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Mathematical Collection

Background imageMathematical Collection: Fractal geometry showing Mandelbrot Set

Fractal geometry showing Mandelbrot Set
Fractal geometry: computer graphics representation of the Mandelbrot Set, plotted from complex number coordinates

Background imageMathematical Collection: Andrei Kolmogorov, Soviet mathematician

Andrei Kolmogorov, Soviet mathematician
Andrei Kolmogorov (1903-1987), Soviet mathematician. Kolmogorov is widely considered one of the most prominent mathematicians of the 20th century

Background imageMathematical Collection: Particle physics equations

Particle physics equations

Background imageMathematical Collection: 19th Century Moroccan wall feature

19th Century Moroccan wall feature. Photographed in the the Marrakech Museum, Dar Menebhi Palace, Morocco

Background imageMathematical Collection: Fibonacci spiral, artwork

Fibonacci spiral, artwork
Fibonacci spiral. Computer artwork of a spiral within squares whose sides decrease in length by a factor of 0.168. This number (phi) is derived from the golden ratio Phi (1.618)

Background imageMathematical Collection: Title pages of Pacciolis Summa de Arithmetica

Title pages of Pacciolis Summa de Arithmetica
^BMathematics book.^b Title page of a medieval book on mathematics

Background imageMathematical Collection: Ludwig Wittgenstein, caricature

Ludwig Wittgenstein, caricature
Ludwig Wittgenstein. Caricature of the Austrian-British philosopher Ludwig Josef Johann Wittgenstein (1889-1951)

Background imageMathematical Collection: Richard Feynman, caricature C015 / 6715

Richard Feynman, caricature C015 / 6715
Richard Feynman (1918-1988). Caricature of the American theoretical physicist Richard Phillips Feynman. As a young man, Feynman worked on the American atomic bomb project at Los Alamos

Background imageMathematical Collection: Part of manuscript written by Evariste Galois

Part of manuscript written by Evariste Galois
Part of a manuscript written by the French mathematician Evariste Galois (1811-1832)

Background imageMathematical Collection: Calabai-yau manifolds

Calabai-yau manifolds
Calabi-yau manifolds. Computer artwork of calabi- yau manifolds

Background imageMathematical Collection: Mandelbrot fractal

Mandelbrot fractal. Computer artwork of a part of the Mandelbrot Set, a pattern generated using a simple repeating mathematical process

Background imageMathematical Collection: Logarithm table

Logarithm table. Rows and columns of logarithms. These are numerical values used in mathematics to aid multiplication and division

Background imageMathematical Collection: John Venn, caricature C013 / 7595

John Venn, caricature C013 / 7595
John Venn (1834-1923). Caricature of the British logician and philosopher John Venn

Background imageMathematical Collection: Plato, Ancient Greek philosopher

Plato, Ancient Greek philosopher
Plato (427-347 BC), Ancient Greek philosopher. Platos spirit of rational inquiry led to todays scientific method. His writings shaped and continue to have a profound influence on Western thought

Background imageMathematical Collection: Sofia Kovalevskaya, Russian mathematician

Sofia Kovalevskaya, Russian mathematician
Sofia Vasilyevna Kovalevskaya (1850-1891), Russian mathematician. Kovalevskaya was the first female member of the St Petersburg Academy of Sciences

Background imageMathematical Collection: Rubiks cube, artwork

Rubiks cube, artwork
Rubiks cube, computer artwork

Background imageMathematical Collection: Mathematical series, 18th century

Mathematical series, 18th century

Background imageMathematical Collection: Penrose stairs, artwork

Penrose stairs, artwork
Penrose stairs, computer artwork. This is an impossible figure created by the physicist Roger Penrose and used by M C Escher in his illustration Ascending and Descending

Background imageMathematical Collection: Penrose stairs, artwork

Penrose stairs, artwork
Penrose stairs. Computer artwork of Einstein characters climbing a set of Penrose stairs

Background imageMathematical Collection: Alan Turing, British mathematician

Alan Turing, British mathematician
Alan Turing. Caricature of the British mathematician Alan Turing (1912-54)

