Plus Blog
March 2, 2010
Tuesday, March 02, 2010
Calling all algebraic artists!Everyone has the chance to create mathematical beauty as part of a competition during the Cambridge Science Festival. As part of the Imaginary exhibition of beautiful mathematical images and artwork taken from algebraic geometry and differential geometry, visitors (both real and virtual) can create their own mathematical art. By downloading the SURFER program, anyone can create images of algebraic surfaces by simple equations using the three spatial coordinates of x, y and z. For example, the equation x^{2} + y^{2} + z^{2} = 1 results in a sphere. The competition requires creativity, intuition and mathematical skill in order to create equations yourself or to change given equations to produce beautiful images. The images are easily generated with the SURFER programme, and you can then upload your artwork to the competition gallery by 20 March. Everybody is invited to take part, including group entries from classes and families. The entries will be judged by a distinguished panel including Sir Christopher Frayling (Royal College of Art and Arts Council England) and Conrad Shawcross (sculptor and artistinresidence at the Science Museum, London). So good luck to all aspiring artists, and if you need some inspiration why not browse through the Plus articles on maths and art. posted by Plus @ 5:32 PM 0 Comments: 
March 2, 2010
Tuesday, March 02, 2010
What does mathematics feel like?If you have ever wondered what it feels like to do mathematics, take a look at the series of beautiful short films produced by the mathematics department at the University of Bristol. Chrystal Cherniwchan, Azita Ghassemi and Jon Keating interviewed over 60 mathematicians, asking them to describe the emotional aspects of maths research. The discussions range from the role of creativity and beauty in maths, to what it feels like to pursue the wrong research path, and the eureka moment of discovering mathematical truth. You can view them all on the Mathematical Ethnographies site. You can also read more about beauty in mathematics, in Plus, as well as the mathematical lives of John Conway, Stephen Hawking and Gerardus 't Hooft and many others in our careers with maths library. posted by Plus @ 4:39 PM 0 Comments: 
February 17, 2010
Wednesday, February 17, 2010
Browse with Plus: Symmetry, reality's riddleMarcus du Sautoy is a mathematician and Charles Simonyi Professor for the Public Understanding of Science. In this TED talk he explores how the world turns on symmetry — from the spin of subatomic particles to the dizzying beauty of an arabesque — complete with an introduction to groups. Marcus du Sautoy has also written several articles for Plus: posted by Plus @ 12:23 PM 0 Comments: 
February 17, 2010
Wednesday, February 17, 2010
Maths in a minute — Achilles and the tortoiseAchilles and a tortoise are competing in a 100m sprint. Confident in his victory, Archilles lets the tortoise start 10m ahead of him. The race starts, Achilles zooms off and the tortoise starts bumbling along. When Achilles has reached the point A from where the tortoise started, it has crawled along by a small distance to point B. In a flash Achilles reaches B, but the tortoise is already at point C. When he reaches C, the tortoise is at D. When he's at D, the tortoise is at E. And so on. He's never going to catch up with the tortoise, so he has no chance of winning the race. Something's wrong here, but what? Let's assume that Achilles is ten times faster than the tortoise and that both are moving at constant speed. In the times it takes Achilles to travel the first 10m to point A, the tortoise, being ten times slower, has only moved by 1m to point B. By the time Achilles has travelled 1m to point B, the tortoise has crawled along by 0.1m to point C. And so on. After n such steps the tortoise has travelled And this is where the flaw of the argument lies. The tortoise will never cover the 90m it has to run using steps like these, no matter how many of them it takes. In fact, the distance covered in this way will never exceed 10/9=1.111... metres. This is because the geometric progression converges to 10/9. Since the tortoise is travelling at constant speed, it covers this distance in a finite time, and it's precisely when it's done that that Achilles overtakes it. This problem is known as one of Zeno's paradoxes, after the ancient Greek philosopher Zeno, who used paradoxes like this one to argue that motion is just an illusion. Find out more about Zeno's paradoxes in the Plus article posted by Plus @ 12:10 PM 0 Comments: 
February 17, 2010
Wednesday, February 17, 2010
A central prediction of Albert Einstein's general theory of relativity is that gravity makes clocks tick more slowly — time passes slower when you're close to a massive body like the Earth, compared to when you're further away from it where its gravitational pull is weaker. This prediction has already been confirmed in experiments using airplanes and rockets, but a new experiment in an atom interferometer measures the slowdown 10,000 times more accurately than before — and finds it to be exactly what Einstein predicted. Labels: Latest news posted by Plus @ 12:27 PM 3 Comments:

February 12, 2010
Friday, February 12, 2010
Maths at the Cambridge Science FestivalIf you're wondering how to feed your maths habit between the 8th and 21st of March, then why not head to Cambridge for the 2010 Cambridge Science Festival? There'll be plenty of free maths events, including:
To find out about all the Cambridge Science Festival events go to the festival website. posted by Plus @ 1:01 PM 0 Comments: 