 1
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Karl Theodor Wilhelm Weierstrass (German: Weierstraß; 31 October 1815 – 19 February 1897) was a German mathematician who is often cited as the "father of modern analysis".
Weierstrass was born in Ostenfelde, part of Ennigerloh, Province of Westphalia.
Weierstrass was the son of Wilhelm Weierstrass, a government official, and Theodora Vonderforst. His interest in mathematics began while he was a Gymnasium student at Theodorianum in Paderborn. He was sent to the University of Bonn upon graduation to prepare for a government position. Because his studies were to be in the fields of law, economics, and finance, he was immediately in conflict with his hopes to study mathematics. He resolved the conflict by paying little heed to his planned course of study, but continued private study in mathematics. The outcome was to leave the university without a degree. After that he studied mathematics at the University of Münster (which was even at this time very famous for mathematics) and his father was able to obtain a place for him in a teacher training school in Münster. Later he was certified as a teacher in that city. During this period of study, Weierstrass attended the lectures of Christoph Gudermann and became interested in elliptic functions. In 1843 he taught in Deutsch-Krone in Westprussia and since 1848 he taught at the Lyceum Hosianum in Braunsberg. Besides mathematics he also taught physics, botanics and gymnastics.
This page contains text from Wikipedia, the Free Encyclopedia -
http://en.wikipedia.org/wiki/Karl_Weierstrass
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This article is licensed under the Creative Commons Attribution-ShareAlike 3.0 Unported License, which means that you can copy and modify it as long as the entire work (including additions) remains under this license.
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