Background imageMathematical Collection: Plato, caricature

Plato, caricature
Plato. Caricature of the Ancient Greek philosopher Plato (427-347 BC). Platos spirit of rational inquiry led to todays scientific method

Background imageMathematical Collection: Spiral fractal

Spiral fractal, computer artwork

Background imageMathematical Collection: Infinity

Infinity symbol, computer artwork

Background imageMathematical Collection: Particle physics equations

Particle physics equations

Background imageMathematical Collection: Dragon tail fractal

Dragon tail fractal, computer artwork

Background imageMathematical Collection: Fractal, artwork

Fractal, artwork
Fractal, computer artwork

Background imageMathematical Collection: Quasicrystal

Quasicrystal. Computer model of a quasicrystal pattern. The crystals are a type of solid structure where there is long-range order with five-fold symmetry, which results in a non- repeating pattern

Background imageMathematical Collection: Mandelbrot fractal F008 / 4429

Mandelbrot fractal F008 / 4429
Mandelbrot fractal. Computer graphic showing a fractal image derived from the Mandelbrot Set. Fractals geometry is used to derive complex shapes as often occur in nature

Background imageMathematical Collection: Mandelbrot fractal F008 / 4436

Mandelbrot fractal F008 / 4436
Mandelbrot fractal. Computer graphic showing a fractal image derived from the Mandelbrot Set. Fractals geometry is used to derive complex shapes as often occur in nature

Background imageMathematical Collection: Rene Descartes, French mathematician

Rene Descartes, French mathematician
Rene Descartes (1596-1650), French mathematician and philosopher, also known as Renatus Cartesius

Background imageMathematical Collection: Henri Poincare, French mathematician

Henri Poincare, French mathematician
Henri Poincare (1854-1912), French mathematician. Poincare is considered one of the greatest mathematicians of all time

Background imageMathematical Collection: Maze, artwork

Maze, artwork
Maze, computer artwork

Background imageMathematical Collection: Impossible triangle, artwork

Impossible triangle, artwork
Impossible triangle, computer artwork. This is an impossible figure created by the physicist Roger Penrose. Impossible figures are objects that can be drawn but not created

Background imageMathematical Collection: Sunflower seed head

Sunflower seed head (Helianthus annuus). The spiral arrangement of the seeds describe a Fibonacci mathematical series, one in which each number is the sum of the two previous numbers

Background imageMathematical Collection: Fibonacci spiral and Phi, artwork

Fibonacci spiral and Phi, artwork
Fibonacci spiral and Phi, computer artwork. The constant Phi, written to 866 decimal places, is calculated as (1 + square root of five, divided by 2)

Background imageMathematical Collection: Bernouilli Brothers

Bernouilli Brothers
Brothers Jakob I and Johann I Bernoulli working on a problem of geometry

Background imageMathematical Collection: Trefoil knot

Trefoil knot

Background imageMathematical Collection: Rhind Mathematical Papyrus, from Thebes, Egypt, c1550 BC

Rhind Mathematical Papyrus, from Thebes, Egypt, c1550 BC
Detail of the Rhind mathematical papyrus, showing mathematical problems, from Thebes, Egypt, End of the Second Intermediate Period, c1550 BC

Background imageMathematical Collection: Mandelbrot fractal F008 / 4427

Mandelbrot fractal F008 / 4427
Mandelbrot fractal. Computer graphic showing a fractal image derived from the Mandelbrot Set. Fractals geometry is used to derive complex shapes as often occur in nature

Background imageMathematical Collection: Isaac Newton, caricature C013 / 7593

Isaac Newton, caricature C013 / 7593
Isaac Newton (1642-1727). Caricature of the English physicist, mathematician and alchemist Sir Isaac Newton, holding a rainbow

Background imageMathematical Collection: Pierre de Fermat, caricature C015 / 6714

Pierre de Fermat, caricature C015 / 6714
Pierre de Fermat, caricature

Background imageMathematical Collection: Leonard Euler, caricature C015 / 6711

Leonard Euler, caricature C015 / 6711
Leonhard Euler (1707-1783). Caricature of the Swiss mathematician and physicist Leonhard Euler

