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Untitled Document (1448 words) |
 | The horizontal acreage of the pyramid at the height of the floor of the king’s chamber is 9.87 or π². |
| If the height of the pyramid is taken as the diameter of a sphere, the surface area of all four sides of the pyramid is equal to the surface area of the sphere times 4/π and the volume of the pyramid is equal to the volume of the sphere times π/2. |
| The height of 126 cubits with a diagonal half base of 140 cubits and a half base of 99 cubits are the dimensions of the pyramid from the height the king's chamber shafts exit the pyramid. |
| Cones (196 words) |
| The altitude or height of a cone is the perpendicular distance from the vertex to the base. |
| The slant height of a cone is the distance from the vertex to a point on the circular base. |
| The slant height is the distance labeled " l " in the diagram. |
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