27Nov2025:

CAT2025Cheops:

 

CheopsPetrieAPPENDIX — CAT2025C

 

CheopsPyramidBase: CAT2025Cheops ¦ CheopsPyramidBase ¦ PetrieIntroText ¦ In1 ¦ In2 ¦ In3 ¦ In4 ¦ In5 ¦ Illustrations ¦ ArrivingStation ¦ CasingCore ¦

 

 

 

HOW PETRIE RETRIEVED THE FINAL PYRAMID BASE LENGTH 9068.80”

Resolution 217 expolains how Flinders Petrie from 1881 found

THE CHEOPS PYRAMID BASE LENGTH

 

Understanding how Petrie retrieved the Cheops Pyramdid base 9068.8 inches might not be easy to understand, unless acquainted with the basic Petrie descriptions on his pyramid outside investigations. Below are collected Petrie’s central statements on the detail, with a following illustrated overview as suggested (and here interpreted) from the Petrie wordings.

NOT EVEN THIS EXPLAINING DRAFT MIGHT BE A COMPLETELY FULL MANUAL TO PETRI’ES FINDING, HOWEVER IN CONCERN OF THE FOREMOST known DETAILS.

———————————————

PetrieIntroText ¦ Illustrated

 

PetrieIntroText: CheopsPyramidBase

The Cheops Pyramid

THE MAIN DIAGONAL PRECISION OF THE CONSTRUCT

 

The entire Petrie primary investigation summarizes the whole story in his

 

PetrieCH6.21 p.39:

 

It seems, then, that we are shut up to the

idea that the socket corners lie in the diagonals of the Pyramid casing.

 

THE CONCERN: Petrie and his working staff digs shafts and investigates to find confirmations on the casing details on all the four sides of the pyramid. It all hangs on The Precision Diagonals — and the core stone masonry’s tangential optical plane case intesections with Petrie’s pavement, all of which were determined by Petrie in specific arrangements;

In1: PetrieIntroText

PetrieCH6.20 p.37:

 

     The form of the present rough core masonry of the Pyramid is capable of

being very closely estimated. By looking across a face of the Pyramid, either

up an edge, across the middle of the face, or even along near the base, the mean

optical plane which would touch the most prominent points of all the stones,

may be found with an average variation at different times of only 1.0 inch. I

therefore carefully fixed, by nine observations at each corner of each face,

where the mean plane of each face would fall on the socket floors; using

a straight rod as a guide to the eye in estimating.

In2: In1

PetrieCH6.20 p.38:

 

Hence the sockets only show the size of the Pyramid, where it was started

from varying levels, which were all under the pavement; and its true base upon

the pavement is therefore 20 or 30 inches inside the lines of the sockets.

In3: In2

PetrieCH4.14 p.29:

 

The shafts for finding the casing were then sunk first of all about 100 feet

from the corners of the Pyramid; and then, finding nothing there but rock

(and that below the pavement level), places further along the sides were tried;

until at last the highest parts, in the very middle of the sides, were opened.

There the casing and pavement were found on every side, never seen since the

rest of the casing was destroyed a thousand years ago.

..

 

Thus for the North

casing four shafts were tried; but no casing was found, except where known

by Vyse. On the East side four shafts were sunk, finding casing in the middle

one. On the South four shafts were sunk, finding badly preserved casing in

one, and good casing in another, entirely eaten away, however, just at the

base (see Pl. xii.). On the West side five shafts were tried, finding casing

in one of them, and pavement within the casing line at the N.W. The East

and South casing was seriously weathered away; on the East it was only

defined by the pavement being worn away outside its ancient edge; and on

the South it was found to be even hollowed out (Pl. xii.), probably by the

action of sand whirled up against the base, and scooping it out like sea-worn

caves. The shafts were cut as small as possible, to avoid crumbling of the

sides; and they were steined with the larger blocks where the rubbish was

loose: ledges were left at each six feet down, for the men to stand on for

handing up the baskets and larger stones.

In4: In3

PetrieCH4.14 p.30:

 

Besides these shafts, many pits and trenches were dug to uncover the

outer edge of the pavement.

..

