Mystic Placespart 6
The Great Pyramid:
The Great Pyramid has lent its name as a sort of by-word for paradoxes; and, as moths to a candle, so are theorisers attracted to it. The very fact that the subject was so generally familiar, and yet so little was accurately known about it, made it the more enticing; there were plenty of descriptions from which to choose, and yet most of them were so hazy that their support could be claimed for many varying theories."
Sir Flinders Petrie
The Pyramids and Temples of Gizeh
Southern face of the Great Pyramid.
The base originally measured about 230.33m square.
The original height was 146.59m.
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Location
Location: 29° 59' N 31° 09' E
Satellite images of the Egyptian Pyramids:
*Image Placemark Location:
longitude: 31.13101332492434 N, latitude: 29.97697709832755 E
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The Great Pyramid (the Pyramid of Khufu, or Cheops in Greek) at Gizeh, Egypt, demonstrates the remarkable character of its placement on the face of the Earth.
The Pyramid lies in the center of gravity of the continents. It also lies in the exact center of all the land area of the world, dividing the earth's land mass into approximately equal quarters.
The Plate XX from an original 1877 copy of
Piazzi Smyth's "Our Inheritance in the Great Pyramid".
Charles Piazzi Smyth (1819-1900) was Astronomer Royal for Scotland
and a respected Scientist.
The north-south axis (31 degrees east of Greenwich) is the longest land meridian, and the east-west axis (30 degrees north) is the longest land parallel on the globe. There is obviously only one place that these longest land-lines of the terrestrial earth can cross, and it is at the Great Pyramid! This is incredible, one of the scores of features of this mighty structure which begs for a better explanation.
Statistics
Khufu Pyramid Statistics
A total of over 2,300,000 (or only 590,712)* blocks of limestone and granite were used in its construction with the average block weighing 2.5 tons and none weighing less than 2 tons. The large blocks used in the ceiling of the King's Chamber weigh as much as 9 tons.
Construction date (Estimated): 2589 B.C..
Construction time (Estimated): 20 years.
Total weight (Estimated): 6.5 million tons.
The estimated total weight of the structure is 6.5 million tons!
Original entrance of the Great Pyramid.
Massive blocks of limestone form a relieving arch over the entrance.
The base of the pyramid covers 13 acres, 568,500 square feet and the length of each side was originally 754 feet, but is now 745 feet.
The original height was 481 feet tall, but is now only 449 feet.
The majority of the outer casing, which was polished limestone, was removed about 600 years ago to help build cities and mosques which created a rough, worn, and step-like appearance.
* According to Socrates G. Taseos, the actual number of stones used to build the Great Pyramid is only 590,712. In his book Back in Time 3104 B.C. to the Great Pyramid- Egyptians Broke Their Backs to Build It- How the Great Pyramid Was Really Built he presents results of his computer calculations. The following is derived from the book mentioned above.
The base measurements of the Great Pyramid are: north - 755.43 ft; south -
756.08 ft; east - 755.88 ft; west - 755.77 ft. These dimensions show no two
sides are identical; however, the distance between the longest and shortest
side is only 7.8 inches.
Each side is oriented almost exactly with the four Cardinal points. The
following being the estimated errors: north side 2'28" south of west; south
side 1'57" south of west; east side 5'30" west of north; and west side 2'30"
west of north.
The four corners were almost perfect right angles: north-east 90degrees 3'
2"; north-west 89 degrees 59'58"; south-east 89 deg 56'27"; and south-west
90 deg 0'33".
When completed, it rose to a height of 481.4 ft., the top 31 feet of which
are now missing. It's four sides incline at an angle of about 51deg. 51 min.
with the ground. At its base, it covers an area of about 13.1 acres. It was
built in 201 stepped tiers, which are visible because the casing stones have
been removed. It rises to the height of a modern 40-story building.
THE BEDROCK AND CORE
The pyramid is built partly upon a solid, large, bedrock core and a platform
of limestone blocks which can be seen at the northern and eastern sides. The
builder of this pyramid was very wise to choose this site because most of
the stones, with the exception of the casing stones, some granite and basalt
stones, could be cut right on the spot and in the nearby quarry. This
practical choice made it possible to reduce considerably the time and
back-breaking labor needed to drag the stones from distant quarries across
the Nile.
The first Step of the pyramid rests on a platform of finely finished
limestone blocks. These blocks are approximately 2.5 ft x 10 ft x 10 ft..
