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Franchise of the seven Prince-electors voting for the King of the Romans. Archbishop of Mainz. Archchancellor of Germany.
Archbishop of Cologne. Archchancellor of Italy. Archbishop of Trier. Archchancellor of Burgundy. King of Bohemia.
Arch- Cupbearer. Count Palatine of the Rhine. Arch- Steward. Duke of Saxony-Wittenberg. Margrave of Brandenburg. Arch- Chamberlain. Sure, it's still a bit cobbled together.
The public didn't seem to care but the result were two very charming movies that had the gall to be different, even if horror fans had moved on.
Hammer was hoping to extend their life by coming up with some new series and their collaboration with Shaw Brothers productions was perhaps both ahead of its times while a year or three too late to save the company.
It was a glorious failure that deserves to be seen again now that present day technology can give viewers a better estimation of the movie's intended form.
It is surprisingly entertaining and compulsively watchable. It's still somewhat confusing if you are looking for a discreet, beginning-middle- end story progression.
Just by turning his head slightly to the side and raising an eyebrow Peter Cushing is a treat, nobody can look concerned or impart a sense of dire urgency into an audience like Peter Cushing: It may be an odd movie but it does feature some of his best work at appearing concerned and some of the urgencies that he imparts within viewers are the most dire of his career.
Yeah, he was getting old and tired and probably looked upon the movie as an expense paid trip to China to help him forget the sorrow of his wife's passing.
But by golly he made the movie and if he means anything to you it simply must be seen because it is his last screen turn as one of his classic Gothic horror characters.
Try it again, make sure it's a widescreen version, pop plenty of popcorn, perhaps an adult beverage or two, and put down the lights. Turns out it's not a bad movie after all.
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Official Sites. Company Credits. Technical Specs. Plot Summary. Plot Keywords. However, some have argued that many apparent manifestations of the golden ratio in nature, especially in regard to animal dimensions, are fictitious.
The golden ratio is key to the golden-section search. The golden ratio is an irrational number. Below are two short proofs of irrationality:.
If we call the whole n and the longer part m , then the second statement above becomes. Another short proof—perhaps more commonly known—of the irrationality of the golden ratio makes use of the closure of rational numbers under addition and multiplication.
The golden ratio is also an algebraic number and even an algebraic integer. It has minimal polynomial.
Having degree 2, this polynomial actually has two roots, the other being the golden ratio conjugate. The vertices of a regular icosahedron are those of three mutually orthogonal golden rectangles.
There is no known general algorithm to arrange a given number of nodes evenly on a sphere, for any of several definitions of even distribution see, for example, Thomson problem.
However, a useful approximation results from dividing the sphere into parallel bands of equal surface area and placing one node in each band at longitudes spaced by a golden section of the circle, i.
This method was used to arrange the mirrors of the student-participatory satellite Starshine Application examples you can see in the articles Pentagon with a given side length , Decagon with given circumcircle and Decagon with a given side length.
Both of the above displayed different algorithms produce geometric constructions that determine two aligned line segments where the ratio of the longer one to the shorter one is the golden ratio.
The golden triangle can be characterized as an isosceles triangle ABC with the property that bisecting the angle C produces a new triangle CXB which is a similar triangle to the original.
In a regular pentagon the ratio of a diagonal to a side is the golden ratio, while intersecting diagonals section each other in the golden ratio.
This result is a straightforward consequence of the intersecting chords theorem and can be used to construct a regular pentagon, a construction that attracted the attention of the noted Canadian geometer H.
Coxeter who published it in Odom's name as a diagram in the American Mathematical Monthly accompanied by the single word "Behold! The golden ratio plays an important role in the geometry of pentagrams.
Each intersection of edges sections other edges in the golden ratio. The pentagram includes ten isosceles triangles : five acute and five obtuse isosceles triangles.
The acute triangles are golden triangles. The obtuse isosceles triangles are golden gnomons. The golden ratio properties of a regular pentagon can be confirmed by applying Ptolemy's theorem to the quadrilateral formed by removing one of its vertices.
Consider a triangle with sides of lengths a , b , and c in decreasing order. A golden rhombus is a rhombus whose diagonals are in the golden ratio.
The rhombic triacontahedron is a convex polytope that has a very special property: all of its faces are golden rhombi.
