eBook - ePub
Mathematics
From Creating the Pyramids to Exploring Infinity
Anne Rooney
This is a test
Partager le livre
- English
- ePUB (adapté aux mobiles)
- Disponible sur iOS et Android
eBook - ePub
Mathematics
From Creating the Pyramids to Exploring Infinity
Anne Rooney
DĂ©tails du livre
Aperçu du livre
Table des matiĂšres
Citations
Ă propos de ce livre
In order to understand the universe you must know the language in which it is written. And that language is mathematics.
- Galileo (1564-1642) People have always sought order in the apparent chaos of the universe. Mathematics has been our most valuable tool in that search, uncovering the patterns and rules that govern our world and beyond. This book traces humankind's greatest achievements, plotting a journey through the mathematical intellects of the last 4, 000 years to where we stand today.It features the giants of mathematics, from Euclid and Pythagoras, through Napier and Newton, to Leibniz, Riemann, Russell, and many more. Topics include:
• Counting and measuring from the earliest times
• The Ancient Egyptians and geometry
• The movements of planets
• Measuring and mapping the world
• Fuzzy logic and set theory
• The death of numbers ABOUT THE SERIES: Arcturus Fundamentals Series explains fascinating and far-reaching topics in simple terms. Designed with rustic, tactile covers and filled with dynamic illustrations and fact boxes, these books will help you quickly get to grips with complex topics that affect our day-to-day living.
Foire aux questions
Comment puis-je résilier mon abonnement ?
Il vous suffit de vous rendre dans la section compte dans paramĂštres et de cliquer sur « RĂ©silier lâabonnement ». Câest aussi simple que cela ! Une fois que vous aurez rĂ©siliĂ© votre abonnement, il restera actif pour le reste de la pĂ©riode pour laquelle vous avez payĂ©. DĂ©couvrez-en plus ici.
Puis-je / comment puis-je télécharger des livres ?
Pour le moment, tous nos livres en format ePub adaptĂ©s aux mobiles peuvent ĂȘtre tĂ©lĂ©chargĂ©s via lâapplication. La plupart de nos PDF sont Ă©galement disponibles en tĂ©lĂ©chargement et les autres seront tĂ©lĂ©chargeables trĂšs prochainement. DĂ©couvrez-en plus ici.
Quelle est la différence entre les formules tarifaires ?
Les deux abonnements vous donnent un accĂšs complet Ă la bibliothĂšque et Ă toutes les fonctionnalitĂ©s de Perlego. Les seules diffĂ©rences sont les tarifs ainsi que la pĂ©riode dâabonnement : avec lâabonnement annuel, vous Ă©conomiserez environ 30 % par rapport Ă 12 mois dâabonnement mensuel.
Quâest-ce que Perlego ?
Nous sommes un service dâabonnement Ă des ouvrages universitaires en ligne, oĂč vous pouvez accĂ©der Ă toute une bibliothĂšque pour un prix infĂ©rieur Ă celui dâun seul livre par mois. Avec plus dâun million de livres sur plus de 1 000 sujets, nous avons ce quâil vous faut ! DĂ©couvrez-en plus ici.
Prenez-vous en charge la synthÚse vocale ?
Recherchez le symbole Ăcouter sur votre prochain livre pour voir si vous pouvez lâĂ©couter. Lâoutil Ăcouter lit le texte Ă haute voix pour vous, en surlignant le passage qui est en cours de lecture. Vous pouvez le mettre sur pause, lâaccĂ©lĂ©rer ou le ralentir. DĂ©couvrez-en plus ici.
Est-ce que Mathematics est un PDF/ePUB en ligne ?
Oui, vous pouvez accĂ©der Ă Mathematics par Anne Rooney en format PDF et/ou ePUB ainsi quâĂ dâautres livres populaires dans Mathematics et History & Philosophy of Mathematics. Nous disposons de plus dâun million dâouvrages Ă dĂ©couvrir dans notre catalogue.
Informations
Sujet
MathematicsSous-sujet
History & Philosophy of MathematicsCHAPTER 1
Starting with numbers
Before we could have mathematics, we needed numbers. Philosophers have argued for years about the status of numbers, about whether they have any real existence outside human culture, just as they argue about whether mathematics is invented or discovered. For example, is there a sense in which the area of a rectangle âisâ the multiple of two sides, which is true independent of the activity of mathematicians? Or is the whole a construct, useful in making sense of the world as we experience it, but not âtrueâ in any wider sense? The German mathematician Leopold Kronecker (1823â91) made many enemies when he wrote, âGod made the integers; all else is the work of man.â Whichever opinion we incline towards individually, it is with the positive integers â the whole numbers above zero â that humankindâs mathematical journey began.
