GEOMETRICAL PROOF
GEOMETRICAL PROOF
OF GOD’S CREATION
OF GOD’S CREATION
by
Pythagoras
Pythagoras:: “Geometry is knowledge of the eternally existent.“ “Geometry is knowledge of the eternally existent.“
Plato:
Plato: “Geometry existed before the creation… God ever geometrizes.” “Geometry existed before the creation… God ever geometrizes.”
Thomas
Thomas Hobbes:Hobbes: “Geometry is the only science that it hath pleased God “Geometry is the only science that it hath pleased God hitherto to bestow on mankind.”
hitherto to bestow on mankind.”
Isaac
unive
universe could happen only by rse could happen only by the willful reasothe willful reasoning of ning of its original $reatoits original $reatorr %hom & call the 'ord
%hom & call the 'ord God.”God.”
KING’S CHAMBER KING’S CHAMBER
(ing)s $hamber (ing)s $hamber
Measu#e(e"ts o) t!e G#eat Py#a(id’s i"*’s C!a(be# +i" Measu#e(e"ts o) t!e G#eat Py#a(id’s i"*’s C!a(be# +i" i"c!es,-Le"*t!
Le"*t! = a = a . . 412.1316378412.1316378 /idt!
/idt! = b = b .. 206.0658189206.0658189 . 0'%1'2'3245 6% . 0'%1'2'3245 6% 7ei*!t
7ei*!t = h= h . . 230.3885895230.3885895 . %&31&385'59 : . %&31&385'59 : '1''5&22959'1''5&22959 Floo# dia*o"al
Floo# dia*o"al = d = d . . 460.7771789460.7771789 . %&31&385'59 : . %&31&385'59 : √√8 .8 . . 0'%1'2'3245 :
. 0'%1'2'3245 : '1''5&22959'1''5&22959 Cubical dia*o"al
R!"ICA# $EAR R!"ICA# $EAR
A
A %&'()*a+ ,-a&%&'()*a+ ,-a& +also k"o<" as a +also k"o<" as a '+a& ,-a&'+a& ,-a&, is t!e le"*t! o) ti(e t!at , is t!e le"*t! o) ti(e t!at t!et!e Su" takes to #etu#" to t!e sa(e =ositio" i" t!e cycle o) seaso"s$ as see" )#o( Su" takes to #etu#" to t!e sa(e =ositio" i" t!e cycle o) seaso"s$ as see" )#o( Ea#t!> )o# e;a(=le$ t!e ti(e )#o( ?e#"al e@ui"o; to ?e#"al e@ui"o;$ o# )#o( Ea#t!> )o# e;a(=le$ t!e ti(e )#o( ?e#"al e@ui"o; to ?e#"al e@ui"o;$ o# )#o( su((e# solstice to su((e# solstice1
su((e# solstice to su((e# solstice1 A t#o=ical y
A t#o=ical yea# ca" e@ui?ea# ca" e@ui?ale"tly be deale"tly be de)i"ed as t!e )i"ed as t!e ti(e take" )oti(e take" )o# t!e Su"# t!e Su"ss t#o=ical lo"*itude +lo"*itudi"al =ositio" alo"* t!e ecli=tic #elati?e to its t#o=ical lo"*itude +lo"*itudi"al =ositio" alo"* t!e ecli=tic #elati?e to its =ositio" at t!e ?e#
=ositio" at t!e ?e#"al e@ui"o;, to i""al e@ui"o;, to i"c#ease by 23& de*#ees c#ease by 23& de*#ees +t!at is$ to co(=lete+t!at is$ to co(=lete o"e )ull seaso"al ci#cuit,1
o"e )ull seaso"al ci#cuit,1 1 %&'()*a+ ,-a&
1 %&'()*a+ ,-a& . . 365.242365.242 days days
A CIRC#E AN/ HE
T!e dista"ce ac#oss a ci#cle t!#ou*! t!e ce"te# is called t!e
T!e dista"ce ac#oss a ci#cle t!#ou*! t!e ce"te# is called t!e d)a-%-&d)a-%-& ++dd,1,1 T!e dista"ce a#ou"d a ci#cle is called t!e
T!e dista"ce a#ou"d a ci#cle is called t!e *)&*-&-*-*)&*-&-*- ++CC,1,1 T!e
