Matematik Dükkanı Oku. İzle. Oyna. Keşfet. Yarat Books Young Readers Mathflix P+ Games Toys and Gadgets 3D Models Genç Okurlar için Kitaplar Kişisel veya Sınıf Kitaplığınızı oluşturun Age: 12+ Geometry Puzzles in Felt Tip: A compilation of puzzles from 2018 by Catriona Shearer Katharine Agg Buy on Amazon Age: 10+ The Puzzle Universe: A History of Mathematics in 315 Puzzles by Ivan Moscovich Buy on Amazon Age: 7+ Balance Benders I, II, III by Robert Femiano Buy on Amazon Age: 7 - 11 Molly and the Mathematical Mysteries by Eugenia Cheng Buy on Amazon Age: 10+ Women in Science by Rachel Ignotofsky Buy on Amazon Age: 10+ Librarian who measured the Earth by Kathryn Lasky Buy on Amazon Age: 11+ Euclid: The Man Who Invented Geometry by Shoo Rayner Buy on Amazon Age: 9+ What's Your Angle, Pythagoras? by Julie Ellis Buy on Amazon Age: 7+ The Boy Who Loved Math: by Deborah Heiligman Buy on Amazon Age: 7+ Counting on Katherine by Helaine Becker Buy on Amazon Age: 7+ Hidden Figures: by Margot L Shetterly Buy on Amazon Age: 15+ The Magic of Math: by Arthur Benjamin Buy on Amazon Age: 10+ Nikola Tesla by Amy M. O'Quinn Buy on Amazon Age: 9+ What's the Point of Math? by DK Buy on Amazon Age: 10+ Big Thinkers and Big Ideas by Sharon Kaye Buy on Amazon Age: 10+ George's Secret Key to the Universe by Stephen Hawking, Lucy Hawking Buy on Amazon Age: 12+ Letters to a Young Scientist by Edward O. Wilson Buy on Amazon Age: 9+ Exemplary Evidence by Jessica Fries-Gaither Buy on Amazon Age: 12+ Drawing Perspective by Markus Sebastian Agerer Buy on Amazon Age: 12+ The Magic Mirror by McLoughlin Bros. Buy on Amazon Age: 7+ Explorer Academy Codebreaking Activity Adventure by Gareth Moore Buy on Amazon Age: 9+ The Big Book of Brain Games: 1,000 PlayThinks of Art, Math & Science by Ivan Moscovich Buy on Amazon Age: 7+ The Dragon Curve by Alicia Burdess Buy on Amazon Age: 9+ 100 Things To Know About Numbers by Federico Mariani Buy on Amazon Age: 10+ We've Got Your Number by Mukul Patel Buy on Amazon Age: 9+ Archimedes: The Man Who Invented The Death Ray Science by Shoo Rayner Buy on Amazon Age: 9+ Pythagoras and the Ratios: A Math Adventure by Julie Ellis Buy on Amazon Age: 10+ Sir Cumference Book Series by Cindy Neushwander Buy on Amazon Age: 7+ Nothing Stopped Sophie by Cheryl Bardoe Buy on Amazon Age: 7+ Solving for M by Jennifer Swender Buy on Amazon Age: 7+ Ada Lovelace Cracks the Code by Rebel Girls Buy on Amazon Age: 10+ Massively Epic Engineering Disasters by Sean Connolly Buy on Amazon Age: 8+ The Math Inspectors by Daniel Kenney Buy on Amazon Age: 8+ Who was Seies by Roberta Edwards, Joyce Milton Buy on Amazon Age: 10+ My First Book of Quantum Physics by Kaid-Sala Ferrón Sheddad Buy on Amazon Age: 8+ What Is Climate Change? by Gail Herman Buy on Amazon Age: 9+ Notable Notebooks by Jessica Fries-Gaither Buy on Amazon Age: 12+ Optical Illusions by Jonathan Stephen Harris Buy on Amazon Age: 12+ Fantastic Flexagons by Nick Robinson Buy on Amazon Age: 8+ Maryam Mirzakhani by M. M. Eboch Buy on Amazon We are a participant in the Amazon Services LLC Associates Program, an affiliate advertising program designed to provide a means for us to