 

Thus

altogether 85 shafts, pits, or trenches were excavated around the Great

Pyramid.

 

Petrie concludes the investigations on the pyramid outside

and establishes the preferences:

In5: In4

PetrieCH6.20 p.38 — bold added:

 

Here, then, was another apparently unaccountable fact, namely, that the

core masonry was far more accurate in its form than the socket square. It is,

in fact, four times as accurate in length, and eight times as accurate in angle.

This forced me to the conclusion that the socket lines cannot show the finished

base of the Pyramid.

    The clue which explains all these difficulties is—that the socket corners

vary from a true square in proportion to their depth below the pavement, the

sockets nearer the centre being higher.

    This means that the sockets were cut to receive the foot of the sloping face,

which was continued right down to their floors, beneath the pavement. (See

Pl. xi.)

   Hence the sockets only show the size of the Pyramid, where it was started

from varying levels, which were all under the pavement; and its true base upon

the pavement is therefore 20 or 30 inches inside the lines of the sockets.

     This exactly explains the position of the casing found on the N. side, as it was found to be inside the line of the sockets.

    The test, then, of this explanation, was to find the casing on the other sides,

fix its position, and see if it was likewise within the lines of the sockets. The

shafts were accordingly sunk through the rubbish, two or three feet inside the

socket lines; and the casing was found on each side, just in the expected alignment.

Without this clue, the narrow shafts might easily have missed the casing

altogether, by being sunk too far out from the Pyramid.

 

Illustrations: In5

ILLUSTRATIONS on the quoted Petrie investigations

 

 

 

The rightmost extracted part from the PETRIEplate.10 illustrates the necessary BASIC PYRAMID CONSTRUCT provision: a high precision diagonal defining the Petrie found socket corners, below the Petrie pavement. And also providing a definition of the Petrie pavement determined regular casing corners on these diagonals (with Petrie’s given Azimuth [checking on parallelism and its right angle coordination (with respect to a true precise North [counts in 24h degrees as 360 or other ..]): whether the supposed pyramid square is square or not] deviations).

 

IN PRINCIPLE —

•   with The already Petrie found Master Diagonal (MD), and

•   the remaining few case stones on the North Pyramid side as A Diagonal intersecting (RL) INDEX

•   and provided (In1) a high precision optical plane tangent to the pyramid bulk of stones,

facing the outside of the pyramid:

 

 

———————————————

PetrieCH6.20.38 ¦ PetrieCH6.21.39 ¦ PetrieIn1

 

 

BY PRINCIPLE — this is how it can be done:

 

— Petrie on his found Pavement can check the first intersection with the given Pavement standing Remaining Casing stones line RL intersection with the Petrie found Master Diagonal (MD) at the North West,

then turning to the South on RL 90° right angles, spotting the South West MD intersection,

then turning to the East on RL 180° angles, spotting the South East MD intersection,

then turning to the North on RL 270° angles, spotting the final North East MD intersection.

 

That would — provided an ideal casing square — define the casing delimiting line, ideal square on Petrie’s pavement.

 

NEXT — Petrie on In1:

 

 

Petrie makes the (In1) actual measures on the CORE-CASE optical four side plane intersections on the Petrie established pavement:

 

— Petrie’s CoreCASE Plane Side Measuring METHOD

— as we could measure it the same, according to Petrie’s instructions.

Petrie’s (»opposite consecutive AB») values in inches, PetrieCH6.20 p38 :

N(9002.3), E(8999.4), S(9001.7), W(9002.5), Mean(9001.5).

ArrivingStation: Illustrations

 

 

Petrie then adds, from each specific corner only, the opposite complementary intersecting

Δ-values

(27.7¦39.4), (35.5¦32.8), (32.3¦35.5), (31.0¦33.1),

to each respective given optical plane ..