Background imageMathematical Collection: Augustin Cauchy, caricature C015 / 6700

Augustin Cauchy, caricature C015 / 6700
Augustin Cauchy (1789-1857). Caricature of the French mathematician Augustin Cauchy. Cauchy was a pioneer of analysis and the theory of permutation groups

Background imageMathematical Collection: Infinity symbol and black hole

Infinity symbol and black hole
Black hole, abstract computer artwork. Matter is spiralling into the black hole, dragged by the immense gravitational forces. This causes the matter to give off high-energy X-rays

Background imageMathematical Collection: Maze, computer artwork

Maze, computer artwork

Background imageMathematical Collection: Issac Newton and the apple, artwork

Issac Newton and the apple, artwork
Issac Newton and the apple, computer artwork

Background imageMathematical Collection: Issac Newton, English physicist

Issac Newton, English physicist
Isaac Newton. Engraving of the English physicist, mathematician and alchemist Sir Isaac Newton (1642-1727)

Background imageMathematical Collection: Henri Poincare, caricature C015 / 6708

Henri Poincare, caricature C015 / 6708
Henri Poincare, caricature

Background imageMathematical Collection: Evolution of the yardstick

Evolution of the yardstick. The oldest yardstick is at bottom, becoming more modern towards the top

Background imageMathematical Collection: Ivan Vinogradov, Soviet mathematician

Ivan Vinogradov, Soviet mathematician
Ivan Matveevich Vinogradov (1891-1983), Soviet mathematician. Vinogradov was one of the founders of modern analytic number theory

Background imageMathematical Collection: Mstislav Keldysh, Russian physicist

Mstislav Keldysh, Russian physicist
Mstislav Keldysh (1911-1978), Russian mathematician and physicist

Background imageMathematical Collection: Tsiolkovskys works on space conquest

Tsiolkovskys works on space conquest
Konstantin Tsiolkovskys early works on space conquest. Tsiolkovsky (1857-1935) was a Russian rocket pioneer

Background imageMathematical Collection: Strange attractor, artwork

Strange attractor, artwork
Strange attractor, computer artwork

Background imageMathematical Collection: Mathematical equipment

Mathematical equipment
Mathematics equipment. Protractor (left), a pair of compasses and pencil (centre top), a pen (right) and an electronic calculator (lower centre)

Background imageMathematical Collection: Pascals calculator, 17th Century artwork

Pascals calculator, 17th Century artwork
Pascals calculator. Historical artwork showing the mechanism inside a 17th Century mechanical device used to perform mathematical calculations

Background imageMathematical Collection: Babylonian cuneiform numerals

Babylonian cuneiform numerals. Key to the clay-pressed Cuneiform numerals used in the later Babylonian period (2000BC to 75AD)

Background imageMathematical Collection: Chaos waves, artwork

Chaos waves, artwork
Chaos waves, computer artwork. Chaotic systems are systems that look random but aren t. They are actually deterministic systems (predictable if you have enough information) governed by physical laws

Background imageMathematical Collection: Egyptian and Assyrian counting systems

Egyptian and Assyrian counting systems. Early methods of number counting involved the use of fingers, while early written records used strokes to indicate numbers

Background imageMathematical Collection: Computer-generated chaos fractal

Computer-generated chaos fractal

Background imageMathematical Collection: Molecular orbitals

Molecular orbitals. Computer model of a mixture of molecular orbitals. The electrons in molecules can be arranged in different patterns, giving rise to different energies

Background imageMathematical Collection: Solar eclipse, 18th century artwork

Solar eclipse, 18th century artwork
Solar eclipse. 18th century diagram showing the principles behind solar eclipses. Figure I shows difference in appearance between total (B) and annular (A) eclipses

Background imageMathematical Collection: Geometric shapes, artwork

Geometric shapes, artwork
Geometric shapes, computer artwork. These are a cube (green), a cylinder (blue), a cone (red) and a sphere (silver)

Background imageMathematical Collection: Rene Descartes, French mathematician

Rene Descartes, French mathematician
Rene Descartes (1596-1650), French mathematician and philosopher. His coat-of-arms (upper right) mark his self-styled title of Lord of Perron

Background imageMathematical Collection: Mathematical model, artwork

Mathematical model, artwork
Mathematical model, computer artwork. This model represents a type of non-linear wave, known as a breather. A breathers energy tends to be localised in space, and oscillates in time

Background imageMathematical Collection: Color by numbers. Coloring book for kids.Pixel art

Color by numbers. Coloring book for kids.Pixel art Color by numbers. Education game for children. Cat, feline, pets, animal. Coloring book with numbered squares. Pixel art. Graphic task for kids.