earn fees by linking to Amazon.com and affiliated sites. ​ Çocuklar için önde gelen iki matematik kitabı ödülü vardır; ​ Birincisi MATHICAL. Bu ödül, her yaştan çocuğa çevrelerindeki dünyada matematiği görme konusunda ilham veren kurgu ve kurgu olmayan kitaplara verilen yıllık bir ödüldür. Bir diğeri Royal Society Insight Yatırım Bilim Kitabı Ödülü. ​ Royal Society, 28 Kasım 1660'ta İngiltere'nin Ulusal Bilimler Akademisi olarak "Nullius in Verba", Latince'de " Kimsenin sözüne güvenmeyin mottosuyla kuruldu. Bilimi uzman olmayanlara ve gençlere aktaran en iyi kitaplara her yıl iki ödül veriyorlar. Royal Society'nin web sitesine göz atarak hem çocuklar hem de kendiniz için öneriler alabilirsiniz. Hatta geçmiş yıllara ait kısa listeye giren kitapları bile görebilirsiniz. ​ Royal Society Insight Yatırım Bilim Kitabı Ödülü. ve Genç Halk Kitap Ödülü

Displays Math Boards Math Posters Math Class Floor Prints Math Cabinet Math Park OKULLARDA MİNİ MATEMATİK MÜZELERİ Matematik ve Bilim Müzelerinde gördüğümüz sergiler, bize okullarda sınıfları ve koridorları daha ilgi çekici yapabilmek için fikir verebilir. Özellikle öğrencilerle birlikte yapılan matematik projelerinin ürünlerinin sergilenmesi, hem okula ve matematiğe karşı sahiplenme duygusunu arttırır hem de dört boyutlu küp gibi ilgi çekici ve farklı matematik konuları ile öğrencilerin ilgisini ve motivasyonunu matematiğe yönlendirir. Net of a 4D Cube Tesserract net: What do Dali and Loki have in common? Leonarda Da Vinci : A True STEAM Genius Da Vinci Wall and a table full of models of his inventions and tools that students can use to build the Self-Supporting Bridge Fractional Hopscotch Popular Playground Game teaches equivalent fractions Cylindirical Mirror and Anamorphic Art Students draw distorted images on the giant polar coordinate in front of the mirror so that they can see the true reflection on the mirror. Caesar cipher Students use the cipher to send messages to each other and decrypt the one on the wall. Cafe Wall Illusion Are the lines horizontal or sloped? School of Athens Students learn about great mathematicians and philosophers and the connection between these two branches. Mathematical Prizes There is no Nobel for Maths but Abel Prize and Fields Medals. Students learn about them as well as the Millenium Problems. Women in Science Exhibition Portraits of women who work in STEM fields. Interactive Pascal Triangle Wall Two colored numbers allow students to create many different patterns on Pascal Triangle Floor Puzzles and Problems the huge floor prints allow students to walk or jump to solve the mazes and puzzles.

'MATEMATİK SOKAKTA' AKTİVİTELERİ Matematik Sokakta aktiviteleri, tüm çalışmalarımızın en çok inandığımız ve en etkili bölümlerinden biridir. ​ Yerlere serilen büyük bulmacalar labirentler, ya da Köningsberg Köprüsü gibi ünlü Matematik soruları, duvarlardaki pascal üçgeni ve Sezar ın Şifre Döngüsü gibi interaktif oyunlar ve silindirik yüzeye sahip aynalar ile tüm okulun ilgisini çekip, çocukların teneffüs zamanlarında da matematikle ilgili bir şeyler yapmasını, düşünmesini, araştırmasını paylaşmasını ve birbirleriyle konuşmalarını sağlıyoruz.