 

 

the Petrie measured socket-pavement lengths in his Plate.10

(Those additional numbers are not found in Petrie’s book, what we know, only in his Plate.10)

NORTH  (9002.3)           + West(27.7)   + East(39.4),

EAST     (8999.4)           + South(35.5)  + North(32.8),

SOUTH  (9001.7)           + West(32.3)   + East(35.5), and

WEST    (9002.5)           + South(31.0)  + North(35.1)

 

 

9068 arrived

 

 

giving a final genuine the Petrie determined Cheops Pyramid base

2bPetrie             =  9068.80 inches

bPetrie            = 4534.40 inches

(here checked in a specific OpenOfficeCalc spread sheet)

 

 

See the Petrie PLATE.10 in Birdsall’s reference

https://ronaldbirdsall.com/gizeh/petrie/photo/plate10.html

The West-East South-North values are only, what we know, given by Petrie in his Plate.10. (Plate.x with Petrie’s Roman numbers designation).

-------------------

.. and the final Petrie value in the PetrieCH6.21 p39 table, with its tolerance specification

 

PetrieCH6.25 p.43:

 

The mean base being 9068.8 ± .5 inches ..

 

Petrie does not give the above specified Δ-values except in his Plate.10, what we know.

 

CasingCore: ArrivingStation

 

———————————————

RBPC3 ¦

Petrie’s optical core casing plane pavement intersections .. Adding the separately remaining actual pyramid casing line (RL) measured  Δ-values arrives (ArrivingStation) at the end station with Petrie’s determined Cheops Pyramid half base length 4534.40 inches ± 0.25 (9068.80 ± 0.50)”.

 

 

 

CAT2025ChPetrieApix ¦ CAT2025Cheops ¦ CheopsPyramidBase ¦ PetrieIntroText ¦ In1 ¦ In2 ¦ In3 ¦ In4 ¦ In5 ¦ Illustrations ¦ ArrivingStation ¦ CasingCore ¦

 

TNED.

 

 

 

 

 

END.

 

 

 

 

 

CAT2025CheopsPetrie

ämnesrubriker

 

 

 

innehåll

 

 

CAT2025Cheops

CheopsPyramidBase

PetrieIntroText

In1

In2

In3

In4

In5

Illustrations

ArrivingStation

CasingCore

 

 

                                                                                                                                                                                                                                                                       

Senast uppdaterade version: 2025-11-28

*END.

Stavningskontrollerat ¦ 27Nov2025

rester

*

[HOP]. HANDBOOK OF PHYSICS, E. U. Condon, McGraw-Hill 1967

Atomviktstabellen i HOP allmän referens i denna presentation, Table 2.1 MASS TABLE ¦ s9–65—9–86 ¦

concurrent — with such minor end decimal differences with Berkeley National 2003 and Nist/Codata 2005 — having no significance in this presentation

Comparing CODATA2005-HOP1967 ¦

m_n        = 1.0086652u  ......................    neutronmassan i atomära massenheter (u) [HOP Table 2.1 s9–65] — neutron mass

m_e        = 0.000548598u  ..................    elektronmassan i atomära massenheter (u) [HOP Table 10.3 s7–155 för m_e , Table 1.4 s7–27 för u]

m(1H1) = 1.007825200u ....................   neutronmassan i atomära massenheter (u) [HOP Table 2.1 s9–65]

u           = 1.66043 t27 KG  ..............     atomära massenheten [HOP Table 1.4 s7–27, 1967]

u           = 1.66041 t27 KG ...............     atomära massenheten [FOCUS MATERIEN 1975 s124sp1mn]

u           = 1.66053886 t27 KG  ........     atomära massenheten [teknisk kalkylator, lista med konstanter SHARP EL-506W (2005)]

u           = 1.6605402 t27 KG  ..........     atomära massenheten [@INTERNET (2007) sv. Wikipedia]

u           = 1.660538782 t27 KG  ......     atomära massenheten [från www.sizes.com],

CODATA rekommendation från 2006 med toleransen ±0,000 000 083 t27 KG (Committe on Data for Science and Technology)]

c₀          = 2.99792458 T8 M/S  .........    ljushastigheten i vakuum [ENCARTA 99 Light, Velocity, (uppmättes i början på 1970-talet)]

h           = 6.62559 t34 JS  .................    Plancks konstant [HOP s7–155]

e           = 1.602 · t19 C ......................   FOCUS MATERIEN 1975s666

G          = 6.670 · t11 JM/(KG)² ........   FOCUS MATERIEN 1975s666 (6,67 · 10^–11 Nm²kg^–1)

 

[BA]. BONNIERS ASTRONOMI 1978

— Det internationella standardverket om universum sammanställt vid universitetet i Cambridge, The Cambridge Encyclopaedia of Astronomy, London 1977.