They project beyond the outer edges of the first Step's Casing Stones an
average of 2 feet on all sides. This platform is so flat that the official
survey of the Egyptian Government found that it was less than ½ of an inch
from being level. The removal of several platform stones showed that the
bedrock had been cut and leveled to receive each individual stone, sometimes
as deep as 1 to 2 inches.
On the north side the platform stones have been laid at an irregular angle,
each socket being carefully cut to receive the next stone. One explanation
for this irregularity of stone placement is that these northern platform
stones will have greater resistance to sliding from the downward and
horizontal pressures of the pyramid's face.
The many surveys done on the pyramid proved that the Egyptians located the
sides of the pyramid along the four Cardinal Points with extreme accuracy.
Whether they used the stars, and/or the rising and setting sun, cannot be
determined. One this is certain, that whatever method they used was direct
and very simple.
Once the sand, gravel and loose rocks had been removed, down to the solid
bedrock of the plateau, the whole pyramid site was open-cast quarried into
blocks, leaving a square core for the center of the pyramid (the core is
approximately 412.7 ft square, and rises approx. 46.25 feet high). These
blocks were then stored outside a low wall; made of mortared stone that
surrounds the core (the outside dimensions of the wall are approx. 887.3
feet square). Today there still remains the foundation of this wall on the
north, south and west sides of the pyramid, at an average distance of 65
feet from the outer edge of the base casing stone.
This core gives the pyramid stability from the downward and horizontal
forces that will develop from the superimposed loads of blocks of stones
that are piled up, as the pyramid rises. Also, from the prevailing
north-west winds that exert enormous pressures on the huge areas of the
pyramid's faces, thus increasing these forces further.
Leveling of the entire pyramid site was accomplished by flooding the area
inside the wall with water, leaving just the high spots. These them were cut
down to the level of the surface of the water. Next, some of the water was
released and the high spots again were cut down to the water's surface. This
process was repeated until the entire pyramid site, between the core and the
four walls, was leveled down to the base of the pyramid's platform.
THE CASING STONES
A few of the fine limestone casing blocks remain at the base of the northern
side and show how accurately the stones were dressed and fitted together.
The core masonry, behind the casing stones, consists of large blocks of
local limestone, quarried right on the spot, built around and over the
bedrock core. The size of this core cannot be determined, since it is
completely covered by the pyramid.
The casing stones were of highly polished white limestone, which must have
been a dazzling sight. Unlike marble, which tends to become eroded with time
and weather, limestone becomes harder and more polished.
HOW MANY BLOCKS DID IT ACTUALLY TAKE TO BUILD THE GREAT PYRAMID?
Most books and encyclopedia state that there are 2.3 million blocks of stone
in the Great Pyramid of Khufu (Cheops), with no mention of method used to
figure this.
Socrates determined the size and weight of the blocks (a standard block),
and ran a Pascal Computer Program (a mathematical model of all the blocks of
stone needed; written by the author to optimize the sizes and weights of the
stones) to come up with the real number of blocks used. Since the volume of
passageways and internal chambers are very small compared to the high volume
of the pyramid, they are ignored at this time, just as though the pyramid
was built of solid stone blocks with mortared joints.
THE SIZE OF THE BLOCKS
The size of the blocks are based on a chance discovery in 1837 by Howard
Vyse. He found two of the original side casing blocks at the base of the
pyramid, 5 ft x 8 ft x 12 ft, with an angle of 51 degrees, 51 minutes cut on
one of the 12 ft. sides. Each of these stones weighed (5 x 8 x 12)/2000 =
39.9 tons before the face angle was cut. These originally were used for the
side casing stones of Step No. 1, in the Pascal computer program. The sizes
of all the other blocks were scaled from these two original blocks of the
remaining Steps 2 to 201.
THE GREAT PYRAMID'S DIMENSIONS AND THEIR LAYOUT
One acre = 43,560 sq. ft, or 208.71 feet on a side.
For the pyramid's base, length = width = (square root of 13.097144 acres) x
208.71 feet = 755.321 feet. Or 755.321 x 12 = 9063.85 inches.
Height = (755.321 x tangent 51deg 51 min)/2 = 480.783 feet. Or 480.783 x 12
= 5769.403 inches.
For the cap stone base: length = width = (32.18 x 2)/tangent 51deg 51 min =
50.55 inches.