Where do numbers come from?
Numbers are so much a part of our everyday lives that we take them for granted. Theyâre probably the first thing you see in the morning as you glance at the clock, and we all face a barrage of numbers throughout the day. But there was a time before number systems and counting. The discovery â or invention â of numbers was one of the crucial steps in the cultural and civil development of humankind. It enabled ownership, trade, science and art, as well as the development of social structures and hierarchies â and, of course, games, puzzles, sports, gambling, insurance and even birthday parties!
FOUR MAMMOTHS OR MORE MAMMOTHS?
Imagine an early human looking at a herd of potential lunch â buffalo, perhaps, or woolly mammoths. There are a lot; the hunter has no number system and canât count them. He or she has a sense of whether it is a large herd or a small herd, recognizes that a single mammoth makes easier prey, and knows that if there are more hunters the task of hunting is both easier and safer. There is a clear difference between one and âmore-than-oneâ, and between many and few. But this is not counting.
At some point, it becomes useful to quantify the extra mammoths in some way â or the extra people needed to hunt them. Precise numbers are still not absolutely essential, unless the hunters want to compare their prowess.
CAN ANIMALS COUNT?
Could the mammoths count their attackers? Some animals can apparently count small numbers. Pigeons, magpies, rats and monkeys have all been shown to be able to count small quantities and distinguish approximately between larger quantities. Many animals can recognize if one of their young is missing, too.
TALLY-HO!
Moving on, and the mammoth hunters settle to herding their own animals. As soon as people started to keep animals, they needed a way to keep track of them, to check whether all the sheep/goats/yaks/pigs were safely in the pen. The easiest way to do this is to match each animal to a mark or a stone, using a tally.
It isnât necessary to count to know whether a set of objects is complete. We can glance at a table with 100 places set and see instantly whether there are any places without diners. One-to-one correspondence is learned early by children, who play games matching pegs to holes, toy bears to beds, and so on, and was learned early by humankind. This is the basis of set theory â that one group of objects can be compared with another. We can deal simply with sets like this without a concept of number. Similarly, the early farmer could move pebbles from one pile to another without counting them.
The need to record quantities of objects led to the first mark-making, the precursor of writing. A wolf bone found in the Czech Republic carved with notches more than 30,000 years ago apparently represents a tally and is the oldest known mathematical object.
FROM TWO TO TWO-NESS
A tally stick (or pile of pebbles) that has been developed for counting sheep can be put to other uses. If there are 30 sheep-tokens, they can also be used for tallying 30 goats or 30 fish or 30 days. Itâs likely that tallies were used early on to count time â moons or days until the birth of a baby, for example, or from planting to cropping. The realization that â30â is a transferable idea and has some kind of independence of the concrete objects counted heralds a concept of number. Besides seeing that four apples can be shared out as two apples for each of two people, people discovered that four of anything can always be divided into two groups of two and, indeed, four âisâ two twos.
At this point, counting became more than tallying and numbers needed names.
BODY COUNTING
Many cultures developed methods of counting by using parts of the body. They indicated different numbers by pointing at body parts or distances on the body following an established sequence. Eventually, the names of the body parts probably came to stand for the numbers and âfrom nose to big toeâ would mean (say) 34. The body part could be used to denote 34 sheep, or 34 trees, or 34 of anything else.
TOWARDS A NUMBER SYSTEM
Making a single mark for a single counted object on a stick, slate or cave wall is all very well for a small number of objects, but it quickly becomes unmanageable. Before humankind could use numbers in any more complex way than simply tallying or counting, we needed methods of recording them that were easier to apprehend at a glance than a row of strokes or dots. While we can only surmise from observing non-industrialized people as to how verbal counting systems may have developed, there is physical evidence in the form of artefacts and records for the development of written number systems.
The earliest number systems were related to tallies in that they began with a series of marks corresponding one-to-one to counted objects, so âIIIâ or ââŠâ might represent 3. By 3400BC, the Ancient Egyptians had developed a system of symbols (or hieroglyphs) for powers of ten, so that they used a stroke for each unit and a symbol for 10, then a different symbol for 100, another for 1,000 and so on up to 1,000,000. Within each group, the symbol was repeated up to nine times, grouped in a c...