Math fan Content Lessons Tasks Math Club Projects Math @ Home Math Magic Games & Puzzles Math & Art Fractals: The Inter-dimensional Journey What if I tell you the Romanesco Broccoli is coming from another dimension? If you tried to eat it before, you would probably believe me right away. But we are here to explore some other properties rather than their exceptional taste!. It has a form of natural approximation of a 'fractal'. Each conic section is composed of a series of smaller cones, all arranged in a spiral. Although its self-similar pattern continues at smaller levels, the Romanesco Broccoli is only an approximate fractal since the pattern eventually ends when the size becomes very very small. But in fractal geometry, we can repeat a particular pattern or a rule infinitely many times to create smaller and smaller copies of themselves. And apparently, natural selection prefers fractal-form structures so that we can see them everywhere in nature. ​ But why are fractals spooky? In geometry, we know that a line segment has "1" dimension. When we double its scale, its length doubles itself. ​ A square has "2" dimensions. It has a length and a width, so it covers a surface, and when we double its scale, we see four of the initial square. ​ ​ A cube has "3" dimensions. It has a length, width, and height, so it has a volume, and when we double its scale, we see eight of the initial cube. ​ So all the dimensions we know (or are aware of) are integers. Can something have a dimension somewhere in 1and 2, or between 2 and 3? Can a shape have a 1.5 dimension? ​ Spooky fractals are here to answer these questions. Let's see what happens if we use the same logic to find their dimensions. Sierpinski Triangle Sierpinski Carpet Menger Sponge So fractals do have non-integer dimensions. That is really scary for the Flatland community. There are more surprising facts about their inter-dimensional journey. Let's start with a line to create the Peano Curve or the Hilbert Curve. Since they cover an entire plane, they are 2 dimensional. Amazing right? Peano Curve Hilbert C urve ​ Check out the Wikipedia page about the Hausdorff dimensions of fractals. ​ Fractal Geometry is a great place where you can find many things to surprise you. You may want to check out a whole unit of tasks, activities and lesson plans to explore more about fractals at the Tasks page of Polypad. TURKCE GOOGLE SLIDES POLYPAD LESSON LIBRARY LESSON LINK There are amazing videos about fractals. Here is a playlist to have a general ideas as well as the specifics of the Fractal Geometry. All Videos Videoyu Oynat Videoyu Oynat 06:28 Pi me a River - Numberphile How the length (and sinuosity) of rivers relates to Pi - featuring Dr James Grime. More links & stuff in full description below ↓↓↓ More on Pi from Numberphile: http://bit.ly/PiNumberphile The paper in Science (abstract): http://bit.ly/1m1j79B James Grime: http://singingbanana.com Support us on Patreon: http://www.patreon.com/numberphile NUMBERPHILE Website: http://www.numberphile.com/ Numberphile on Facebook: http://www.facebook.com/numberphile Numberphile tweets: https://twitter.com/numberphile Subscribe: http://bit.ly/Numberphile_Sub Numberphile is supported by the Mathematical Sciences Research Institute (MSRI): http://bit.ly/MSRINumberphile Videos by Brady Haran Brady's videos subreddit: http://www.reddit.com/r/BradyHaran/ Brady's latest videos across all channels: http://www.bradyharanblog.com/ Sign up for (occasional) emails: http://eepurl.com/YdjL9 Numberphile T-Shirts: https://teespring.com/stores/numberphile Other merchandise: https://store.dftba.com/collections/numberphile Videoyu Oynat Videoyu Oynat 05:48 Calculating Pi with Darts Subscribe to Veritasium http://youtube.com/veritasium Instagram: http://instagram.com/thephysicsgirl Physics Girl: http://physicsgirl.org/ Facebook: http://facebook.com/thephysicsgirl Twitter: http://twitter.com/thephysicsgirl Help us translate our videos! http://www.youtube.com/timedtext_cs_panel?c=UC7DdEm33SyaTDtWYGO2CwdA&tab=2 Pi can be calculated using a random sample of darts thrown at a square and circle target. The problem with this method lies in attempting to throw "randomly." We explored different ways to overcome our errors. A million thanks to Derek Muller of Veritasium for his help with this video. http://youtube.com/veritasium. Also a huge thank you to Dan, Virginia, Lara and Cyrus for providing a yard. Videoyu Oynat Videoyu Oynat 07:56 Pi and the Mandelbrot Set - Numberphile This video features Dr Holly Krieger. More videos with Holly Krieger: http://bit.ly/HollyKrieger More links & stuff in full description below ↓↓↓ Extra footage from this interview: https://youtu.be/r8Ksuc7T-VQ Thanks to Audible --- http://www.audible.com/numberphile Since this was filmed, Holly has become a mathematics Lecturer at the University of Cambridge and the Corfield Fellow at Murray Edwards College. Support us on Patreon: http://www.patreon.com/numberphile NUMBERPHILE Website: http://www.numberphile.com/ Numberphile on Facebook: http://www.facebook.com/numberphile Numberphile tweets: https://twitter.com/numberphile Subscribe: http://bit.ly/Numberphile_Sub Numberphile is supported by the Mathematical Sciences Research Institute (MSRI): http://bit.ly/MSRINumberphile Videos by Brady Haran Brady's videos subreddit: http://www.reddit.com/r/BradyHaran/ Brady's latest videos across all channels: http://www.bradyharanblog.com/ Sign up for (occasional) emails: http://eepurl.com/YdjL9 Numberphile T-Shirts: https://teespring.com/stores/numberphile Other merchandise: https://store.dftba.com/collections/numberphile Videoyu Oynat Videoyu Oynat 15:51 But why is a sphere's surface area four times its shadow? The formula is no mere coincidence. Help fund future projects: https://www.patreon.com/3blue1brown An equally valuable form of support is to simply share some of the videos. Special thanks to these supporters: http://3b1b.co/sphere-thanks Discussion on Reddit: https://www.reddit.com/r/3Blue1Brown/comments/a2gqo0/but_why_is_a_spheres_surface_area_four_times_its/ The first proof goes back to Greek times, due to Archimedes, who was charmed by the fact that a sphere has 2/3 the volume of a cylinder encompassing it, and 2/3 the surface area as well (if you consider the caps). Check out this video for another beautiful animation of that first proof: https://youtu.be/KZJw0AYn6_k Calculus series: http://3b1b.co/calculus ------------------ These animations are largely made using manim, a scrappy open-source python library: https://github.com/3b1b/manim If you want to check it out, I feel compelled to warn you that it's not the most well-documented tool, and it has many other quirks you might expect in a library someone wrote with only their own use in mind. Music by Vincent Rubinetti. Download the music on Bandcamp: https://vincerubinetti.bandcamp.com/album/the-music-of-3blue1brown Stream the music on Spotify: https://open.spotify.com/album/1dVyjwS8FBqXhRunaG5W5u If you want to contribute translated subtitles or to help review those that have already been made by others and need approval, you can click the gear icon in the video and go to subtitles/cc, then "add subtitles/cc". I really appreciate those who do this, as it helps make the lessons accessible to more people. ------------------ 3blue1brown is a channel about animating math, in all senses of the word animate. And you know the drill with YouTube, if you want to stay posted on new videos, subscribe: http://3b1b.co/subscribe Various social media stuffs: Website: https://www.3blue1brown.com Twitter: https://twitter.com/3blue1brown Reddit: https://www.reddit.com/r/3blue1brown Instagram: https://www.instagram.com/3blue1brown_animations/ Patreon: https://patreon.com/3blue1brown Facebook: https://www.facebook.com/3blue1brown 0:00 - High-level idea 2:23 - The details 9:12 - Limit to a smooth surface 11:20 - The second proof 15:15 - A more general shadow fact. Videoyu Oynat Videoyu Oynat 23:20 Pi is IRRATIONAL: animation of a gorgeous proof NEW (Christmas 2019). Two ways to support Mathologer Mathologer Patreon: https://www.patreon.com/mathologer Mathologer PayPal: paypal.me/mathologer (see the Patreon page for details) This video is my best shot at animating and explaining my favourite proof that pi is irrational. It is due to the Swiss mathematician Johann Lambert who published it over 250 years ago. The original write-up by Lambert is 58 pages long and definitely not for the faint of heart (http://www.kuttaka.org/~JHL/L1768b.pdf). On the other hand, among all the proofs of the irrationality of pi, Lambert's proof is probably the most "natural" one, the one that's easiest to motivate and explain, and one that's ideally suited for the sort of animations that I do. Anyway it's been an absolute killer to put this video together and overall this is probably the most ambitious topic I've tackled so far. I really hope that a lot of you will get something out of it. If you do please let me know :) Also, as usual, please consider contributing subtitles in your native language (English and Russian are under control, but everything else goes). One of the best short versions of Lambert's proof is contained in the book Autour du nombre pi by Jean-Pierre Lafon and Pierre Eymard. In particular, in it the authors calculate an explicit formula for the n-th partial fraction of Lambert's tan x formula; here is a scan with some highlighting by me: http://www.qedcat.com/misc/chopped.png Have a close look and you'll see that as n goes to infinity all the highlighted terms approach 1. What's left are the Maclaurin series for sin x on top and that for cos x at the bottom and this then goes a long way towards showing that those partial fractions really tend to tan x. There is a good summary of other proofs for the irrationality of pi on this wiki page: https://en.wikipedia.org/wiki/Proof_that_π_is_irrational