Okay let's try this again.

Volume of Pyramid is:

V = (1/3)L x w x h

v = (1/3) 440 x 440 x 280

v = (1/3) 54208000

V = 18069333.3333

Volume of truncated pyramid where a = 387.2314 cubits and b = 440 cubits

V = (1/3)(a2 + ab + b2)(h)

v = (1/3) [(387.2314 x 387.2314) + (387.2314 x 440) + (440 x 440)] x (33.58)

v = (1/3) [ (149948.15714596 + 170381.816 + 193600) x 33.58

v = (1/3) [513929.9732 x 33.58]

v = (1/3)17257768.500056

v = 5752589.5000

18069333.3333/5752589.5 = 3.14108

Whew that was tough

Best
Don Barone

"There is nothing as impenetrable as a closed mind"
and ..." if everything is a coincidence what is the point of studying or measuring or analyzing anything ?" db