Estos
Mensajes los Paso a mi Facebook y a los lectores parece gustarles - Pero ¿
Maradona ? Bueno, Bueno.-Él como futbolista latinoamericano me
parece un sobresaliente deportista y algo más, pero enmarcarlo dentro de un
contexto incluyente en un marco de proporciones cósmicas pues como que, no.-
por ello los post donde aparece no los envío al Facebook
The height of the Statue of Liberty is 111′-1″ from bottom of foot to top of head. The 7 rays on the crown and the 11 points of the base star echo the proportions of the Great Pyramid’s 7:11 height to base proportion. The superb book Talisman by Graham Hancock and Robert Bauval convincingly shows this goddess is actually the Egyptian Isis.
Image courtesy Elcobbola under the Creative Commons Attribution-Share Alike 3.0 Unported license.
hace 3 días - Manipularon la historia a través de las fuentes de los textos en su lenguaje inventado llamado Latín, peeeeero no pudieron cambiar el ... Jose Alfonso Hernando ... la famosa batalla de Troya, y HASTA AHÍ NOS VAMOS PARA VER QUE ... “Las matemáticas nos hacen más libres y menos manipulables”.
hace 3 días - Principal / Valdeande Magico / ¡¡¡ Visitamos TROYES, donde fue la Guerra de Troya !!! ¡¡¡ Visitamos TROYES, donde fue la Guerra de Troya !!!
Troyes is the former capital of Champagne and is a perfect short trip visit from Paris. At just an hour and a half by train it can be a day trip but a couple of days and an overnight stay would be better because there’s so much to see and do in this lovely, vibrant city.
A town that is shaped like a Champagne cork in Champagne?
Troyes is an ancient city, once a Roman town with a direct road from Milan and onwards to Boulogne-sur-Mer on the Opal Coast in the north of France – the route for the invasion of Britain. Later the rich and powerful Counts of Champagne built a palace in Troyes and it was a prosperous place that attracted merchants from all over Europe. The counts fortified their town and though at that time Champagne didn’t even exist, the walls took the form of a Champagne cork.
Following a huge fire in 1524 that destroyed many of the ancient buildings that were constructed from wood, new brick buildings were erected and many of them remain to this day. Indeed the inhabitants of Troyes lived in these buildings pretty much as they had been for hundreds of years right up until the 1950s. It was a decade when the town council went on a bit of a renovation rampage to improve conditions since many of the old buildings had no bathrooms and poor hygiene conditions.
Fortunately they didn’t destroy too much and visiting Troyes is like stepping back in time. Every street seems to have its quota of half-timbered houses and there are cobbled streets and tiny alleyways that create a mesmerising maze in the centre of the old town of Troyes. In the little ruelle des Chats (Cats Alley) you’ll see it is so narrow that the houses lean in and touch via a central gutter at the top and cats could cross from houses on both sides of the roads. At the side of the office of the Mutuelle Societe at 111 rue Emile Zola you can enter a gate and at the back you’ll discover a stunning renaissance house looking exactly as it did when it was built. At the Cour du Mortier d’or, the ancient timber frames still bear the workman’s trademarks.
Everywhere you go here you’ll discover traces of history from hundreds of years ago, quaint, quirky and irresistibly charming…
Golden ratios appears in many geometric constructions, including triangles and squares in circles, the pentagon and also in solids such as the dodecahedron.
Ancient Metrology - Numbers Don't Lie - World Mysteries Blog
A. Sokolowski There is an underlying order in Cosmos. Our ancestors discovered it in ancient times and expressed it in their writings and monuments. This article is an invitation to all our visitor to explore and expand this subject. Please share facts that should be mentioned here (via comments and/or e-mail) – if you are […]
Chris and Penny at Regina University's Math Central (Canada) show how we can use any circle to construct on it a hexagon and an equilateral triangle. Joining three pairs of points then reveals a line and its golden section point as follows:
On any circle (centre O), construct the 6 equally spaced points A, B, C, D, E and F on its circumference without altering your compasses, so they are the same distance apart as the radius of the circle. ABCDEF forms a regular hexagon.
Choose every other point to make an equilateral triangle ACE.
On two of the sides of that triangle (AE and AC), mark their mid-points P and Q by joining the centre O to two of the unused points of the hexagon (F and B).
The line PQ is then extended to meet the circle at point R. Q is the golden section point of the line PR.
Q is a gold point of PR The proof of this is left to you because it is a nice exercise either using coordinate geometry and the equation of the circle and the line PQ to find their point of intersection or else using plane geometry to find the lengths PR and QR.
The diagram on the left has many golden sections and yet contains only equilateral triangles. Can you make your own design based on this principle?
Chris and Penny's page shows how to continue using your compasses to make a pentagon with QR as one side.
Equilateral Triangles and the Golden ratio J F Rigby, Mathematical Gazette vol 72 (1988), pages 27-30.
Tema anterior
Q is a gold point of PR