[FM]. FOCUS MATERIEN 1975 — Fysikens, kemins och astronomins historia. Allt från atomen till universum — fysik, kemi, jordvetenskap och astronomi

[BKL]. BONNIERS KONVERSATIONS LEXIKON, 12 band A(1922)-Ö(1928) med SUPPLEMENT A-Ö(1929)

t för 10^–, T för 10⁺, förenklade exponentbeteckningar

PREFIXEN FÖR bråkdelar och potenser av FYSIKALISKA STORHETER

Här används genomgående och konsekvent beteckningarna

 

förkortning       för        förenklad potensbeteckning

 

d                       deci      t1

c                        centi     t2

m                      milli      t3

µ                       mikro   t6

n                       nano     t9

p                       pico      t12

f                        femto   t15

 

Alla Enheter anges här i MKSA-systemet (M meter, KG kilo[gram], S sekund, A ampere), alla med stor bokstav, liksom följande successiva tusenprefix:

K                      kilo       T3

M                     mega     T6

G                      giga       T9

T                       tera       T12

 

Exempel: Medan många skriver cm för centimeter skrivs här konsekvent cM (centiMeter).

 

MAC, här ofta använd förkortning för Modern ACademy (»Modern Academic Corridors») — etablerad vetenskap sedan början av 1800-talet

In UH often used abbreviation for modern academy — explicitly from the beginning of the 1800s

MAC — often used abbreviation in TNED for Modern ACademy

 

Toroid Nukleära Elektro MEKANISKA Dynamiken —— Toroid Nuclear Electromechanical Dynamics

 

  

 

The Atomic Nucleus -- 1 - 4 ¦ TAN 1 ¦ TAN 2 ¦ TAN 3 ¦ TAN 4 ¦ AllKeplerMath ¦ AllKeplerMath+

ArithmeticResonanses:

FOR THE UNINITIATED READER (Sep2024):

 

On the 10Jan2024 the below (217) specified bPETRIE (1881-1883) finally proving resolution was discovered — after some research on eventually matching integer numbers. The 217 match certifies, as we see (from The rJCIRCLE complex ¦ rJCIRCLEref) the bPETRIE 4534.40 inch specified measure with a 99.9999832% precision. It is well enough to certify the accurateness on Petrie’s Cheops Pyramid measurements. That also consolidates the rJCIRCLE investigations on the subject;

— Taking present (mJ) EarthMass on the Planck constant h=mcr deduced Neutron density Dmax gives a spherical radius of (all natural constants, plus mJ) rJ = (h/c0)(3mJ/π·m⁴)^1/3. 

The center of that sphere is precisely positioned in the sectional view of the Flinders Petrie group (1881-83) measures so called Queens Chamber in the Cheops Pyramid.

   The GOLDEN SECTION complex from the simple form of Cheops Rectangle bd=h² proves

(CALTEP ¦ CaseHistory) the coherences in the Petrie measured Cheops Pyramid construct. The square corners enveloping that type defined Pyramid, passes precisely on the edge of the calculated rJ sphere’s surface. That was the initial discovery on the 1Nov2017. Really.

   SOON ENOUGH — after a cup of Tea, relaxing on the new discovery, the 10Jan2024 — it was realized that the number 217 also connects to another Universal domain: UDHR10Dec1948. The Resolution 217(A) universal HumanRight declaration. It is also the absolute foundation (special case history) for this production in UniverseHistory (TNEDbegin1991).

 

We have two Resolution 217 in our known history — detailed to the last universal atom;

IN ORDER OF DISCOVERY-RECOGNITION — Resolution 217Short:

•     Resolution 217(A) UDHR10Dec1948 — Universal Declaration of Human Rights: 8 introducing paragraphs P1-8,

30 following articles A1-30 — study them and try to learn them from within (test-question-analyze, 24/7).

