THE D&M PYRAMID OF CYDONIA â THE ... - Souls of Distortion
THE D&M PYRAMID OF CYDONIA â THE ... - Souls of Distortion
THE D&M PYRAMID OF CYDONIA â THE ... - Souls of Distortion
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The D&M Pyramid – the Sibling <strong>of</strong> the Great Pyramid <strong>of</strong> Giza? 8<br />
Latitudinal<br />
position <strong>of</strong> GP<br />
( α / 2 = 30°<br />
)<br />
relative to<br />
Equator OH*<br />
radius a and<br />
H*<br />
H<br />
‘Equator’<br />
<strong>of</strong> Earth<br />
a<br />
α<br />
A<br />
α<br />
T 1<br />
T′ 1<br />
a<br />
Surface <strong>of</strong><br />
the planet:<br />
Circle with<br />
radius a and<br />
centre O<br />
B<br />
α<br />
a<br />
α<br />
E<br />
Latitudinal<br />
position <strong>of</strong> D&M<br />
( ψ = 40. 4°<br />
)<br />
relative to<br />
Equator OG*<br />
G*<br />
‘Equator’<br />
<strong>of</strong> Mars<br />
G<br />
γ<br />
b<br />
a<br />
T 2<br />
c<br />
ψ<br />
α /<br />
2<br />
2 η<br />
α<br />
T 3<br />
O<br />
ξ<br />
c<br />
a<br />
K K*<br />
Latitude <strong>of</strong> the<br />
tetrahedral constant<br />
(19.47°) b<br />
for Earth and Mars<br />
( ξ = 19. 6°<br />
)<br />
ε<br />
ς<br />
d<br />
ς<br />
C<br />
α = 60. 0° β = 85. 3°<br />
γ = 49. 6°<br />
ε = 45. 1° η = 34.7`°<br />
ζ = 55. 3°<br />
Fig. 2. D&M Floor plan as a cross-section <strong>of</strong> a planet<br />
F<br />
ψ = 40. 4° ξ = 19. 6°<br />
D<br />
2.2.3. The Spatial properties <strong>of</strong> the Basic Model<br />
Though we do not know the actual height <strong>of</strong> the D&M, we know its estimate (half a mile) and we may<br />
suppose that it was somehow associated with the base, as in the case <strong>of</strong> the Great pyramid <strong>of</strong> Giza.<br />
To this end consider the following hypothesis:<br />
The height <strong>of</strong> the D&M was such that the face areas were equal.<br />
Let l be the height <strong>of</strong> the G&M. Then the areas <strong>of</strong> the faces corresponding to the triangles T 1 , T 2 , T 3 are<br />
as follows<br />
1 2 2<br />
1 × a × h<br />
2 a l<br />
Z = + ; (16)