Today's main t-shirt I got from from Zazzle: https://www.zazzle.com.au/25_dec_31_oct_t_shirt-235809979886007646 (there are lots of places that sell "HO cubed" t-shirts) lf you liked this video maybe also consider checking out some of my other videos on irrational and transcendental numbers and on continued fractions and other infinite expressions. The video on continued fractions that I refer to in this video is my video on the most irrational number: https://youtu.be/CaasbfdJdJg Special thanks to my friend Marty Ross for lots of feedback on the slideshow and some good-humoured heckling while we were recording the video. Thank you also to Danil Dimitriev for his ongoing Russian support of this channel. Merry Christmas! Videoyu Oynat Videoyu Oynat 17:17 Ramanujan's infinite root and its crazy cousins In this video I'll talk about Ramanujan's infinite roots problem, give the solution to my infinite continued fraction puzzle from a couple of week's ago, and let you in on the tricks of the trade when it comes to making sense of all those crazy infinite expressions. Featuring guest appearances by Vihart's infinite Wau fraction, the golden ratio and the Mandelbrot set. Here is a link to a screenshot of Ramanujan’s original note about his infinite nested radical puzzle: http://www.qedcat.com/misc/ram_incomplete.jpg Check out the following videos referred to in this video: https://youtu.be/jcKRGpMiVTw Mathologer video on Ramanujan and 1+2+3+...=-1/12. This one also features an extended discussion of assigning values to infinite series in the standard and a couple of non-standard ways https://youtu.be/CaasbfdJdJg Mathologer video on infinite fractions and the most irrational of all irrational numbers. https://youtu.be/9gk_8mQuerg Mathologer video on the Mandelbrot set. The second part of this one is all about a supernice way of visualising the infinite expression at the heart of this superstar. https://youtu.be/GFLkou8NvJo Vi Hart's video on the mysterious number Wau, a must-see :) Enjoy :) Videoyu Oynat Videoyu Oynat 19:04 Why is pi here? And why is it squared? A geometric answer to the Basel problem A most beautiful proof of the Basel problem, using light. Help fund future projects: https://www.patreon.com/3blue1brown An equally valuable form of support is to simply share some of the videos. Special thanks to these supporters: http://3b1b.co/basel-thanks This video was sponsored by Brilliant: https://brilliant.org/3b1b Brilliant's principles list that I referenced: https://brilliant.org/principles/ Get early access and more through Patreon: https://www.patreon.com/3blue1brown The content here was based on a paper by Johan Wästlund http://www.math.chalmers.se/~wastlund/Cosmic.pdf Check out Mathologer's video on the many cousins of the Pythagorean theorem: https://youtu.be/p-0SOWbzUYI On the topic of Mathologer, he also has a nice video about the Basel problem: https://youtu.be/yPl64xi_ZZA A simple Geogebra to play around with the Inverse Pythagorean Theorem argument shown here. https://ggbm.at/yPExUf7b Some of you may be concerned about the final step here where we said the circle approaches a line. What about all the lighthouses on the far end? Well, a more careful calculation will show that the contributions from those lights become more negligible. In fact, the contributions from almost all lights become negligible. For the ambitious among you, see this paper for full details. If you want to contribute translated subtitles or to help review those that have already been made by others and need approval, you can click the gear icon in the video and go to subtitles/cc, then "add subtitles/cc". I really appreciate those who do this, as it helps make the lessons accessible to more people. Music by Vincent Rubinetti: https://vincerubinetti.bandcamp.com/album/the-music-of-3blue1brown ------------------ 3blue1brown is a channel about animating math, in all senses of the word animate. And you know the drill with YouTube, if you want to stay posted on new videos, subscribe, and click the bell to receive notifications (if you're into that). If you are new to this channel and want to see more, a good place to start is this playlist: http://3b1b.co/recommended Various social media stuffs: Website: https://www.3blue1brown.com Twitter: https://twitter.com/3Blue1Brown Patreon: https://patreon.com/3blue1brown Facebook: https://www.facebook.com/3blue1brown Reddit: https://www.reddit.com/r/3Blue1Brown Videoyu Oynat Videoyu Oynat 15:16 Why do colliding blocks compute pi? Even prettier solution: https://youtu.be/brU5yLm9DZM Help fund future projects: https://www.patreon.com/3blue1brown An equally valuable form of support is to simply share some of the videos. Special thanks to these supporters: http://3b1b.co/clacks-thanks Home page: https://www.3blue1brown.com Many of you shared solutions, attempts, and simulations with me this last week. I loved it! You all are the best. Here are just two of my favorites. By a channel STEM cell: https://youtu.be/ils7GZqp_iE By Doga Kurkcuoglu: http://bilimneguzellan.net/bouncing-cubes-and-%CF%80-3blue1brown/ And here's a lovely interactive built by GitHub user prajwalsouza after watching this video: https://prajwalsouza.github.io/Experiments/Colliding-Blocks.html NY Times blog post about this problem: https://wordplay.blogs.nytimes.com/2014/03/10/pi/ The original paper by Gregory Galperin: https://www.maths.tcd.ie/~lebed/Galperin.