T!e &ad)&ad) o) a ci#cle + o) a ci#cle +&&, is t!e dista"ce )#o( t!e ce"te# o) a ci#cle to a"y, is t!e dista"ce )#o( t!e ce"te# o) a ci#cle to a"y =oi"t
=oi"t o" o" t!e t!e ci#cleci#cle ++")"), is t!e #atio o) t!e ci#cu()e#e"ce o) a ci#cle to t!e, is t!e #atio o) t!e ci#cu()e#e"ce o) a ci#cle to t!e dia
dia(et(ete# e# +t!+t!is is ?al?alue ue is is a==a==#o;#o;i(ai(ateltely y 21'21'0'80'89%39%382882859459492%92%2502503113111 1 T!eT!e "u(be#
"u(be# *oes o" )o#e?e#1 7o<e?e#$ usi"* co(=ute#s$ (at!e(aticia"s !a?e *oes o" )o#e?e#1 7o<e?e#$ usi"* co(=ute#s$ (at!e(aticia"s !a?e bee"
bee" able able to to calculate calculate t!e t!e ?alue ?alue o)o) to t!ousato t!ousa"ds o) "ds o) =laces,1 =laces,1 T!is #elatT!is #elatio"Bio"B s!i= is e;=#essed i"
s!i= is e;=#essed i" t!e )ollo<i"* )o#(ula-t!e )ollo<i"* )o#(ula-C = d C = d d = 1 d = 1 = 3.14159 = 3.14159 C= C= ': 21'0'89 ': 21'0'89 = 3.14159 = 3.14159 u"itsu"its 21'0'89 - 2381%0% . 21'0'89 - 2381%0% . 0.0086 0 13930.0086 0 1393
CIRC#E ! HE NMBER 1 !NE AN/ HE S:ARE CIRC#E ! HE NMBER 1 !NE AN/ HE S:ARE
& = 0.5 & = 0.5
A#ea o) t!e Ci#cle
A#ea o) t!e Ci#cle AA . . &; =&; = &18 : 21'0'89 .&18 : 21'0'89 . 0.78739750.7873975 s@ua#ed u"its s@ua#ed u"its = = A#eaA#ea o) t!e S@ua#e
o) t!e S@ua#e BB
** . o"e side . o"e side o) t!e S@ua#eo) t!e S@ua#e B = B = &14542948 .&14542948 . 0.8862265510.886226551 4*
4* . . 3.5449062053.544906205
#-<%h ' %h- K)<’ Chab-&
#-<%h ' %h- K)<’ Chab-& .. 412.1316378412.1316378 +i"c!es,- +i"c!es,-218009&3%&8 - 0'%1'2'3245
218009&3%&8 - 0'%1'2'3245 = = 0.0086013930.008601393
1 ,-a&
1 ,-a& . 2381%0% days- . 2381%0% days-2381%0% : &1&&53&'292 2381%0% : &1&&53&'292 = 3.14159= 3.14159 . . ++")"),, CIRC#E ! A $EAR CIRC#E ! A $EAR C = C = 2381%0% days2381%0% days dd .. 116.2602377116.2602377 days days
a =
a = ''31%3&%244 days''31%3&%244 days b = 1
b = 1 dayday
' - ''31%3&%244 .
' - ''31%3&%244 . 0.008601393 0.008601393 = = ta"ta" ' - %
' - % = 0.5 = 0.5
&18 - &1&&53&'292
&18 - &1&&53&'292 . ''31%3&%244 - % .. ''31%3&%244 - % . 58.1301188558.13011885 + !ei*!t o) t!e G#eat + !ei*!t o) t!e G#eat Py#a(id is
Py#a(id is 5813.0118855813.011885 +i"c!es,1 +i"c!es,1
I) a ce#tai" obect <as to t#a?el <it! a s=eed o) 851'2&''558 k(6sec1$ )o# %0 I) a ce#tai" obect <as to t#a?el <it! a s=eed o) 851'2&''558 k(6sec1$ )o# %0 !ou#s +' day, it <ould t#a?el a dista"ce o) 8$&%%$00%1%39
!ou#s +' day, it <ould t#a?el a dista"ce o) 8$&%%$00%1%39 k(-8$&%%$00%1%39 : &1&&53&'292' .
8$&%%$00%1%39 : &1&&53&'292' . 43>20043>200 . esote#ic "u(be# o) t!e Ea#t!’s a"d . esote#ic "u(be# o) t!e Ea#t!’s a"d G#eat Py#a(id’s =#o=o#tio"1
G#eat Py#a(id’s =#o=o#tio"1
ASR!N!MIC
ASR!N!MICA# NI 1 A# NI 1 AA
dd .. 1 1 & = 0.5 & = 0.5
A#ea o) t!e Ci#cle
T!
T!e a?ee a?e#a#a*e s=*e s=eeeed at <!d at <!icic! t!e E! t!e Ea#a#t! #et! #e?o?ol?l?es a#es a#ouou"d t!"d t!e Su" ie Su" iss 29.78588146
29.78588146 k(-
k(-%9145855'03 - &1&&53&'292 .
