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GIZE, STONEHENGE, CHICHEN ITZA, ETC,ETC: ¿PORQ. "GRAN PIRAMIDE" ESTA DISEÑADA EN FUNCION AL CUBO Q CONTIENE LA TIERRA?
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La razon de la circunferencia y el diametro es obvio que es el numero PI.
22/7=DIA DE MARIA LA MAGDALENA=3.14 =PI
SABIDURIA=SABADO=LETRA S=$
EN EL CIRCULO SE CONFUNDEN EL PRINCIPIO Y EL FIN- HERACLITO
y la Omega, principio y fin, dice el Señor, el que es y que era y que ha de venir, el Todopoderoso.
16. Apocalipsis 1:11 que decía: Yo soy el ALFA y la Omega, el primero y el último. Escribe en un libro lo que ves, y envíalo a las siete iglesias que están en Asia: a Efeso, Esmirna, Pérgamo, Tiatira, Sardis, Filadelfia y Laodicea.
17. Apocalipsis 2:27 y las regirá con vara de hierro, y serán quebradas como vaso de ALFArero; como yo también la he recibido de mi Padre;
18. Apocalipsis 21:6 Y me dijo: Hecho está. Yo soy el ALFA y la Omega, el principio y el fin. Al que tuviere sed, yo le daré gratuitamente de la fuente del agua de la vida.
19. Apocalipsis 22:13 Yo soy el ALFA y la Omega, el principio y el fin, el primero y el último.
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168. Juan 16:21 La mujer cuando da a luz, tiene dolor, porque ha llegado su hora; pero después que ha dado a luz un niño, ya no se acuerda de la angustia, por el gozo de que haya nacido un hombre en el mundo.
24X7=168
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3 Phi and Triangles
3.1 Phi and the Equilateral Triangle
 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 PRThe 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.
  Earlier we saw that the 36°-72°-72° triangle shown here as ABC occurs in both the pentagram and the decagon.Its sides are in the golden ratio (here P is actually Phi) and therefore we have lots of true golden ratios in the pentagram star on the left.But in the diagram of the pentagram-in-a-pentagon on the left, we not only have the tall 36-72-72 triangles, there is a flatter on too. What about its sides and angles?
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3 Phi and Triangles
3.1 Phi and the Equilateral Triangle
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 PRThe 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.
Earlier we saw that the 36°-72°-72° triangle shown here as ABC occurs in both the pentagram and the decagon.Its sides are in the golden ratio (here P is actually Phi) and therefore we have lots of true golden ratios in the pentagram star on the left.
But in the diagram of the pentagram-in-a-pentagon on the left, we not only have the tall 36-72-72 triangles, there is a flatter on too. What about its sides and angles?
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Messaggio 62 di 82 di questo argomento |
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| First Previous 2 to 2 of 2 Next Last |
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3 Phi and Triangles
3.1 Phi and the Equilateral Triangle
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 PRThe 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.
Earlier we saw that the 36°-72°-72° triangle shown here as ABC occurs in both the pentagram and the decagon.Its sides are in the golden ratio (here P is actually Phi) and therefore we have lots of true golden ratios in the pentagram star on the left.
But in the diagram of the pentagram-in-a-pentagon on the left, we not only have the tall 36-72-72 triangles, there is a flatter on too. What about its sides and angles?
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The Number 33
- A normal human spine has 33 vertebrae when the bones that form the coccyx are counted individually
- 33 is, according to the Newton scale, the temperature at which water boils
- The atomic number of arsenic
- The divine name Elohim appears 33 times in the story of creation in the opening chapters of Genesis
- Jesus’s age when he was crucified in 33 A.D.
- Jesus performed 33 recorded miracles
- 33 is not only a numerical representation of “the Star of David,” but also the numerical equivalent of AMEN: 1+13+5+14=33
- the highest degree in the Scottish Rite of Freemasonry.
The Number 81
- The 81 stable Chemical Elements in Nature
- Prime Factors of 81=3x3x3x3.
- 81 is a Square Number 81=9×9
- 81 “generates” all digits of the decimal system:
(10/81)= 0.12345679 012345679 012345679012346 (recrring infinitely)
- The Saros number of the solar eclipse series which began on -322 May 12 and ended on 958 June. The duration of Saros series 81 was 1280.1 years, and it contained 72 solar eclipses. Further, the number of lunar eclipse series which began on -20 February 19 and ended on 1296 April. The duration of Saros series 81 was 1316.2 years, and it contained 74 lunar eclipses.
Also: “Harleston says of Teotihuacan’s builders: ‘When they draw a line, they’re telling you an area. When they draw an area, they’re telling you a volume. When they put volume, they’re telling you time.”
Geodesy and geodetic placement of “sacred sites” of ancient origins has long been affirmatively suspect – especially, the Great Pyramid of Giza. Geodesy involves a fundamental understanding of plane or solid geometry, astronomy relative to latitude and longitude with latitude of more recent vintage since ships-clock (cir. 1540) came into vogue. These geodetic or geometric relationships both on earth and in the heavens are a frequent haunt of pagans and occultists and of novel interest to science – though science with its unfortunate proliferation of skeptic is apt to go off into “metric tangents” and miss out on all the “fun!” “For quite some time researchers have been documenting the astronomical alignments of ancient archaeological and megalithic stone sites all over the world. But discovery of their geodesic alignment has been more recent. Geodesy refers to the theory and practice of surveying to determine the position of specific points on Earth’s surface. It is distinguished from plane surveying in that it deals with areas whose dimensions are so great that the curvature of the Earth must be taken into account. Geometric geodesy involves the creation of a mathematical model of Earth, while physical geodesy studies Earth’s gravity field. The discovery of the precise alignment of Mayan sites along the 90th parallel is significant because it demonstrates that the Maya were aware of Earth’s curvature and knew the advanced formulas used in geodesy.
Note: Carl Munck, archaeocryptographer, introduces an ancient Pyramid Matrix, in which ancient monuments – across the globe – encode their exact positions with respect to latitude and longitude. The science of decoding these monuments is called archaeocryptography. For latitude, ancient monuments were referenced to the same (modern) equator. For longitude, these monuments were referenced to a former Giza, Egypt Prime Meridian – discovered by Munck – that ran from pole to pole across the Great Pyramid.
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