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
Answers
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.