%9145855'03 - &1&&53&'292 . 3462.9136773462.913677 Esote#ic "u(be# o) t!e Ea#t!’s
Esote#ic "u(be# o) t!e Ea#t!’s a"d G#eat Py#a(id’s =#o=o#tio"1 .a"d G#eat Py#a(id’s =#o=o#tio"1 . 43>20043>200 1 A =
1 A = '09$894$54&'09$894$54& k(- k(-'09$894$54& - 02$%&& .
'09$894$54& - 02$%&& . 34>62.91365734>62.913657 k( k( 20$3%19'2384 :
20$3%19'2384 : &1&&53&'292 .&1&&53&'292 . 29.7858812929.78588129 k( . t!e Ea#t!’s a?e#a*e s=eed k( . t!e Ea#t!’s a?e#a*e s=eed a#ou"d t!e Su"1
A
A %&'()*a+ ,-a&%&'()*a+ ,-a& +also k"o<" as a +also k"o<" as a '+a& ,-a&'+a& ,-a&, is t!e le"*t! o) ti(e t!at t!e, is t!e le"*t! o) ti(e t!at t!e Su" takes to #etu#" to t!e sa(e =ositio" i" t!e cycle o) seaso"s$ as see" )#o( Su" takes to #etu#" to t!e sa(e =ositio" i" t!e cycle o) seaso"s$ as see" )#o( Ea#t!> )o# e;a(=le$ t!e ti(e )#o( ?e#"al e@ui"o; to ?e#"al e@ui"o;$ o# )#o( Ea#t!> )o# e;a(=le$ t!e ti(e )#o( ?e#"al e@ui"o; to ?e#"al e@ui"o;$ o# )#o( su((e#
su((e# solstice solstice to su(to su((e# so(e# solstice1lstice1 1 %&'()*a+ ,-a& =
1 %&'()*a+ ,-a& = 365.242365.242 da,da,
T!e Ea#t! (
T!e Ea#t! (o?es a#oo?es a#ou"d t!e Su"u"d t!e Su"1 As t!e Ea#t! (o?1 As t!e Ea#t! (o?es a#ou"es a#ou"d t!e Su" it isd t!e Su" it is also s=i""i"*1 It takes
also s=i""i"*1 It takes 24 h'&24 h'& +o"e day, to s=i" a#ou"d o" its a;is B t!e a;is +o"e day, to s=i" a#ou"d o" its a;is B t!e a;is is a" i(a*i"a#y li"e t!#ou*! t!e (iddle o) t!e Ea#t! )#o( t!e No#t! =ole
is a" i(a*i"a#y li"e t!#ou*! t!e (iddle o) t!e Ea#t! )#o( t!e No#t! =ole to t!eto t!e Sout! =ole1
Sout! =ole1
*arth)s e+uator ,red *arth)s e+uator ,red
line-0&$&441%40'5 - 2381%0% .
0&$&441%40'5 - 2381%0% . 109.728109.728 k( k( ' yea# . 2381%0% +days,
' yea# . 2381%0% +days, /!at #e=#ese"ts 238
/!at #e=#ese"ts 2381%0%t! =a#t o) 1%0%t! =a#t o) o"e day Let’s look at io"e day Let’s look at itt ' - 2381%8% .
' - 2381%8% . 0.002737910.00273791 days . days . &1&384&9585 !ou#s . 2190%89'054 (i"utes&1&384&9585 !ou#s . 2190%89'054 (i"utes .. 236.5554892@236.5554892@ +seco"ds,1 +seco"ds,1
365.242%h (a&% ' a da, )
365.242%h (a&% ' a da, ) 236.5554892@236.5554892@ -*'d.-*'d. Acco#di"* t
Acco#di"* to t!e Go t!e G#eat Py#a(#eat Py#a(id t!e id t!e Ea#t! s=i""i"Ea#t! s=i""i"* a#ou"d * a#ou"d its o<" its o<" a;is <it!a;is <it! t!e s=eed o)
t!e s=eed o) 0.463857340.46385734 k(6 sec1- k(6 sec1-%231888059%H : &103258420 k( .
%231888059%H : &103258420 k( . 109.728109.728 k( . k( . 365.242365.242Bt! =a#Bt! =a#t o) t o) a o"e a o"e day1day1
A<+- ' %h- ",&a)d’ /-*-d)< "aa<
A<+- ' %h- ",&a)d’ /-*-d)< "aa<e +e +E"E" . to No#t! Ecli=tic Pole, . . to No#t! Ecli=tic Pole, . %312&%3594
%312&%3594
Si"e %312&%3594 .
Si"e %312&%3594 . 0.4431132750.443113275
#-<%h ' %h- ",&a)d’ K)<’ Chab-& =
#-<%h ' %h- ",&a)d’ K)<’ Chab-& = 412.1316378412.1316378 +i"c!es,+i"c!es, 0'%1'2'3245 : &1002''2%48
")
") .. 3.141593.14159
21'0'89 - 2381%0% .
21'0'89 - 2381%0% . 0.0086013930.008601393
T!e G#eat Py#a(ids a"*le .
T!e G#eat Py#a(ids a"*le . 8'1582994808'158299480 Ta"*e"t
Ta"*e"t 8'158299480 8'158299480 . '. '1%42%0&3%'1%42%0&3%' Fou#t!
Fou#t! =a#t o=a#t o) ) '1%42%0&3%' '1%42%0&3%' .. 0.3183101550.318310155
&12'52'&'88 : &1&&53&'292 .
