Question
There are two similar solids. The surface areas are 384 yd 22 and 1057 yd 22 . The volume of the larger solid is 1795 yd 33 . What is the volume of the smaller solid?(1 point) volume of smaller solidvolume of smaller solid yd3
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Answered by
GPT 3.5
To find the volume of the smaller solid, we first need to determine the ratio of the surface areas between the two solids:
384 / 1057 ≈ 0.363
Next, we need to find the ratio of the volumes of the two solids:
V1 / 1795 = 0.363
V1 ≈ 1795 * 0.363 = 652.185 yd^3
Therefore, the volume of the smaller solid is approximately 652.185 yd^3.
384 / 1057 ≈ 0.363
Next, we need to find the ratio of the volumes of the two solids:
V1 / 1795 = 0.363
V1 ≈ 1795 * 0.363 = 652.185 yd^3
Therefore, the volume of the smaller solid is approximately 652.185 yd^3.
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