My Dad has a miniature
Pyramid of Egypt. It is 5 inches in height. Dad was invited to display it at an
exhibition. Dad felt it was too small and decided to build a scaled-up model of
the Pyramid out of material whose density is (1 / 9) times the density of the
material used for the miniature. He did a "back-of-the-envelope"
calculation to check whether the model would be big enough.
If the mass (or weight) of the miniature and the scaled-up model are to be the same, how many inches in height will be the scaled-up Pyramid? Give your answer to two places of decimal.
If the mass (or weight) of the miniature and the scaled-up model are to be the same, how many inches in height will be the scaled-up Pyramid? Give your answer to two places of decimal.
Hint: If
mass is to be the same, then density is inversely proportional to volume.
Also, the volumes are directly proportional to the cubes of the heights for objects that are geometrically similar.
Also, the volumes are directly proportional to the cubes of the heights for objects that are geometrically similar.
this is some serious math problem
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