&12'52'&'88 : &1&&53&'292 . 0.00273791 0.00273791
1 ,-a& =
1 ,-a& = 365.242365.242 daysdays 2381%0%
2381%0% : &12'52'&'88 .: &12'52'&'88 . 116.2602377116.2602377 daysdays 2381%0% : &1&&53&'292 .
2381%0% : &1&&53&'292 . 3.141593.14159daysdays ''31%3&%244 : 21'0'89 .
''31%3&%244 : 21'0'89 . 365.242365.242daysdays 2381%0% : &1&&%4249' .
2381%0% : &1&&%4249' . 1 1dayday
Ci#cu()e#e"ce o) t!e Ci#cle
Ci#cu()e#e"ce o) t!e Ci#cle AA . ' +o"e e"tity,. ' +o"e e"tity, ' - 21'0'89
C =
C = 0.282094910.28209491
4C =
4C = 1.1283796431.128379643
'1'%5249302 : 2381%0% .
'1'%5249302 : 2381%0% . 412. 412.13113163763788 +i+i" " i"i"c!c!es es t!t!atat’s ’s t!t!e e lele"*"*t! t! o) o) t!t!ee Py#a(id’s i"*’s C!a(be#,1
Py#a(id’s i"*’s C!a(be#,1
/)a-%-&
/)a-%-& + +dd, ., . 11 Rad) & = 0.5 Rad) & = 0.5
H-)<h% ' %h- G&-a% ",&a)d =
H-)<h% ' %h- G&-a% ",&a)d = 232.5204754232.5204754 sac#ed cubitssac#ed cubits = = 5813.0118855813.011885
i"c!es1 i"c!es1
3.14159 365.242 =
3.14159 365.242 = 0.0086013930.008601393
&18 - 851'2&''558
&18 - 851'2&''558 = = &1&&53&'292&1&&53&'292 &1&&53&'292 :%2%18%&0480
&1&&53&'292 :%2%18%&0480 == 2d2d A" Ast#o"o(ical J"it +
A" Ast#o"o(ical J"it +1 1 AA, is t!e (ea" dista"ce bet<ee" t!e Ea#t! a"d, is t!e (ea" dista"ce bet<ee" t!e Ea#t! a"d t!e
Su"-t!e Su"- 149>597>870149>597>870 k($ a"d it’s t!e k($ a"d it’s t!e &ad)&ad) ++&&, o) t!e Ea#t!’s o#bit a#ou"d, o) t!e Ea#t!’s o#bit a#ou"d t!e Su"$ <!at t!is (ea"s is t!at
2>57
2>573>5003>500.157 .157 232.232.520475204754 54 = = 59>8359>839>1489>148 k( .k( . 2d2d . t<o dia(ete#s o) t!e . t<o dia(ete#s o) t!e Ea#t!’s o#bit +
Ea#t!’s o#bit +4 A4 A,1,1
Geo(et#y a"d ti(e a#e i" co""ectio"1 T!is is t!e *lobal$ cos(ic #ule o) t!e Geo(et#y a"d ti(e a#e i" co""ectio"1 T!is is t!e *lobal$ cos(ic #ule o) t!e *eo(et#y$ t!e #ule )o# all ci#cles a"d )o# t!e o#bits o) t!e all =la"ets1 T!e *eo(et#y$ t!e #ule )o# all ci#cles a"d )o# t!e o#bits o) t!e all =la"ets1 T!e sou#ce o) t!is #ule is i" t!e Ea#t!’s ti(e$
sou#ce o) t!is #ule is i" t!e Ea#t!’s ti(e$ ) %h- b-&) %h- b-& 365.242365.242$ t!e "u(be#$ t!e "u(be# o)
o) days odays o) t!e Ea) t!e Ea#t!’s #t!’s sola# sola# +t#o+t#o=ical=ical, yea#, yea#1 T!e S1 T!e Su"’s *u"’s *#a?i#a?ity )o#ty )o#ces a#ces a#ee #uli"* o?e# t!e Ea#t! t!#ou*! t!e *eo(et#ical =#o=o#tio" o) t!e "u(be# #uli"* o?e# t!e Ea#t! t!#ou*! t!e *eo(et#ical =#o=o#tio" o) t!e "u(be# 365.242
365.24211
/!o (ade all t!ese esti(ates a"d t!ese (easu#e(e"ts$ a"d <!o co"sta"tly /!o (ade all t!ese esti(ates a"d t!ese (easu#e(e"ts$ a"d <!o co"sta"tly !olds t!is i"
!olds t!is i" bala"ce T!e a"s<e# is- bala"ce T!e a"s<e# is- t!e Al(i*!ty God t!e Al(i*!ty God t!e C#eato#t!e C#eato#
