Fly faster? Fly shorter!

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The zip contains a .html page and its files folder. Just unzip it and launch index.html in a browser.

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크레딧

The first version of this program was designed by Alessandro Cattaneo, Maria Cristina Cattoni, Filippo Francesco Favale and Riccardo Moschetti last year. That version was used as one part of the exposition “Matematica Terra Terra” of Curvilinea. The current version has been completely renewed by adding new graphics, enhanced functionalities and controls in occasion of the MPE 2017 competition.

참여자

Programming, Design, beta-testing, texts and graphicsAlessandro Cattaneo, Programming, Design, beta-testing, texts and graphicsMaria Cristina Cattoni, Programming, Design, beta-testing, texts and graphicsFilippo Francesco Favale, Programming, Design, beta-testing, texts and graphicsRiccardo Moschetti

제작지원

We thank Curvilinea (www.curvilinea.org) for allowing us to present this new version of this exhibit.

“Fly faster? Fly shorter!” is an educational math game (designed for one-player or two-players mode). Players fly a plane that cannot change speed, so they can win only by following the shortest route between the checkpoints they have to reach. But which is the shortest route on a map? Test your skill!

Players are flying a plane at fixed speed and altitude, racing each other to be the first to complete a race to six checkpoint on the planet Earth. Since both planes fly at the same speed you can only win by following the shortest route. On a sphere the shortest path between two points is given by an arc of geodesic line, which is an arc of a great circle i. e. a circle whose central point is the same as the sphere center.

The game takes place on Earth, but players see everything projected on a chart of their choice.
Hence your plane will have some unusual behaviour: it will accelerate and decelerate suddenly, it will change its shape and size… you will not believe when you will see it!
But do not worry about your aviator skills: the fault is all of the map distortion!

Unfortunately, this distorsion cannot be completely avoided an important mathematical result: Gauss’s Theorema Egregium.
The distorsion is exactly what is interesting about the game: we let the players experience this distortion in such a way that they can understand mathematical properties of the map by doing this! 

Player can discover the shape of geodesic lines, what does it mean to have a conformal or equal-area map, what are parallels and meridians and how they are shown on each chart…
Players can learn while having fun!

If you are curious and want more information check the description files and… enjoy the game!

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