Background imageMathematical Collection: Schoolboy doing a chalk calculation on a blackboard, 1907 (drawing)

Schoolboy doing a chalk calculation on a blackboard, 1907 (drawing)
PCT8975988 Schoolboy doing a chalk calculation on a blackboard, 1907 (drawing); (add.info.: Drawing in the magazine "Je sais tout" 1907); © Patrice Cartier. All rights reserved 2024

Background imageMathematical Collection: Hemisphere faces, edges, vertices Geometric figures outline set isolated on a white backdrop

Hemisphere faces, edges, vertices Geometric figures outline set isolated on a white backdrop. 3d shapes. in mathematics. vector illustration

Background imageMathematical Collection: Queen's College in Cambridge

Queen's College in Cambridge
This 1907 illustration shows Queen's College in Cambridge, England. On the left is seen the garden front of the President's Lodge

Background imageMathematical Collection: Add. MS 23379, fol. 4b Suhrab's diagram for a world map

Add. MS 23379, fol. 4b Suhrab's diagram for a world map
BL3273831 Add. MS 23379, fol. 4b Suhrab's diagram for a world map, illustration from the Book of the Wonders of the Seven Climes to the Ends of the Inhabited World

Background imageMathematical Collection: Tables representing man in three different states, 1717 (manuscript)

Tables representing man in three different states, 1717 (manuscript)
BL7422636 Tables representing man in three different states, 1717 (manuscript) by German School, (18th century); British Library, London

Background imageMathematical Collection: Important Formulas in Algebra Mathematics

Important Formulas in Algebra Mathematics, Modern math formulas for education backdrop. Colorful latest educational concept background

Background imageMathematical Collection: A Polar Graph with 3 concentric circles showing radius and divided into sections of 10 degree (labeled) each

A Polar Graph with 3 concentric circles showing radius and divided into sections of 10 degree (labeled) each

Background imageMathematical Collection: Multiplication table isolated on white

Multiplication table isolated on white Illustration of multiplication table isolated on white



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EDITORS COMMENTS

"Unlocking the Mysteries of Mathematics: From Fractals to Equations" Embark on a captivating journey through the intricate world of mathematics, where beauty and complexity intertwine. Delve into the mesmerizing realm of fractal geometry as you witness the breathtaking Mandelbrot Set unfold before your eyes, revealing its infinite intricacies. Transport yourself back in time to 19th-century Morocco, where an exquisite wall feature showcases mathematical patterns that have stood the test of time. Marvel at the Fibonacci spiral artwork, a symbol of nature's harmonious proportions found everywhere from seashells to sunflowers. Meet Richard Feynman and Ludwig Wittgenstein through their lively caricatures; two brilliant minds who revolutionized physics and philosophy respectively with their groundbreaking ideas. Their contributions continue to shape our understanding of the world around us. Discover a piece of history as you explore a manuscript written by Evariste Galois, whose profound insights laid the foundation for modern algebraic equations. Admire Pacciolis' Summa de Arithmetica title pages, which encapsulate centuries-old wisdom passed down through generations. Immerse yourself in particle physics as you encounter complex equations that unravel the secrets hidden within subatomic particles. Witness quasicrystals defy conventional symmetry rules, showcasing extraordinary patterns that challenge our perception of order. Uncover one of mathematics' most powerful tools - logarithms - as you peruse an ancient logarithm table meticulously crafted by mathematicians throughout history. Appreciate how these tables facilitated calculations long before calculators existed. Finally, lose yourself in yet another stunning fractal artwork that captures both chaos and harmony simultaneously—a testament to mathematics' ability to reveal beauty even in seemingly chaotic systems. Mathematics is not merely numbers on paper; it is an art form woven into every aspect of our existence. Join us on this awe-inspiring journey as we unlock its mysteries and appreciate its profound impact on our world.

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