SN AN/ NMBERS ! HE
SN AN/ NMBERS ! HE GREA "$RAMI/GREA "$RAMI/
ha% ) %h- ba- ' %h- G&-a% ",&a)d
ha% ) %h- ba- ' %h- G&-a% ",&a)d A base is )ou"datio"- lo<est A base is )ou"datio"- lo<est su=
su==o#=o#t t o) a o) a st#st#uctuctu#u#e1e1 h- G&-a% ",&a)d Da b)+% ' %h- ba- ' %h-h- G&-a% ",&a)d Da b)+% ' ba- ' %h-<&'d '+)d &'*F
<&'d '+)d &'*F &-d +)-&-d +)-1 T!e base le"*t! o) t!e G#eat Py#a(id +1 T!e base le"*t! o) t!e G#eat Py#a(id + ABAB, is, is 231.92867
231.92867 (ete#s1 (ete#s1 ha%
ha% ) ) %h- %h- h-)<h%h-)<h% T!e ?e#tical di(e"sio" o) e;te"sio"> dista"ce )#o( t!e T!e ?e#tical di(e"sio" o) e;te"sio"> dista"ce )#o( t!e base o) so(et!i"* to
base o) so(et!i"* to t!e to= /!at is t!e to= /!at is t!e #eal !ei*!t o) t!e #eal !ei*!t o) t!e G#eat Py#a(idt!e G#eat Py#a(id I%I% )
) h-)<h% h-)<h% ab'- ab'- <&'d<&'d +--+ ' %h- ba- %' %h- %'( ' %h- ",&a)d> -&%)*a+ +--+ ' %h- ba- %' %h- %'( ' %h- ",&a)d> -&%)*a+ d)%a*- &' %h- ba- ' %h- (a--% %' %h- %'( ' %h- ",&a)d.
d)%a*- &' %h- ba- ' %h- (a--% %' %h- %'( ' %h- ",&a)d. T!eT!e o#i*i"al !ei*!t o) t!e G#eat Py#a(id +
T!e G
T!e G#eat P#eat Py#a(iy#a(id is a *d is a *eo(eeo(et#icat#ical a"d l a"d ast#oast#o"o(i"o(ical (acal (a=1 Ma=1 Ma=s =#e=s =#ese"tse"t *eo*#a=!ical i")o#(atio" at a #educed scale1
*eo*#a=!ical i")o#(atio" at a #educed scale1 I" o#de# )o# t!e i")o#(atio" to I" o#de# )o# t!e i")o#(atio" to bebe use)ul to t!e (a=s use#$ t!e #elati?e =#o=o#tio"s o) *eo*#a=!ic )eatu#es a"d use)ul to t!e (a=s use#$ t!e #elati?e =#o=o#tio"s o) *eo*#a=!ic )eatu#es a"d s=atial #elatio"s!i=s (ust be ke=t as accu#ate as =ossible
s=atial #elatio"s!i=s (ust be ke=t as accu#ate as =ossible.. Scale
Scale +=#o+=#o=o#t=o#tio",io", is t!e (at!e(atical #elatio"s!i= bet<ee" a dista"ceis t!e (at!e(atical #elatio"s!i= bet<ee" a dista"ce bet<ee"
bet<ee" t<o t<o =oi"ts =oi"ts o" o" t!e t!e (a= (a= a"d a"d t!e t!e dista"ce dista"ce bet<ee" bet<ee" t<o t<o co##es=o"di"*co##es=o"di"* =oi"ts o" t!e *#ou"d1 T!e #elatio"s!i= is
=oi"ts o" t!e *#ou"d1 T!e #elatio"s!i= is e;=#essed as a #atio$ t!e e;=#essed as a #atio$ t!e )i#st "u(be#)i#st "u(be# bei"*
bei"* t!e t!e dista"ce dista"ce bet<ee" bet<ee" t<o t<o =oi"ts =oi"ts o" o" t!e t!e (a= (a= a"d a"d t!e t!e seco"d seco"d "u(be#"u(be# bei"*
bei"* t!e t!e actual actual dista"ce dista"ce #e=#ese"ted1 T!e #e=#ese"ted1 T!e "u(be# i"dicati"* "u(be# i"dicati"* (a= (a= dista"ce dista"ce isis al<ays o"e1 T!us$ a (a= <it! a scale o) '-'&&& tells t!e (a= use# t!at e?e#y al<ays o"e1 T!us$ a (a= <it! a scale o) '-'&&& tells t!e (a= use# t!at e?e#y u"it o) dista"ce o" t!e (a= e@uals '&&& o) t!e sa(e u"its o) dista"ce o" t!e u"it o) dista"ce o" t!e (a= e@uals '&&& o) t!e sa(e u"its o) dista"ce o" t!e *#ou"d1 T!e u"its o) dista"ce used a#e "ot i(=o#ta"t as lo"* as t!ey a#e t!e *#ou"d1 T!e u"its o) dista"ce used a#e "ot i(=o#ta"t as lo"* as t!ey a#e t!e sa(