%20Playing%20pool%20with%20pi.pdf For anyone curious about if the tan(x) ≈ x approximation, being off by only a cubic error term, is actually close enough not to affect the final count, take a look at sections 9 and 10 of Galperin's paper. In short, it could break if there were some point where among the first 2N digits of pi, the last N of them were all 9's. This seems exceedingly unlikely, but it quite hard to disprove. Although I found the approach shown in this video independently, after the fact I found that Gary Antonick, who wrote the Numberplay blog referenced above, was the first to solve it this way. In some ways, I think this is the most natural approach one might take given the problem statement, as corroborated by the fact that many solutions people sent my way in this last week had this flavor. The Galperin solution you will see in the next video, though, involves a wonderfully creative perspective. If you want to contribute translated subtitles or to help review those that have already been made by others and need approval, you can click the gear icon in the video and go to subtitles/cc, then "add subtitles/cc". I really appreciate those who do this, as it helps make the lessons accessible to more people. Music by Vincent Rubinetti. Download the music on Bandcamp: https://vincerubinetti.bandcamp.com/album/the-music-of-3blue1brown Stream the music on Spotify: https://open.spotify.com/album/1dVyjwS8FBqXhRunaG5W5u ------------------ 3blue1brown is a channel about animating math, in all senses of the word animate. And you know the drill with YouTube, if you want to stay posted on new videos, subscribe: http://3b1b.co/subscribe Various social media stuffs: Website: https://www.3blue1brown.com Twitter: https://twitter.com/3blue1brown Reddit: https://www.reddit.com/r/3blue1brown Instagram: https://www.instagram.com/3blue1brown_animations/ Patreon: https://patreon.com/3blue1brown Facebook: https://www.facebook.com/3blue1brown

Math Fan Content Lessons Tasks Math Club Projects Math @ Home Math Magic Games & Puzzles Math & Art < < MATH & ART Tessellation Tessellation is the science and art of covering an infinite plane with shapes without any gaps or overlaps. ​ ​ The origin of tessellation is dated back to 4,000 years BCE, when Sumerians used clay tiles for the walls of their homes and temples. From there, tessellation became a part of the culture of many civilizations, from Egyptians to Greeks, from Byzantines to Chinese. Since there are endless possibilities every culture came up with its own tiling style. At this point, the classification of tesselations became needed for mathematicians and artists to explore more. Types of Tessellations There are several types of tessellations. the most well-known ones are regular tessellations which made up of only one regular polygon. If you try regular polygons, you ll see that only equilateral triangles, squares, and regular hexagons can create regular tessellations. ​ Click here for the lesson plan of Regular Tessellations. ​ If one is allowed to use more than one type of regular polygons to create a tiling, then it is called semi-regular tessellation. ​ Click here for the lesson plan of Semi - Regular Tessellation s. ​ The good news is, we do not need to use regular polygons all the time. We can use any polygon, any shape, or any figure like the famous artist and mathematician Escher to create Irregular tessellations ​ Among the irregular polygons, we know that all triangle and quadrilateral types can tessellate. Among the irregular pentagons, it is proven that only 15 of them can tesselate. You can use Polypad to have a closer look to these 15 irregular pentagons and create tessellations with them. ​ If you use only congruent shapes to make a tessellation, then it is called Monohedral Tessellation no matter the shape is. All regular tessellations are also monohedral. It may be better to show a counter-example here to explain the monohedral tessellations. ​ All the tessellations mentioned up to this point are Periodic tessellations . They consist of one pattern that is repeated again and again. Whatever direction you go, they will look the same everywhere. ​ In the 1970s, the British mathematician and physicist Roger Penrose discovered non-periodic tessellations. The pattern of sh apes still goes infinitely in all directions, but the design never looks exactly the same. The most famous pair of such tiles are the dart and the kite. ​ Click