The average size of a pyramid stone = (5 x 8 x 12)
The average side measurement, at the base = 759.3 ft.
The height used was 201 steps high, or 480 feet. (This is minus the height
of the Capstone, which was one piece in itself.
The number reached by the Pascal computer program was 603,728 blocks used.
The solid core takes up the space of 13,016 stones.
So, the actual number of stones used to build the Great Pyramid is 603,728 -
13,016 = 590,712.
This figure is (2,300,000 - 590,712) = 1,709,288 blocks less than the often
published 2.3 million value.
NUMBER OF VARIOUS BLOCKS OF STONE USED TO BUILD THE GREAT PYRAMID
Number of platform blocks used (2.5 ft x 10 ft square), equals (759.3 x
759.3(pyramid base)) - (412.7 x 412.7(core base))/(10 x 10(platform block
base)) = 4,062.
Number of CORNER Casing stones where the pyramid faces meet equals 201 steps
x 4 sides = 804.
Number of side casing stones equals ((244 x 127) + 8,953) = 39,941.
Due to Bedrock Core, in the center of Step 1 through 10, the total number of
blocks needed is reduced by 13,016.
THE NUMBER OF ALL BLOCKS BEHIND THE CASING STONES EQUALS
(590,712 - 804 - 39,941) = 549,967.
PLACING THE BLOCKS
The average number of blocks that have to be placed each day equals (590,712
blocks)/(20years x 364.25 days) = 81 blocks per day.
If 10 crews of 300 men work on each of the four sides of the pyramid, then
the totals of 40 crews and 12,000 men will be needed. Each of the crews will
be responsible to place 81/40 = 2 blocks per day.
The workload passes through three phases of decreasing difficulty, which are
determined by the weights of the heaviest blocks:
Steps 1 through 21 (60.59 to 27.24 tons)
Steps 22 through 136 (17.66 to 6.44 tons)
Steps 127 through 201 (3.05 to 2.63 tons)
As the weight of the blocks decrease, Step to Step, the sizes of the drag
crews will decrease. However, when this happens, the number of blocks needed
to be dragged each day can be reduced because one large block can be dragged
and cut into several smaller blocks that are needed.
As the pyramid rises there is less space for the crews to work in and fewer
block to be placed. In other words, the number of workers that will be
needed depends on three factors of: weight of blocks, number of blocks to be
placed, and the working space available.
Source:
Back in Time 3104 B.C. to the Great Pyramid- Egyptians Broke Their Backs to Build It- How the Great Pyramid Was Really Built
© 1990 by Socrates Taseos
Related Books on the Ancient Egypt
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Geometry
Geometry of the Great Pyramid
DIMENSIONS of Great Pyramid
by morphvs
The following article is Copyright © 2001-2003 aiwaz.net_institute.
All rights reserved. No part of this website, including text and images, may be reproduced or copied in any form or by any means without the express prior written permission of aiwaz.net_institute. Reprinted with permission.
If the calculations concerning the royal cubit are correct the main dimensions of the pyramid should also prove that. The approximate dimensions of the pyramid are calculated by Petrie according to the remains of the sockets in the ground for the casing stones whose remains are still at the top of the pyramid, and the angle 51° 52' ± 2' of the slopes. The base of 9069 inches is approximately 440 royal cubits (the difference is 9 inches which is not a remarkable difference if we consider the whole dimension and consider that the employed data represent only an estimation of the real values) whereas the calculated height, 5776 inches, is precisely 280 royal cubits. The relation 440:280 can be reduced to 11:7, which gives an approximation of the half value of Pi. Squaring the Circle
The circle and the square are
united through the circumference:
440x4=1760=2x22/7x280
area of square: 440x440=193600
area of circle:28x28x22/7=246400
sum: 440000
The engagement of Pi value in the main dimensions suggests also a very accurate angle of 51° 52' ± 2' of the slopes which expresses the value of Pi. Another coincidence is the relation between the height of the pyramid's triangle in relation to a half of the side of the pyramid, since it appears to be the Golden Section, or the specific ratio ruling this set of proportions, F = (sqr(5)+1)/2 = 1.618 = 356:220. This ratio, 356:220 = 89:55 is also contained in the first of Fibonacci Series:
1 2 3 5 8 13 21 34 55 89 144 ...
