Wednesday, 29 May 2013

Euler Piruleta Vs. The Cookie Monster

Have you recovered after the Green Week! I reckon we've had a great time ^_^

Guys, this is Euler Piruleta's last adventure before the summer hiatus... And it's worth 3 positives!

Don't miss the chance to help him to defeat... the Cookie Monster!

Euler has discovered that The Cookie Monster is enriching himself selling neverending chocolate bars... but where's the trick? Our hero needs your help to prevent The Monster to become the owner of the entire world thanks to the money he is earning with this chocolate thing...

1) Try to solver first this classic problem: How is it possible to get the second triangle with the pieces of the first one?

Clue: Steepness......

2) Now try to figure out how it is possible to get this infinite chocolate bar?

The future of the Earth relies on you!

Deadline: June the 11th. Also availiable the printable version.

I'm sure most of you haven't heard of Paloma Faith, but I'm altogether sure you'll like this song ;)
It really deserves 3 minutes of your life!

Paloma Faith - "New York"

And finally, this link leads you to some help to draw statistic graphs in Excel. Useful stuff!!

Tuesday, 21 May 2013


Are you ready for your second "white week"? XD The weather forecast is quite terrible... anyway:

AD01 8,4 BC01 8,6
AD02 8,7 BC02 4,4
AD03 8,8 BC03 8,1
AD04 9,1 BC04 9,1
AD05 8,2 BC05 9,5
AD06 6,5 BC06 6,1
AD07 7,1 BC07 4,2
AD08 7,1 BC08 6,7
AD09 7,5 BC09 9,8
AD10 7,4 BC10 8,1
AD11 4,6 BC11 6,1
AD12 7,3 BC12 5,4
AD13 8,2 BC13 6,2
AD14 9,6 BC14 9,4
AD15 4,7 BC15 9,5
AD16 8,4 BC16 9,4
AD17 3,8 BC17 5,1
AD18 6,3 BC18 6,1
AD19 9,3 BC19 6,2
AD20 7,7 BC20 8
AD21 7,4 BC21 4,7
AD22 7,4 BC22 9,6
AD23 9,5 BC23 5,8
BC24 6

Since this last weekend Spain performed (once again) a terrible song, I've decided to upload here some of the best and worst positions I remember at ESCF in the last 40 years:

Best Positions:
Karina - 3rd place (1971)

Mocedades - 2nd place (1973)

Betty Misiego - 2nd place (1979)

Bravo - 3rd place (1984)

Anabel Conde - 2nd place (1995)

Worst Positions:
Remedios Amaya - Last place (1983)

Lydia feat. Agatha Ruiz de la Prada - Last place (1999)

D'Nash (aka Backspanish boys) - Almost last place (2007)

Sunday, 12 May 2013

Statistics Exercises

These are the links were all the statistics exercises will be updated ;)

Exercises 3ºAD

Exercises 3ºBC

An now, some exciting music to survive this forthcoming week :D

M83 - "Midnight City"

Friday, 10 May 2013

Exam Results

Don't forget to check our latest video on youtube :D

Here you are the results of yesterday's exam... Have a great weekend!

AD01 9,4 BC01 9,7
AD02 8,5 BC02 4,9
AD03 10,1 BC03 8,8
AD04 9,4 BC04 9
AD05 9,1 BC05 9,4
AD06 8,5 BC06 6,9
AD07 7,3 BC07 5
AD08 7,4 BC08 6,2
AD09 6,9 BC09 10,2
AD10 7,3 BC10 9,3
AD11 4,6 BC11 5,3
AD12 8,4 BC12 4,6
AD13 9,1 BC13 4,3
AD14 10,1 BC14 9,2
AD15 8 BC15 9,4
AD16 9,4 BC16 9,2
AD17 5,8 BC17 5,1
AD18 4,9 BC18 5,8
AD19 10,2 BC19 3,1
AD20 9,5 BC20 8,7
AD21 7,2 BC21 5,7
AD22 7,7 BC22 10,1
AD23 9,2 BC23 7,6
BC24 4,3

Monday, 6 May 2013

Sierpinski's Fractal Triangle

How to build your own Sierpinski's Triangle with Cans

Mathematics has always been a subject infamous for being difficult and with less than zero applications to life. That’s why I decided to build with IES Navarro Villoslada’s 3ºESO Bilingual Programme students a figure which would help us to understand one of this year’s most difficult units: progressions.

The challenge was simple: we needed to gather more thatn 1000 soda or beer cans to build the famous Sierpinski’s Triangle and try to relate it with 3º ESO’s mathematical content.