— Here in UH referred to as Humanright, the only (reminded) known universal Humanright knowledge domain:

gravitation, electricity: light, heat, magnetism — LIFE: The Periodic System of The Elements (KeplerResonances).

— The Atoms’ Spontaneous assembly — no decision, no voting — to you and me (and all the other fuckups).

   P1: ” Whereas recognition of the inherent dignity and ..”. Guaranteed Eternal Protection. 24/7. No breaks.

•     Resolution 217 (10Jan2024) — the TNED deduced rJCIRCLE-CheopsPyramidEnvelopingSphereRadius (rJ) number

defines the actual Flinders Petrie 1883 measured Cheops Pyramid (half) base (b) — in to a precision of

99.9999832%. It verifies the (ContractedConstruct) TNED/Petrie investigated Cheops Building Plan: All Petrie’s measured values verified (BpointDetermination). The Complex (also, apparently: not much else left to chose on) connects to The Origin of Script. See TheCLAIM — questioning the already long ago 2000y questioned idea of a UNsanctioned Geographic Israel: (GUARD!) the splitting of humanity — and the Quest of its reunion.

 

 

(Toroid Nuclear Electromechanical Dynamics), eller Toroidnukleära Elektromekaniska Dynamiken är den dynamiskt ekvivalenta resultatbeskrivning som följer av härledningarna i Planckringen h=m_nc₀r_n, analogt Atomkärnans Härledning. Beskrivningen enligt TNED är relaterad, vilket innebär: alla, samtliga, detaljer gör anspråk på att vara fullständigt logiskt förklarbara och begripliga, eller så inte alls. Med TNED förstås (således) också

RELATERAD FYSIK OCH MATEMATIK. Se även uppkomsten av termen TNED i Atomkärnans Härledning.

 

 

SHORT ENGLISH — TNED in general is not found @INTERNET except under this domain

(Universe[s]History, introduced @INTERNET 2008VII3).

TNED or Toroid Nuclear Electromechanical Dynamics is the dynamically equivalent resulting description following the deductions in THE PLANCK RING, analogous AtomNucleus’ Deduction. The description according to TNED is related, meaning: all, each, details claim to be fully logically explainable and understandable, or not at all. With TNED is (hence) also understood RELATED PHYSICS AND MATHEMATICS. See also the emergence of the term TNED in AtomNucleus’ Deduction.

 

KALKYLKORTEN från Microsofts ordbehandlingsprogram (MsWORKS 4.0 | Från WINDOWS 95-eran) fungerar tyvärr inte utan vidare i webbformer (htm/html-filer). I denna presentation visas enbart kalkylkortets bild.

 

UTVECKLAT (Apr2010):

Samtliga kalkylkort med original från MsWors 4.0 finns nu i UNIVERSUMS HISTORIA. Se särskild beskrivning med förteckning i MANUAL.

 

Unicode (infört separat 23Jun2025):

≠ ≈  ∫ ∫ Δ √ Δ ≠ → ∞ γ √ ω π τ ε ħ UNICODE — ofta använda tecken i matematiska-tekniska-naturvetenskapliga beskrivningar

— Ctrl+Shift+Q i Microsoft WORD direkt till SYMBOL

σ ρ ν ν υ π τ γ λ η  √ ħ ω →∞ →γ ≡  ¦ Alt+ 1..9 ☺☻♥☺♦♣♠•◘○ υ Ψ

Ω Φ Ψ Σ Π Ξ Λ Θ Δ ≈

α β γ δ ε λ θ κ π ρ τ φ ϕ σ ω ϖ ∏ √ ∑ ∂ ∆ ∫ ≤ ≈ ≥ ˂ ˃ ← ↑ → ∞ ↓  ↨Alt+23

ϑ ζ γ λ ξ

  α   β   γ   δ   ε   ζ    η

τ υ χ   χ ψ

Pilsymboler, direkt via tangentbordet:

Alt+24 ↑; Alt+25 ↓; Alt+26 →; Alt+27 ←; Alt+22 ▬

Alt+23 ↨ — även Alt+18 ↕; Alt+29 ↔

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

PNG-justerad 2011-07-24