A single composition contains two apparently contradicting irrational numbers P and F, without disrupting each other. This appears to be completely opposed to the classical architectural canon which postulates that in 'good' composition no two different geometrical systems of proportions may be mixed in order to maintain the purity of design. But analysis of other architectural and artistic forms suggested that the greatest masters skillfully juggled the proportional canons without losing the coherent system, for they knew that these systems can be interconnected if the path that links them is found. That is obvious In the case of the Great Pyramid where two different principles are interweaved without interference ruling different angles of the composition, which is most importantly a most simple one, namely 11:7, a most simple ratio obviously signifying such infinite mysteries as the value of P and most 'natural' value of F. In spite of common miss-understanding of architectural composition, the most mysterious and praised compositions are very simple but not devoid of anthropomorphic appeal, since everything is made out of human proportions, just like Vitruvius describing the rations of the human body, very simple and very clean. The numbers 7 and in 11 are successive factors in the second of Fibonacci progressions that approximate geometry of the pentagram:
1 3 4 7 11 18 29 47 76 123 ...
The summary of the selected main mean dimensions is:
dimension b. inch m royal cub. palm digit
base 9068.8 230.35 440 3,080 12,320
height 5776 146.71 280 1,960 7,840
sum 720 5,040 20,160
slope 7343.2 186.52 356 2,492 9,968
edge 8630.4 219.21 418 2,926 11,704
The main source of all kinds of delusions and speculations about our mythical past for the western man comes of course from Plato. With the myth of Atlantis he planted the necessary seed of mythical Eden, a culture of high intelligence that lived before the known history. If Plato received any wisdom from the ancient Egypt it could perhaps be traced in the canon of numbers that is so latently present throughout his work, but never on the surface. This canon seems to appear in the descriptions of his fantastic cities where everything is most carefully calculated and proportioned. The topic of Plato's Laws is the description of the ideal state called Magnesia which is entirely composed out of the mysterious number 5,040.
The distance* when Earth is closest to Sun (perihelion) is 147x106 km, which is translated into royal cubits 280x109, hinting at the height of the Great pyramid,
280 royal cubits.
The above article comes from aiwaz.net_institute - Great Pyramid and Giza plateau
and is Copyright © 2001-2003 aiwaz.net_institute.
All rights reserved. No part of this article, including text and images, may be reproduced or copied in any form or by any means without the express prior written permission of aiwaz.net_institute. Reprinted with permission.
* Related links: Astronomic & Cosmographic Data, Nasa site with planetary data
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Do not miss this web site: aiwaz.net_institute - Great Pyramid and Giza plateau
Find out more amazing facts about the GREAT PYRAMID: Position of King's Chamber, Queen's Chamber, Subterranean Chamber; SECOND PYRAMID: Dimensions of Pyramid, Great Chamber, Coffer, Lower Chamber; THIRD PYRAMID: Dimensions of Pyramid, Chambers,MATHESIS of Giza Plateau.
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The Golden Ratio & Squaring the Circle in the Great Pyramid
A straight line is said to have been cut in extreme and mean ratio when, as the whole line is to the greater segment, so is the greater to the less. [Euclid]
The extreme and mean ratio is also known as the golden ratio.
If the smaller part = 1, and larger part = G, the golden ratio requires that
G is equal approximately 1.6180
Does the Great Pyramid contain the Golden Ratio?
Assuming that the height of the GP = 146.515 m, and base = 230.363 m, and using simple math we find that half of the base is 115.182 m and the "slant height" is 186.369 m
Dividing the "slant height" (186.369m) by "half base" (115.182m) gives = 1.6180, which is practically equal to the golden ration!
The earth/moon relationship is the only one in our solar system that contains this unique golden section ratio that "squares the circle". Along with this is the phenomenon that the moon and the sun appear to be the same size, most clearly noticed during an eclipse. This too is true only from earth's vantage point…No other planet/moon relationship in our solar system can make this claim.
Although the problem of squaring the circle was proven mathematically impossible in the 19th century (as pi, being irrational, cannot be exactly measured), the Earth, the moon, and the Great Pyramid, are all coming about as close as you can get to the solution!
If the base of the Great Pyramid is equated with the diameter of the earth, then the radius of the moon can be generated by subtracting the radius of the earth from the height of the pyramid (see the picture below).