In the 70’s, some objects called fractals were for the first time subjected to study. These objects can be easily identified since they repeat themselves no matter the scale used. They happened to be quite useful to explain natural phenomena and to study geometric characteristics of objects whose patterns were chaotic (for example, fractals can be used to measure the length of Britain’s border coast)

Sierpinski’s Fractal

It is quite common in the math world that different concepts show up in different times and places to make perfectly sense together years after. In our particular case, polish mathematician Waclaw Sierpinski introduced his famous triangle half a century prior to the concept of fractals. The way of getting this triangle is quite straightforward:

1) Start with an equilateral triangle
2) Join the middle points of its three sides and remove the central triangle
3) Repeat this process once again with the three triangles obtained before.  Don't forget to remove the central triangles.
4) Continue the process.

This mathematical object has two amazing properties: it repast itself no matter the scale used and the infinite iteration of the process described above leads to a figure whose surface is zero and whose perimeter is infinite.

Different examples of Fractals

Sierpinski’s Triangle is just one example in a million. For being so historically important or for being just curious, these are some famous fractals:

Menger Sponge
Koch Snowflake
Mandelbrot’s Set
 (fractal vegetable)


Throughout this process, we have need the stuff listed below:

- 1092 soda or beer 66mm-diameter cans
- 12 tubes of glue
- 2 wooden moulds
- 6 paint tins of different colours
- 24 meters of aluminium profile
- Endless hours of labour and patience

The necessity of using a whole classroom for working and gluing brought about the fact that this project had to be done in the afternoons.

Stage 1: Collecting the Cans
Once we were both motivated and with enough will to succeed, an empty cube was place at the high school’s main door so everybody would have the chance to colaborate and bring empty cans. Here is the result of this stage:

More than 1300 cans were collected.

Stage 2: The First Triangles
And we started gluing cans.
Our first goal (and the toughest one) was to glue 121 9-can triangles. For this task, we used 9 tubes of glue, 2 wooden moulds and 2 glue-pistols. Each one of these triangles was built joining 3 blocs of 3 cans each.

Stage 3: The Next Levels
It took ages but after a few weeks we had our 121 9-can triangles prepared. So, the time came to glue them together to get all the triangles needed for our final figure. This time we used 2 tubes of glue. The final outcome of this stage is depicted below:
- 1 triangle of 3 cans
- 1 triangle of 9 cans (built joining 3 3-can triangles together)
- 1 of 27 cans (built joining 3 9-can triangles)
- 1 of 81 cans (built joining 3 27-can triangles)
- 1 of 243 cans (built joining 81-can triangles)
- 1 of 729 cans (built joinint 3 243-can triangles)
These are the 6 triangles required for the final figure

Stage 4: The Colour

To both visualize and enhance the concept of fractal in our Sierpinski’s Triangle, we used 6 different colours to paint the bottoms of the cans. This way, it is not difficult to notice that any triangle includes those of the previous levels.

This process required
  · One tin of pre-paint. 
  ·  Five tins of paint: purple, luminescent blue, real yellow, china red and TK-314 green.
  ·   One spray of fluorescent red.

Stage 4: Getting closer to the end

Once everything was almost ready, we decide to place our sequence of triangles in the front wall of the high school using aluminium profiles glued to the bases of several triangles. This way, the final structure could be drilled to the wall. The problem of the corner was solved dividing the fourth triangle into two halves, as can be seen in the simulation picture:

Stage 5: Drilling
It took us two days and a couple of ladders and one scaffolding, but after those long 4 months our project was finally placed where it belonged.


Sierpinski’s Maths
This figure helps not only to understand the concept of fractal, but to visualize several concepts related to sequences:

·  The number of cans used for every triangle can be obtained using the geometric progression:
Thus, the first triangle has 3 cans, the second one 9, the third 27

·  The length of the base and the height of every triangle can be calculated using the geometric progression and the sequence :
where d = 66mm is the diameter of one can.

Furthermore, to get these expressions we had to deal with radicals¸ Pythagoras Theorem and  the expression to get the height of one triangle in function of its side.

Important information

Prior to the first stage of our project, we needed to know how many cans we had to collect. The formula which gives the sum of several consecutive terms of a geometric progression was very helpful and allowed us to conclude that 1092 cans were needed, since the addition of the first 6 terms of the progression is:

Therefore, we knew beforehand the dimensions of the wall needed to place our Sequence of Sierpinski Triangles!

To my students, who have given me the motivation to 
get involved in "freak" projects like this  ;D

Contact me for more information: