Final answer:
To find the volume of the solid, we need to find the area of each cross section and then multiply it by the thickness of the solid. Since the cross sections are squares and the base is a circular disk, we can say that the side length of each square cross section is equal to the diameter of the circular disk. And since the radius of the circular disk is 4, the side length of each square cross section is 8.
Step-by-step explanation:
To find the volume of the solid, we need to find the area of each cross section and then multiply it by the thickness of the solid. Since the cross sections are squares and the base is a circular disk, we can say that the side length of each square cross section is equal to the diameter of the circular disk. And since the radius of the circular disk is 4, the side length of each square cross section is 8. Therefore, the volume of the solid is equal to the area of each square cross section (8 * 8) multiplied by the thickness of the solid.
Volume = (8 * 8) * (thickness)
However, we don't have information about the thickness of the solid, so we cannot determine the exact volume without that information.