The mathematics of the golden ratio and of the Fibonacci sequence are intimately interconnected. The Fibonacci sequence is:.
A closed-form expression for the Fibonacci sequence involves the golden ratio:. The golden ratio is the limit of the ratios of successive terms of the Fibonacci sequence or any Fibonacci-like sequence , as shown by Kepler : .
For example:. The golden ratio has the simplest expression and slowest convergence as a continued fraction expansion of any irrational number see Alternate forms above.
It is, for that reason, one of the worst cases of Lagrange's approximation theorem and it is an extremal case of the Hurwitz inequality for Diophantine approximations.
This may be why angles close to the golden ratio often show up in phyllotaxis the growth of plants. The multiple and the constant are always adjacent Fibonacci numbers.
The golden ratio appears in the theory of modular functions as well. This gives an iteration that converges to the golden ratio itself,.
These iterations all converge quadratically ; that is, each step roughly doubles the number of correct digits. The golden ratio is therefore relatively easy to compute with arbitrary precision.
The time needed to compute n digits of the golden ratio is proportional to the time needed to divide two n -digit numbers.
An easily programmed alternative using only integer arithmetic is to calculate two large consecutive Fibonacci numbers and divide them.
The ratio of Fibonacci numbers F and F , each over digits, yields over 10, significant digits of the golden ratio. Both Egyptian pyramids and the regular square pyramids that resemble them can be analyzed with respect to the golden ratio and other ratios.
The isosceles triangle that is the face of such a pyramid can be constructed from the two halves of a diagonally split golden rectangle of size semi-base by apothem , joining the medium-length edges to make the apothem.
This Kepler triangle  is the only right triangle proportion with edge lengths in geometric progression ,   just as the 3—4—5 triangle is the only right triangle proportion with edge lengths in arithmetic progression.
The Rhind papyrus has another pyramid problem as well, again with rational slope expressed as run over rise. This triangle has a face angle of Egyptian pyramids very close in proportion to these mathematical pyramids are known.
In the mid-nineteenth century, Friedrich Röber studied various Egyptian pyramids including those of Khafre , Menkaure , and some of the Giza , Saqqara , and Abusir groups.
He did not apply the golden ratio to the Great Pyramid of Giza, but instead agreed with John Shae Perring that its side-to-height ratio is For all the other pyramids he applied measurements related to the Kepler triangle, and claimed that either their whole or half-side lengths are related to their heights by the golden ratio.
In , the pyramidologist John Taylor misinterpreted Herodotus c. Similarly, Howard Vyse reported the great pyramid height Michael Rice  asserts that principal authorities on the history of Egyptian architecture have argued that the Egyptians were well acquainted with the golden ratio and that it is part of the mathematics of the pyramids, citing Giedon For example, Keith Devlin says, "Certainly, the oft repeated assertion that the Parthenon in Athens is based on the golden ratio is not supported by actual measurements.
In fact, the entire story about the Greeks and golden ratio seems to be without foundation. From measurements of 15 temples, 18 monumental tombs, 8 sarcophagi, and 58 grave stelae from the fifth century BC to the second century AD, one researcher concluded that the golden ratio was totally absent from Greek architecture of the classical fifth century BC, and almost absent during the following six centuries.
The Section d'Or 'Golden Section' was a collective of painters , sculptors, poets and critics associated with Cubism and Orphism.
Livio, for example, claims that they did not,  and Marcel Duchamp said as much in an interview.
Piet Mondrian has been said to have used the golden section extensively in his geometrical paintings,  though other experts including critic Yve-Alain Bois have discredited these claims.
From Wikipedia, the free encyclopedia. This article is about the number.Goldene 7 - Rubbellos - Gewinne bis zu € winken (Chance 1 zu ). Ab 18 Jahren. Suchtgefahr. Hilfe unter lostinspike.com Das Rubbellos mit dem Joker. Das Rubbellos Goldene 7 von SACHSENLOTTO mit 10 Gewinnchancen auf einen Höchstgewinn von € (Chance ). Goldene 7 online spielen – zahlreiche Gewinnmöglichkeiten. 10 Rubbelfelder – noch mehr Gewinnchancen: Bei der „Goldenen 7“ zählen die Symbole. Vergolden Sie sich den Moment und gewinnen Sie bis zu Euro mit dem Rubbellos "Goldene 7“. Jetzt online bei LOTTO Hessen!