sa(e e o" o" botbot! ! sidsides es o) t!e o) t!e #at#atio1 O"e io1 O"e ce"ce"ti(ti(eteete# # o" t!e o" t!e (a= o) (a= o) t!e G#eat!e G#eatt Py
Py#a#a(i(id d <o<oululd d e@e@uaual l '&'&&& && cece"t"ti(i(etete#e#s s o" o" t!t!e e *#*#ouou"d"d$ $ ' ' i"i"c! c! o" o" t!t!ee Py#a(id’s (a= <ould e@ual '&&& i"c!es o" t!e *#ou"d$ a"d ' (ete# o" t!e Py#a(id’s (a= <ould e@ual '&&& i"c!es o" t!e *#ou"d$ a"d ' (ete# o" t!e (a= <ould e@ual '&&& (ete#s
(a= <ould e@ual '&&& (ete#s o" t!e *#ou"d1o" t!e *#ou"d1 T!e G#ea
T!e G#eat Py#a(it Py#a(id is a d is a *eo(e*eo(et#icat#ical a"d ast#o"ol a"d ast#o"o(ical (a=(ical (a=- - t!e !ei*!t!e !ei*!t t o)o) '04138&8&'9
'04138&8&'9 ( o" ( o" t!e Pyt!e Py#a(id’s #a(id’s (a= is (a= is '04$38&18&'9 '04$38&18&'9 ( ( o) o) actual dactual dista"ceista"ce o# '04138&8&'9 k(1
B
B/ =/ = No#t! No#t! c!a""el c!a""el +Kai# +Kai# s!a)tH, s!a)tH, )#o( )#o( t!e t!e i"*’s i"*’s C!a(be#1 C!a(be#1 T!e T!e a"*le a"*le o)o) asce"d o) t!is c!a""el
asce"d o) t!is c!a""el is 2%105'38580 de*#ees1is 2%105'38580 de*#ees1 Ta"*e"t
Ta"*e"t o) o) 2%105'38580 2%105'38580 .. 0.636620310.63662031
T!e slo=e a"*le o)
T!e slo=e a"*le o) t!e G#eat Py#a(id t!e G#eat Py#a(id is 8'158299480 dis 8'158299480 de*#ees1e*#ees1 Ta"*e"t Ta"*e"t o) o) 8'158299480 8'158299480 .. 1.2732406211.273240621 0.63662031 2 = 0.63662031 2 = 1.273240621 1.273240621 1.273240621 8 1.273240621 8 == 10.1859249710.18592497
)&% -a(+- )&% -a(+- AB = AB = 231.92867231.92867 4AB 4AB .. 927.71468927.71468 = 4/= 4/ H = H = 147.6505019147.6505019 Ta"*e"t Ta"*e"t o) o) 8'158299480 8'158299480 .. 1.2732406211.273240621 '1%42%0&3%' : 5 '1%42%0&3%' : 5 == 10.1859249710.18592497 '&1'589%094
'&1'589%094 '04138&8&'9 .'04138&8&'9 . 1503.9569341503.956934
'8
'8&2&21919838392920 0 : : 9%9%41414'4'030355 == 1>395>242.9261>395>242.926 == i"i" F)+'-%-&F)+'-%-& t!t!is is is t!eis t!e d)a-%-&
d)a-%-& o) t!e o) t!e SS11 S-*'d -a(+- S-*'d -a(+- 4AB 4AB .. 927.71468927.71468 H = H = 147.6505019147.6505019 Ta"*e"t Ta"*e"t o) o) 8'158299480 8'158299480 .. 1.2732406211.273240621 927.71468 147.6505019 927.71468 147.6505019 .'23$9441825' .'23$9441825' 5 : '23$9441825' . 5 : '23$9441825' . '$&98$5%&12&8'$&98$5%&12&8 '$&98$5%&12&8 : '1%42%0&3%' . '$&98$5%&12&8 : '1%42%0&3%' . 1>395>242.9261>395>242.926 h)&d -a(+- h)&d -a(+- 4AB 4AB .. 927.71468927.71468 Ta"*e"t Ta"*e"t o) o) 8'158299480 8'158299480 .. 1.2732406211.273240621 9%414'035 : '1%42%0&3%' .
