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British Sign Language

Horizon - Who Do You Want Your Child to Be? (signed)

BBC
David Baddiel, father of two, sets out to answer one of the greatest questions a parent can ask: how best to educate your child. Taking in the latest scientific research, David uncovers some unconventional approaches: from the parent hot-hosing his child to record-breaking feats of maths, to a school that pays hard cash for good grades.
British-Sign-Language%%%Humanities

Business English Books

Mastering Statistics

Tim Hannagan , Macmillan , 1997
Mastering Statistics' is a comprehensive guide for students with no previous knowledge of statistics. It includes sections on probability, vital statistics, market research, experiments and scaling, and a section on how to pass statistics examinations
Maths

Lectures



Radio Recordings

A Brief History of Mathematics - 01 Newton and Leibniz

Marcus du Sautoy
This ten part history of mathematics reveals the personalities behind the calculations: the passions and rivalries of mathematicians struggling to get their ideas heard. Marcus du Sautoy shows how these masters of abstraction find a role in the real world and proves that mathematics is the driving force behind modern science.
Maths










Another Five Numbers 1

Simon Singh
Simon Singh's journey begins with the number 4, which for over a century has fuelled one of the most elusive problems in mathematics: is it true that any map can be coloured with just 4 colours so that no two neighbouring countries have the same colour? This question has tested some of the most imaginative minds - including Lewis Carroll's - and the eventual solution has aided the design of some of the world's most complex air and road networks.
Maths

Another Five Numbers 2

Simon Singh
Programme 2: The Number Seven Games of chance don't necessarily afford an equal chance of winning to all players. Certain gamblers savvy enough to do the maths have been exploiting the weaknesses of some games to their advantage for years. Lazy shuffling which doesn't completely randomise a deck of cards, for example, offers anyone with a head for probability theory the edge to trump their fellow gamblers. So how do you overcome this and create a level playing field?
Maths%%%Radio-Recordings

Another Five Numbers 3

Simon Singh
Programme 3: Prime Numbers Think of a number. Any number. Chances are you haven't plumped for 213,466,917 -1. To get this, you would need to keep multiplying 2 by itself 13,466,917 times, and then subtract 1 from the result. When written down it's 4,053,900 digits long and fills 2 telephone directories. So, as you can imagine, it's not the kind of number you're likely to stumble over often. Unless you're Bill Gates checking your bank statement at the end of the month.
Maths

Another Five Numbers 4

Simon Singh
Programme 4: Kepler's Conjecture Sir Walter Raleigh was a poet, adventurer and all-round Elizabethan scallywag. In between searching for El Dorado and harrying the Spanish fleet, he is credited with introducing the humble potato to England. He was also the first Brit to seriously go over their Duty Free tobacco allowance on his return from the Americas. One of his more obscure contributions to posterity however, lies in mathematics. Raleigh wanted to know if there was a quick way of estimating the number of cannonballs in a pile.
Maths

Another Five Numbers 5

Simon Singh
Programme 5: Game Theory Not long ago auctions seemed to be the preserve of either the mega-rich, bidding for Van Goghs at some plush auction house, or the shady car-dealer, paying cash-no-questions-asked for vehicles of dubious provenance. However, the advent of the Internet and David Dickinson has changed this. Auction web-sites allow the average punter to buy and sell pretty much anything, whilst an army of Bargain Hunt devotees can now happily tell their Delft from their Dresden.
Maths

Further Five Numbers 1

Simon Singh
Programme 1: 1 – the most popular number! Literally, the most popular number, as it appears more often than any other number. More specifically, the first digit of all numbers is a 1 about 30% of the time, whereas it is 9 just 4% of time. This was accidentally discovered by the engineer Frank Benford. It works for all numbers – mountain heights, river lengths, populations, etc.
Maths

Further Five Numbers 2

Simon Singh
Programme 2: 2 - At the double. We all remember the story of the Persian who invented chess and who asked to be paid with 1 grain of rice on the first square, 2 on the second, 4 on the third and so on, doubling all the way to the 64th square. He bankrupted the state!
Maths

Further Five Numbers 3

Simon Singh
Programme 3: 6 degrees of separation Six is often treated as 2x3, but has many characteristics of its own. Six is also the "pivot" of its divisors (1+2+3=6=1x2x3) and also the centre of the first five even numbers: 2, 4, 6, 8, 10. Six seems to have a pivoting action both mathematically and socially. How is it that everyone in the world can be linked through just six social ties? As Simon discovers, the concept of “six degrees of separation” emerged from a huge postal experiment conducted by the social psychologist Stanley Milgram in 1967. Milgram asked volunteers to send a package by mail to one of a hundred people chosen at random. But they could only send mail to people they knew on first name terms.
Maths

Further Five Numbers 4

Simon Singh
Programme 4: 6.67 x 10^-11 – the number that defines the universe. Newton’s equation of gravity included a number G, which indicates the strength of gravitation. It took 100 years before the shy Englishman Henry Cavendish (he left notes for his maids because he was too shy to talk to women) measured G to be 6.67 x 10^-11 Nm²/Kg². It allowed him to weigh the Earth itself.
Maths

Further Five Numbers 5

Simon Singh
Programme 5: 1729 – the first taxicab number Curious properties sometimes lurk within seemingly undistinguished numbers. 1729 sparked one of maths most famous anecdotes: a young Indian, Srinivasa Ramanujan, lay dying of TB in a London hospital. G.H. Hardy, the leading mathematician in England, visited him there. "I came over in cab number 1729," Hardy told Ramanujan. "That seems a rather dull number to me."
Maths%%%Radio-Recordings

In Our Time - Gödel's Incompleteness Theorems

Melvyn Bragg
In 1900, in Paris, the International Congress of Mathematicians gathered in a mood of hope and fear. The edifice of maths was grand and ornate but its foundations, called axioms, were shaking with inconsistency and lurking paradox. And so, at that conference, a young man called David Hilbert set out a plan to rebuild them – to make them consistent, all encompassing and without any hint of a paradox.
Maths%%%Radio-Recordings%%%History



In Our Time - Probability

Melvyn Bragg
Melvyn Bragg explores the mathematical concept of probability with his three guests: Marcus du Sautoy, Professor of Mathematics at the University of Oxford; Colva Roney-Dougal, Lecturer in Pure Mathematics at the University of St Andrews; and Ian Stewart, Professor of Mathematics at the University of Warwick
Maths

In Our Time - The Music of the Spheres

Melvyn Bragg
Melvyn Bragg considers the celestial harmonies of the planets, a Pythagorean concept which fascinated astrologists, artists and mathematicians for centuries. He is joined by Peter Forshaw, Postdoctoral Fellow at Birkbeck, University of London
Maths

In Our Time - The Poincare Conjecture

June Barrow-Green, Ian Stewart & Marcus du Sautoy
The French mathematician Henri Poincaré declared: “The scientist does not study mathematics because it is useful; he studies it because he delights in it, and he delights in it because it is beautiful. And it is because simplicity, because grandeur, is beautiful that we preferably seek simple facts, sublime facts, and that we delight now to follow the majestic course of the stars.” Poincaré’s ground-breaking work in the 19th and early 20th century has indeed led us to the stars and the consideration of the shape of the universe itself.
Maths