here for the lesson plan of non-periodic Tessellations. ​ World Tessellation Day Except where otherwise noted, graphics and photos copyright ©2016 Emily Grosvenor . All rights reserved. Tessellation Activities & Puzzles The concept of tessellation created many tiling puzzles and tangram activities. Since all polyominoes up to 7 can tesselate, Tetris became one of the most popular virtual games. ​ Spidron kite squares Sphinx Hexadecagons dodecan dissection Golden rectangle tessellation spidron tilings FRACTALS KOLAM PENROSE Reptiles tessellation Single Cuts Square Puzzle Isometric Puzzle Hexagon Puzzle Geomagic Rhombuses Pentomino Pairs Maurits C. Escher (1898-1972) WEBSITE mcescher.com , is the official website published by the M.C. Escher Foundation and The M.C. Escher Company. M.C. Escher: Journey to Infinity M.C. Escher: Journey to infinity is a 2019 movie that looks at Escher’s legacy written and directed by Robin Lutz. ESCHER MUSEUM Escher Museum is at The Hague, Netherlands. Nearly all his prints are exhibited. Drawing Hands, Waterfall, Ascending and Descending are just a few examples you can see there. The Magic Mirror of M.C. Escher This updated and redesigned edition of this book is a complete with biographical data, 250 illustrations, and a thorough breaking-down of each mathematical problem―offers answers to these and many other lingering mysteries, and is an authentic source text of the first order. Listen Escher from R. Penrose This video is a part of Art Documentaries, episode 18/18 . Penrose travels through Escher's greatest masterpieces - marvelling at his intuitive brilliance and the penetrating light it still sheds on complex mathematical concepts. CREATE YOUR OWN ESCHER ART There are several ways of creating Escher-like tessellations. One way sure is to use grid papers and applying transformations on already tessellating shapes. An Easier way is creating templates out of paper, wood, buy or 3D print them. Tessellation Flextangles - Kaliedocycle A Kaliedocycle is a three-dimensional ring made from a chain of solid figures enclosed or bonded by four triangles. Here, you can find a template of Mobius Kaleidocycle for free by UFMB In this book, you can find several Escher kaleidocycles which are adaptations of Escher's 2D images of fish, angels, flowers, people, etc., transformed into uniform, interlocking, three-dimensional objects whose patterns wrap endlessly. Here are some templates created by iOrnament apps ​ Fish Tessellation Cube Fish Tessellation Tetrahedron Fish Tessellation Octahedron Fish Tessellation Dodecahedron Fish Tessellation Icosahedron Fish Tessellation Cube Kaliedocycle 17 Symmetry Groups Tessellations can be made with different combinations of transformations. There are17 distinct ways that a pattern can be used to tile surface. ​ These are also called wallpaper groups. If you want to try, use the interactive at Mathigon's Transformations and Symmetry applet or the iornament app . ​ Tessellations In Non-Euclidean Geometries Coming Soon It is possible to tessellate in the hyperbolic geometry. While in a Euclidean plane there are only three regular tessellations, in a hyperbolical plane there are endless regular tessellations. Best Buys for Tessellation Tessellation Flipbook The Magic of M.C. Escher Tessellating Animal Templates M. C. Escher Kaleidocycles

Yıllardır, geleneksel olarak 14 Mart haftasında düzenlediğimiz Matematik Haftası tüm öğrenci ve öğretmenleri bir araya getiren, birbirlerinden ilham almalarını sağlayan, matematiği ders olmaktan çıkarıp heyecan verici yönleriyle çocuklara tanıtan ve onların konulara ilgi ve motivasyonlarını arttıran bir şenliktir. Açılış töreni ile başlayan hafta bir çok yarışmaya, aktiviteye, ve atölyeye ev sahipliği yapar. Her sene başka bir tema etrafında şekillenen festivallerde açılış töreninde matematikten ilham alan şarkı ve danslar, showlar ve açılış konuşması yer alırken, tüm hafta ise öğrenciler tarafından yürütülen aktiviteler, zekâ oyunları, kitap fuarı, pi-günü yemekleri, disiplinler arası aktiviteler ile zenginleşir. MATEMATİK FESTİVALİ DATE AND VENUE The most convinient date for an event is always the one which does not have a conflict with the other ongoing events of your school or community.Especially if you are planning to usethe cafeteria, MPR or the PE rooms. But if you have a freedom to choose, the best option can be having a parallel event to the International Day of Math which is the Pi Day: 14th of March. You may also want to check the math and science calender for the other important dates like Ada Lovelace birthday or international women in math day and etc.. ULUSLARARASI DÜNYA MATEMATİK GÜNÜ Unesco' nun 14 Mart'ı resmi Matematik günü ilan etmesi ile şenliklerin daha da coşkulu geçeceğinden eminim. Detaylı Bilgi için lütfen tıklayın. ​ Uluslararası resmi lansman, 14 Mart 2020 tarihinin cumartesi gününe denk gelmesi nedeniyle 13 Mart Cuma 2020 tarihinde yapılacak. Bu kapsamda