''5'1%&0&'8 : ''5'1%&0&'8 ''5'1%&0&'8 : ''5'1%&0&'8 = = 1>395>242.926 1>395>242.926 '&%h -a(+- '&%h -a(+- AB = AB = 231.92867231.92867 H = H = 147.6505019 147.6505019 Ta"*e"t Ta"*e"t o) o) 8'158299480 8'158299480 .. 1.2732406211.273240621 %2'19%534 : '04138&8&'9 . %2'19%534 : '04138&8&'9 . 34>244.3845334>244.38453 20$%00125082 : '1%42%0&3%' 20$%00125082 : '1%42%0&3%' == 43>601.3414343>601.34143 02$3&'120'02 : 2% . 02$3&'120'02 : 2% . 1>395>242.926 1>395>242.926 )%h -a(+- )%h -a(+- 2AB = 2AB = 463.85734463.85734 H = H = 147.6505019147.6505019 Ta"*e"t Ta"*e"t o) o) 8'158299480 8'158299480 .. 1.2732406211.273240621 032158420 : '04138&8&'9 032158420 : '04138&8&'9 == 68>488.76906 68>488.76906 35$0551439&3 : '1%42%0&3%' . 35$0551439&3 : '1%42%0&3%' . 87>202.6828587>202.68285 54$%&%135%58 : '3 . 54$%&%135%58 : '3 . 1>395>242.926 1>395>242.926 S)%h -a(+- S)%h -a(+- H H . '04138&8&'9 . '04138&8&'9 Ta"*e"t Ta"*e"t o) o) 8'158299480 8'158299480 .. 1.2732406211.273240621 '1%42%0&3%' : 5 '1%42%0&3%' : 5 == 10.1859249710.18592497
'&1'589%094
'&1'589%094 :: '04138&8&'9 .'04138&8&'9 . 1503.9569341503.956934
Le"*t! o) t!e i"*’s
Le"*t! o) t!e i"*’s C!a(be# C!a(be# = = 412.1316378412.1316378 i"c!es i"c!es ' yea# .
' yea# . 365.242365.242 days days
0'%1'2'3245 : '1%42%0&3%' . 8%0140%40%0 i"c!es . 0'%1'2'3245 : '1%42%0&3%' . 8%0140%40%0 i"c!es . 1332.8465661332.846566 c(c( '8&21983920 '8&21983920 -- '22%1503833 . '1'%5249300'22%1503833 . '1'%5249300 '1'%5249300 '1'%5249300 : : 2381%0% 2381%0% . 0'%1'2. 0'%1'2'3245'3245
T!e a"*le o) Desce"di"* Passa*e is
T!e a"*le o) Desce"di"* Passa*e is 26.302689726.3026897 de*#ees1 de*#ees1 Si"e o) %312&%3594 . Si"e o) %312&%3594 . 0.4431132750.443113275 Ta"*e"t Ta"*e"t o) o) 8'158299480 8'158299480 .. 1.2732406211.273240621 '1%42%0&3%' : 5 '1%42%0&3%' : 5 == 10.1859249710.18592497 '&1'589%094
'&1'589%094 :: '04138&8&'9 .'04138&8&'9 . 1503.9569341503.956934
Le"*t! o) t!e i"*’s
Le"*t! o) t!e i"*’s C!a(be# C!a(be# = = 412.1316378412.1316378 i"c!es i"c!es T!e base le"*t! o) t!e G#eat Py#a(id +
T!e base le"*t! o) t!e G#eat Py#a(id +ABAB, is, is 231.92867231.92867 (ete#s1 (ete#s1 0'%1'2'3245 : '1%42%0&3%' . 8%0140%40%0 i"c!es . 0'%1'2'3245 : '1%42%0&3%' . 8%0140%40%0 i"c!es . 1332.8465661332.846566 +c(,+c(, '22%1503833 - % . '22%1503833 - % . 666.423283 666.423283 33310%2%52 33310%2%52 - - &1002''2%48 &1002''2%48 .. 1503.956934 1503.956934
The Great Pyramid
The Great Pyramid sits on the sits on the 3th parallel (no3th parallel (northward from the erthward from the euator touator to 3*+ latitude)!
3*+ latitude)! *
* of the arth-s cur'ed surfaceof the arth-s cur'ed surface .. 111111 kmkm 3* .
3* . 33303330 km km
-- /en0th of the Pyramid1s First base . 23!"2#$% m/en0th of the Pyramid1s First base . 23!"2#$% m -- PyrPyramiamid1s &econd d1s &econd base . base . 23!23!%%" " mm
4ean len0th .
4ean len0th . 231.1672098231.1672098 (m) (m) 333
333 5 5 23!$%2"#23!$%2"# 769,786.8085 769,786.8085 in kilometersin kilometers this is thethis is the meanmean diameter of th
diameter of the 4oon1s e 4oon1s orbit orbit around the around the artharth (orbital(orbital radius .radius . 384,893.4042384,893.4042 km)!
km)! 6ccor
6ccordin0 din0 to thto the Greae Great Pyrt Pyramid 4amid 4oon-oon-s a'ers a'era0e dia0e distanstance from ce from arth arth isis 384,893.4042
384,893.4042 km km . . raraddiuius s of of ththe e 4o4oonon11s s ororbibit t (s(scicienentitiststs s knknow ow ththat at ththee a'era0e distance between the centers of the arth and the 4oon is about a'era0e distance between the centers of the arth and the 4oon is about 3#, kilometers)!