Also the square (in orange), with the side equal to the radius of the Earth, and the circle (in blue), with radius equal to the radius of the Earth plus the radius of the moon, are very nearly equal in perimeters:
Orange Square Perimeter = 2+2+2+2=8
Blue Circle Circumference = 2*pi*1.273=8
Note:
Earth, Radius, Mean = 6,370,973.27862 m *
Moon, Radius, Mean = 1,738,000 m.*
Moon Radius divided by Earth Radius = 0.2728 *
* Source: Astronomic and Cosmographic Data
Let's re-phrase the above arguments **
In the diagram above, the big triangle is the same proportion and angle of the Great Pyramid, with its base angles at 51 degrees 51 minutes. If you bisect this triangle and assign a value of 1 to each base, then the hypotenuse (the side opposite the right angle) equals phi (1.618..) and the perpendicular side equals the square root of phi. And that’s not all. A circle is drawn with it’s centre and diameter the same as the base of the large triangle. This represents the circumference of the earth. A square is then drawn to touch the outside of the earth circle. A second circle is then drawn around the first one, with its circumference equal to the perimeter of the square. (The squaring of the circle.) This new circle will actually pass exactly through the apex of the pyramid. And now the “wow”: A circle drawn with its centre at the apex of the pyramid and its radius just long enough to touch the earth circle, will have the circumference of the moon! Neat, huh! And the small triangle formed by the moon and the earth square will be a perfect 345 triangle (which doesn’t seem to mean much.)
** Source: http://geometry.wholesomebalance.com/Sacred_Geometry_2.html#Phi
Recommend this website to your friends:
Was the golden ratio intentionally built into the Great Pyramid of Cheops?
Why would anyone intentionally build the golden ratio into a pyramid, or other structure? What was the significance of to the Egyptians? And did the ancient Egyptians intentionally design the Great Pyramid to square the circle?
The answer to these questions is uncertain since designing the Great Pyramid according to the simple rules explained by the graphic below would give the pyramid automatically (by coincidence? ) all its "magic" qualities.
The height of the Great Pyramid times 2π exactly equals the perimeter of the pyramid. This proportions result from elegant design of the pyramid with the height equal two diameters of a circle and the base equal to the circumference of the circle. Click here or on the image below to see larger picture
Comparing the Great Pyramid with the Pyramid of the Sun in Teotihuacan
The Pyramid of the Sun and the Great Pyramid of Egypt are almost or very nearly equal to one another in base perimeter. The Pyramid of the Sun is "almost" half the height of the Great Pyramid. There is a slight difference. The Great Pyramid is 1.03 - times larger than the base of the Pyramid of the Sun. Conversely, the base of the Pyramid of the Sun is 97% of the Great Pyramid's base.
The ratio of the base perimeter to the height:
Great Pyramid Pyramid of the Sun
6.2800001... : 1
(deviates by 0.05 % from the
6.2831853 value for 2 x pi) 12.560171... : 1
(deviates by 0.05 % from the
12.566371 value for 4 x pi)
The Great Pyramid - Metrological Standard
The Great Pyramid is generally regarded as a tomb and as grandiose memorial to the pharaoh who commissioned it. The opposing view is that of the pyramid being the culminating achievement of those who practised an advanced science in prehistory.
The Great Pyramid is a repository of universal standards, it is a model of the earth against which any standard could be confirmed and corrected if necessary.
It is exactly the imperishable standard, which the French had sought to create by the devising of the metre, but infinitely more practical and intelligent.
From classical times, the Great pyramid has always been acknowledged as having mathematical, metrological and geodetic functions. But ancient Greek and Roman writers were further removed in time from the designers of the Great Pyramid than they are from us. They had merely inherited fragments of a much older cosmology; the science in which it was founded having long since disappeared.
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The Concave Faces of the Great Pyramid
Aerial photo by Groves, 1940 (detail).