Paris'te UNESCO Genel Merkezinde ve Nairobi'de 10-13 Mart 2020'deki Gelecek Einstein Forumu 2020 (NEF2020) içerisinde uluslararası iki etkinlik düzenlenecek. ​ IMU adına IDM projesini başlatan Montreal Üniversitesi'nden Prof. Christiane Rousseau, şunları söyledi: ​ "Matematik, insanlık tarihi boyunca var oldu. Ama bugün, matematik o kadar ileri bir araç haline geldi ki çoğu insan yaşamımızın her yerinde olduğunu fark etmiyor bile. Halbuki 'Her Yer Matematik' ve bu da ilk IDM senesinin teması." (AA) ​ STATIONS There are many interesting activities you can plan with the students. Here are some ideas; String Art Show More Curve Stitching Show More Pascal Triangle Show More Spiral of Theodorus Show More Street Math Show More Math Magic Show More Fractals Show More Caesar cipher Show More Vedic Loops Show More Anamorphic art Show More Spirographs Show More Net of 4D Cube Show More Pi Related Activities Show More Tessellation Show More Randomized Art Show More 3D Printed Mat Show More You can check the Math & Art and Math Club pages for more activities PUZZLES AND GAMES Students enjoy most when they challenge each other on puzzles and games. There are endless possibilities to create different puzzles. You can create paper and pencil puzzles as well as digital ones. Here are some ideas. Please check the online games and puzzle s page for more ideas. Paper Puzzles Pillow Puzzle Catch Me If You Can! Bingo Missing Information Puzzle Single Cuts Square Puzzle Geomagic Squares Cats and Rats Square puzzle Sticky Numbers Pentomino Pairs If you have an extra budget, you can purchase some really good games and puzzles. Please check the games page for more. Buy on Amazon Buy on Amazon Buy on Amazon Buy on Amazon Buy on Amazon Buy on Amazon Buy on Amazon Buy on Amazon Buy on Amazon Buy on Amazon Buy on Amazon RANDOM ACT OF MATHS by mathsedideas Mathedideas is a great resource for all math teachers. Random Acts of Maths (RAMs) are Mathematical problems, puzzles, teasers, provocations, jokes, quotes, etc., to be offered or given to students (outside of lessons), their families, school visitors, et al., for no other reason than to make people mathier. PUZZLES by M+A+T+H=Love Another great discovery for all math teachers is definitely M+A+T+H=Love blog Sarah Carter the creator of the blog has so many paper and pencil puzzles you can use at different stations of the mathfest. EXHIBITIONS You may create different exhibitions according to the theme you choose. Exhibition Project Ideas: Women Mathematicians, Tessellations, Fractals, 3D Solids, Escher's mathematical wonders, origami, Pi-words Wall Mathematical Timeline... When students see their work being displayed as a part of the exhibition, their sense of belonging improves, and they take ownership of the whole event. Spaghetti Bridges Women in math Exhibition string art sample Women in math Wall size cipher structural engineering cjallange Math Posters origami pi wall 3d printed maze puzzles floor mazes Pascal Task Cards pi donuts Escher cylindirical mirror POSTERS, ADS, DECORATIONS, THEME, SONG, MOVIE, GIFT BAGS To announce the upcoming math event, designing competitions for posters, decorations, songs even short clips can motivate students even more for the event. Using Canva is one of the easiest ways of creating such posters. You can use paper puzzles and 3d printed mathematical games or gadgets to create gift bags. 2019 Matematik Haftasını tanıtmak amacıyla hazırlanan video; Koc Okulu , Istanbul Aysun Fendi tarafından hazırlanan Matematik Haftası ön tanıtım videosu

Matematik Dükkanı Oku. İzle. Oyna. Keşfet. Yarat Books Young Readers Mathflix P+ Games Toys and Gadgets 3D Models MATHFLIX Prime +

Displays Math Boards Math Posters Math Class Floor Prints Math Cabinet Math Park FLOOR PRINTS More details and designs are coming soon... 7 BRIDGES OF KONIGSBERG Can you find a route in the city of Königsberg that would cross each of these bridges only once? ​ Image is taken from Encyclopædia Britannica, Inc. and used for educational purposes only. ​ ​ ARCHIMEDES METHOD OF PI-CALCULATION ​ How did Archimedes calculate pi years and years ago? Click here for the floor design CYLINDIRICAL MIRROR If you have a cylindrical column at your school, cover it with mirror-like paper, then start to work on your anamorphic designs. Click here for the floor size circular grid SORTING NETWORK ALGORITM CHART A Computer Science Unplugged Activity Click here for the print NO LEFT TURN MAZE Visit Math Week Ireland 2017 Page for the print and the instructions of the No Left Turn Maze. Click here for the print. FRACTION HOPSTOTCH Popular Playground Game teaches equivalent fractions. Click here for the template of equivalent fractions hopscotch game ARROW MAZE Visit Math Week Ireland 2017 Page for the print and the instructions of the Arrow Maze NUMBER MAZE Visit Math Week Ireland 2017 Page for the print and the instructions of the Number Maze. Click here for the print.