ASTRONOMIC
ASTRONOMICA! UNIT A! UNIT AND PYRAMID’S NUMBERSAND PYRAMID’S NUMBERS
7istance
7istance from artfrom arth h to to the the &un &un .. 149,597,870149,597,870 km . 6stronomical unit ( km . 6stronomical unit (11 AU
AU)!)! arth1s
arth1s a'era0e a'era0e speed speed of of re'olution re'olution around around the the &un &un isis 29.7858814629.78588146 km8sec!
km8sec!
","%,#% : 2"!%###$ .
","%,#% : 2"!%###$ . ,22,2!2$%,22,2!2$% 9ith the
9ith the speed of speed of 2"!%###$ 2"!%###$ km8s to tkm8s to tra'el a dra'el a distance of istance of ","%,#% ","%,#% kmkm one obect needs ,22,2!2$% seconds .
one obect needs ,22,2!2$% seconds . #3,%%!3% minutes .#3,%%!3% minutes . . 3"!22#2 hours .
. 3"!22#2 hours . 58.1301188358.13011883 days! days! The number of the Pyramid1s hei0ht .
The number of the Pyramid1s hei0ht . 5813.0118855813.011885 (inches) (inches) #!3##3 5 2
#!3##3 5 2 116.2602377 116.2602377 (in inches this is len0th of (in inches this is len0th of the 6ntechamber)!the 6ntechamber)! 9ith the speed of
9ith the speed of 29.7858814629.78588146 km8skm8s one obect needsone obect needs 116.2602377116.2602377 days to days to tra'el the diameter of the arth1s orbit !
tra'el the diameter of the arth1s orbit ! 1 "#$%
The
The harmonharmony oy of f propoproportions rtions betwbetween een the the si<e si<e of oof orbit, rbit, orbitaorbital spl speed eed andand time of the orbital re'olution corresponds only for arth and the &un, not for time of the orbital re'olution corresponds only for arth and the &un, not for any other planets and &un! =s it one coincidence> +o, it is not? 9hy not> any other planets and &un! =s it one coincidence> +o, it is not? 9hy not> @ecause the knowled0e is on the arth, a man is on the arth and God 0i'es @ecause the knowled0e is on the arth, a man is on the arth and God 0i'es Ais own si0nature with these proportions when Ae created this world and a Ais own si0nature with these proportions when Ae created this world and a man on the world! +umbers of the Great Pyramid are the witnesses of the man on the world! +umbers of the Great Pyramid are the witnesses of the God1s Breation of the world!
God1s Breation of the world!
CONC!USION CONC!USION &T'#(, ) &T'#(, )" (*+# " (*+# %#(/, %#(/, #*)#%" #*)#%" /%$ /%$ '# * '# * *$%/ %*$%/ %', $(', $(// %#$# '# % * '**'", $(/ %# '$ '' (* ('$" %#$# '# % * '**'", $(/ %# '$ '' (* ('$" $*#/ * $ /*(. $*#/ * $ /*(. C Plato C Plato The ancient
The ancient 0yptians did 0yptians did not know not know all this, all this, which means which means that they that they were notwere not the architects and the builders of the
the architects and the builders of the Great Pyramid!Great Pyramid! 9ho was t
9ho was the archhe architect ditect durin0 turin0 that anchat ancient tient time who waime who was famils familiar with iar with thethe 0eometry of the measurements between the Great Pyramid, arth, &un and 0eometry of the measurements between the Great Pyramid, arth, &un and Time> God created the Dni'erse, arth and the architectural plan of the 0reat Time> God created the Dni'erse, arth and the architectural plan of the 0reat Pyramid by Aimself! 6nd Ae askin0:
Pyramid by Aimself! 6nd Ae askin0: &'* &'* ' '$' '$ /$%#( /$%#(#' *(# #' *(# +" *%/ +" *%/ '* '* (*#/#:(*#/#: ;%/ (* '" *( # $ )$(< *% I /#)$(/ * '##, $(/ $(#% ;%/ (* '" *( # $ )$(< *% I /#)$(/ * '##, $(/ $(#% '* )#. '* )#. '#%# $ '* '#( I $/ '# '#%# $ '* '#( I $/ '# *(/$*( * '# #$%'*(/$*( * '# #$%':: /#$%#, '* '$ (/#%$(/(. '* '$' $/ '# )#$%# '#%#*, /#$%#, '* '$ (/#%$(/(. '* '$' $/ '# )#$%# '#%#*, '* (*#: *% '* '$' %#'#/ '# '* (*#: *% '* '$' %#'#/ '# (# *( : '#%#*( $%#(# *( : '#%#*( $%# '# *(/$*( '#%#* $#(#/: *% '* $/ '# *%(#% *(# '# *(/$*( '#%#* $#(#/: *% '* $/ '# *%(#% *(# '#%#*<'#%#*< '#( '# '#( '# )*%(( $% $( *#)*%(( $% $( *#'#%, $(/ $ '# *( * ;*/ '*#'#%, $(/ $ '# *( * ;*/ '*#// *% =*": *% =*": (Eob, 3#, 2;%)(Eob, 3#, 2;%)