In his book The Egyptian Pyramids: A Comprehensive, Illustrated Reference, J.P. Lepre wrote:
One very unusual feature of the Great Pyramid is a concavity of the core that makes the monument an eight-sided figure, rather than four-sided like every other Egyptian pyramid. That is to say, that its four sides are hollowed in or indented along their central lines, from base to peak. This concavity divides each of the apparent four sides in half, creating a very special and unusual eight-sided pyramid; and it is executed to such an extraordinary degree of precision as to enter the realm of the uncanny. For, viewed from any ground position or distance, this concavity is quite invisible to the naked eye. The hollowing-in can be noticed only from the air, and only at certain times of the day. This explains why virtually every available photograph of the Great Pyramid does not show the hollowing-in phenomenon, and why the concavity was never discovered until the age of aviation. It was discovered quite by accident in 1940, when a British Air Force pilot, P. Groves, was flying over the pyramid. He happened to notice the concavity and captured it in the now-famous photograph. [p. 65]
This strange feature was not first observed in 1940. It was illustrated in La Description de l'Egypte in the late 1700's (Volume V, pl. 8). Flinders Petrie noticed a hollowing in the core masonry in the center of each face and wrote that he "continually observed that the courses of the core had dips of as much as ½° to 1°" (The Pyramids and Temples of Gizeh, 1883, p. 421). Though it is apparently more easily observed from the air, the concavity is measurable and is visible from the ground under favorable lighting conditions
Ikonos satellite image of the Great Pyramid
I.E.S. Edwards wrote, "In the Great Pyramid the packing-blocks were laid in such a way that they sloped slightly inwards towards the centre of each course, with a result that a noticeable depression runs down the middle of each face -- a peculiarity shared, as far as is known, by no other pyramid" (The Pyramids of Egypt, 1975, p. 207). Maragioglio and Rinaldi described a similar concavity on the pyramid of Menkaure, the third pyramid at Giza. Miroslav Verner wrote that the faces of the Red Pyramid at Dahshur are also "slightly concave."
Diagram of the concavity (not to scale).
What was the purpose for concave Great Pyramid sides? Maragioglio and Rinaldi felt this feature would help bond the casing to the core. Verner agreed: "As in the case of the earlier Red Pyramid, the slightly concave walls were intended to increase the stability of the pyramid's mantle [i.e. casing stones]" (The Pyramids, 2001, p. 195). Martin Isler outlined the various theories in his article "Concerning the Concave Faces on the Great Pyramid" (Journal of the American Research Center in Egypt, 20:1983, pp. 27-32):
To give a curved form to the nucleus in order to prevent the faces from sliding.
casing block in the center would be larger and would serve more suitably as a guide for other blocks in the same course.
better bond the nucleus to the casing.
aesthetic reasons, as concave faces would make the structure more pleasing to the eye.
the casing stones were later removed, they were tumbled down the faces, and thereby 6wore down the center of the pyramids more than the edges.
erosion of wind-swept sand had a greater effect on the center
Isler dismisses the first four reasons based on the idea that "what is proposed for the first pyramid should hold true for the others." He also dismisses the last two because they would not "dip the courses," but rather have simply "worn away the surface of the stone." Adding another category to the list above, "a result of imperfect building method," he proceeds to theorize that the concavity was an artifact of a compounding error in building technique (specifically, a sag in the mason's line). One is tempted to reject this theory based on Isler's own reasoning: "what is proposed for the first pyramid should hold true for the others."
The concavity has prompted more improbable theories, usually in support of some larger agenda. David Davidson (cited by Peter Tompkins in Secrets of the Great Pyramid, pp. 108-114) defended the discredited Piazzi Smyth by attempting to demonstrate that if measurements included the hollowing, they would provide three base measurements that describe the three lengths of the year: solar, sidereal, and "anomalistic." (These lines, on the diagram below, would be AB, AEFB, and AMB.) What Davidson is assuming is that the concavity, present today in the core structure of the pyramid, would extend to the finished cased surface. There is no evidence for this; indeed the extant casing is perfectly flat. Maragioglio and Rinaldi observed that the granite casing of Menkaure's pyramid was flat, but above the granite the packing-blocks formed a concavity in the center of each face. The evidence indicates that the concavity is a functional feature of the core structure that was hidden from sight when the casing stones were applied.
Three proposed "baselines" of the Great Pyramid (not to scale).
John Williams, author of Williams' Hydraulic Theory to Cheops' Pyramid wrote that "the only advantage that I can see - and it is a great one - for having a concave face on a structure is to contain extremely high internal pressures - the type of pressures that would result from using a hydraulic method of my description. Think of this in terms of an egg shell, arch or gabling." This explanation is also voiced by other purveyors of the "pump-theory" such as Edward J. Kunkel (author of The Pharaoh's Pump, 1962) and Richard Noone (author of 5/5/2000: Ice: The Ultimate Disaster, 1982). Unfortunately, they fail to understand how an arch or load-bearing gable works. A supporting arch is designed to convert the downward force, or weight, of a structure to an outward force, which in turn is transferred to a buttress, a pier, or an abutment. An arch simply redirects the force; it does not make it vanish. If the sides of the Great Pyramid were designed as arches, then those arches would serve to direct the load into thin air. It doesn't make sense. The eggshell analogy is yet less applicable because the pyramid is not egg-shaped. Like the arch, the egg is strong because it transfers load pressure, in this case into vertical as well as horizontal forces that are distributed more evenly along the structure of the egg due to its shape.
