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2 August, 14:44

A rectangular prism with a volume of 2 cubic units is filled with cubes with side lengths of 1/4 unit. How many 1/4 unit cubes does it take to fill the prism

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Answers (2)
  1. 2 August, 14:59
    0
    128 cubes.

    Step-by-step explanation:

    Volume of each cube = (1/4) ^3 = 1/64 cubic units.

    Number of cubes that will fill the prism

    = 2 / 1/64

    = 2*42

    = 128 answer
  2. 2 August, 16:22
    0
    128

    Step-by-step explanation:

    Method A.

    The volume of the prism is 2 cubic units.

    Each cube has side length of 1/4 unit.

    The volume of each cube is (1/4) ^3 cubic unit.

    The volume of each cube is 1/64 cubic unit.

    To find the number of cubes that fit in the prism, we divide the volume of the prism by the volume of one cube.

    (2 cubic units) / (1/64 cubic units) =

    = 2 / (1/64)

    = 2 * 64

    = 128

    Method B.

    Imagine that the prism has side lengths 1 unit, 1 unit, and 2 units (which does result in a 2 cubic unit volume.) Since each cube has side length 1/4 unit, then you can fit 4 cubes by 4 cubes by 8 cubes in the prism. Then the number of cubes is: 4 * 4 * 8 = 128
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