Kunkel likened each pyramid face to a dam. He claimed that each side bends inward against the pressure of the water inside the pyramid just as a dam (Hoover Dam for example) bends towards the force of the water it holds back. An arch dam employs the same structural principles as the arch (described above). The dam curves towards the hydrostatic pressure from the water behind it, which in turn is distributed horizontally to abutments on the side walls against which the dam is built. Again, the pyramid lacks such abutments.
In Ancient Egyptian Construction and Architecture, Clarke and Englebach wrote:
Most pyramids have individual peculiarities which are as yet difficult to explain. For instance, in the Great Pyramid, as possibly in certain others, a large depression in the packing-blocks runs down the middle of each face, implying a line of extra-thick facing there. Though there is no special difficulty in arranging the blocks of a course in such a manner that they increase in size at the middle, there is no satisfactory explanation of the feature any more than there is of the 'girdle-blocks' [in the Great Pyramid's ascending passage] already discussed. [p. 128]
The purpose for the concavity of the Great Pyramids remains a mystery and no satisfactory explanation for this feature has been offered. The indentation is so slight that any practical function is difficult to imagine.
© 2000 by Larry Orcutt, Catchpenny Mysteries, Reprinted with permission
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The Great Pyramid's "Air Shafts"
While shafts in the King's Chamber had been described as early as 1610, the shafts in the Queen's Chamber were not discovered until 1872. In that year, Waynman Dixon and his friend Dr. Grant found a crack in the south wall of the Queen's Chamber. After pushing a long wire into the crack, indicating that a void was behind it, Dixon hired a carpenter named Bill Grundy to cut through the wall. A rectangular channel, 8.6 inches wide and 8 inches high, was found leading 7 feet into the pyramid before turning upward at about a 32º angle. With the two similar shafts of the King's Chamber in mind, Dixon measured a like position on the north wall, and Grundy chiseled away and, as expected, found the opening of a similar channel. The men lit fires inside the shafts in an attempt to find where they led. The smoke stagnated in the northern shaft but disappeared into the southern shaft. No smoke was seen to exit the pyramid on the outside. Three artifacts were discovered inside the shafts: a small bronze grapnel hook, a bit of cedar-like wood, and a "grey-granite, or green-stone" ball weighing 8.325 grains thought to be an Egyptian "mina" weight ball
Shafts and passages of the Great Pyramid at Giza
The Shafts of the Queen's Chamber Described
The openings of both shafts are located at the same level in the chamber, at the joint at the top of the second course of granite wall-stone; the ceilings of the shafts are level with the joint.
The northern shaft runs horizontally for just over six feet (76"), then turns upward at a mean angle of 37º 28'. The shaft terminates about 20 feet short of the outside of the pyramid. The total length of the northern shaft is about 240 feet and rises at an angle of 38º for the majority of its length.
The southern shaft also runs horizontally for just over six feet (80"), then turns upward at a mean angle of 38º 28'. The total length of the southern shaft is about 250 feet and, as its northern counterpart, ascends at an angle of 38º for the majority of its length and comes to an end about 20 feet short of the outside of the pyramid.
The Shafts of the King's Chamber Described
The openings of both shafts are located at roughly the same level in the chamber, at the joint at the top of the first course of granite wall-stone. The northern opening is slightly lower, its ceiling being level with the joint, while the floor of the southern opening is roughly level with the joint.
The northern shaft is rectangular, about 7 inches wide by 5 inches high, a shape it maintains throughout its length. The shaft begins on the horizontal for about 6 feet then takes a series of four bends. While maintaining its general upward angle, it shifts first to the north-northwest then back to north, then to north-northeast, and finally back to true north. It has been speculated by some that this unexplained semicircular diversion might have been necessary to avoid some heretofore undiscovered feature of the pyramid. The total length of the northern shaft is about 235 feet and rises at an angle of 31º (with a variation of between 30º 43' and 32º 4') for the majority of its length.
Though the first eight feet of the northern shaft is intact, the next thirty or so feet have been excavated by treasure seekers, presumably following the direction of the shaft in search of treasure. The breach to the shaft was made in the west wall of the short passage leading from the antechamber to the King's Chamber. A modern iron grate today guards the mouth of this breach.
The southern shaft is different in appearance. Its mouth is larger, about 18" wide by 24" high. The dimensions are reduced to about 12" by 18" within a few feet, and then narrows yet more to about 8" by 12". The shape is not rectangular, as is the northern shaft, but has a dome shape where it enters the chamber, with a narrow floor, the angle of the walls being slightly obtuse, and a dome-shaped ceiling. The shaft is horizontal and true south for about 6 feet. At the first bend, its shape changes to an oval, and continues thusly for about 8 feet. Its orientation also changes slightly from true south to south-southwest. At the second bend its shape changes yet again to a rectangle, with a height greater than its width. It retains this shape for the 160 feet to the outside of the pyramid where it emerges at the 101st course of stone. It also changes directions once again at the second bend to a more severe south-southwest diversion. The total length of the southern shaft is about 175 feet and ascends at an angle of 45º (with a variation of between 44º 26' and 45º 30') for the majority of its length.
The Function of the Shafts
When Sandys described the Great Pyramid in 1610, he wrote of the shafts:
In the walls, on each side of the upper room, there are two holes, one opposite to another, their ends not discernable, nor big enough to be crept into -- sooty within, and made, as they say, by a flame of fire which darted through it.
Greaves also wrote of the King's Chamber shafts in 1638. Considering the presence of the lampblack inside, he concluded that the shafts had been intended as receptacles for an "eternal lamp." In 1692, M. Maillet wrote that the shafts served as means of communication for those who were buried alive with the dead king. Not only did the shafts provide air, he reasoned, but they also provides a passage for food which was placed in boxes and pulled through by rope.
By the 20th century, the shafts were presumed to have been designed to provide ventilation. That view has slowly been changing, however. I.E.S. Edwards wrote, "The object of these shafts is not known with certainty; they may have been designed for the ventilation of the chamber or for some religious purpose which is still open to conjecture." (The Pyramids of Egypt, 1961, p. 126.) Ahmed Fakhry wrote, "They are usually referred to as 'air channels,' but most Egyptologists believe that they had a religious significance related to the soul of the king." (The Pyramids, 1969, p. 118.) More recently, Mark Lehner wrote:
A symbolic function should also be attributed to the so-called "air-shafts," which had nothing to do with conducting air. No other pyramid contains chambers and passages so high in the body of masonry as Khufu's and so the builders provided the King's Chamber with small model passages to allow the king's spirit to ascend to the stars. (The Complete Pyramids, 1997, p. 114)
There are many reasons why it is not likely that the shafts were meant for ventilation. The complex angles of the shafts necessitated the piercing of many courses of stone, a daunting logistical challenge during design and construction. Horizontal shafts would have been much easier to build: shafts carved through a single course of stone. One might well wonder why ventilation would be needed at all! No other known pyramid builder made such provisions; even workers in rock-cut tombs managed on the air provided solely by the entrance passage. When the bulk of work on the King's Chamber was being done, ambient air was plentiful as the ceiling had not yet been put in place. The chamber was finished as the superstructure rose.
There are also, however, reasons why it is not likely that the shafts were meant to serve as "launching ramps" for the king's ka. When, in 1964, Alexander Badawy and Virginia Trimble determined that the shafts are "aimed" at certain "imperishable" circumpolar stars and at the constellation of Orion, the function of the shafts as cultic features seemed certain. But the ka did not require a physical means of egress from a tomb -- false doors served this purpose quite nicely both before and after Khufu's reign. The passage that ascends to the entrance of the pyramid is also directed at the circumpolar stars in the manner of previous pyramids. The northern shafts for such a use would have been a needless and bothersome redundancy, although admittedly the Egyptians were not adverse to redundancies.
That fact that no other pyramid in Egypt is known to posses similar shafts as those of the Great Pyramid is problematic. If the shafts were so important for either ventilation or as passages for the king's ka, then why were they omitted in other funerary structures? It is obvious that the builders of Khufu's pyramid went to a jolly lot of trouble to incorporate the shafts into the design of the pyramid, but the true reason why still remains a mystery.
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