Select the 2D object that can be rotated to form the 3D object shown.

Which 2-D shape could be revolved about the vertical line to create the 3-D solid?

Which 3-D solid is created when the rectangle is rotated about the horizontal line?

A cylinder is cut parallel to the base. What is the shape of the cross-section formed?

A cone is cut by a plane that is perpendicular to its base. Which of the following could be the shape of the cross-section formed?

A right hexagonal prism is shown below. A two-dimensional cross section that is perpendicular to the base is taken from the prism.

Which figure describes the two-dimensional cross section?

Rotating this circle around the diameter creates a ____________.

The cross-section of a 3D figure is shaped like a circle. Which could NOT have been the 3D figure?

Which shape is NOT a cross section of a cone?

The right triangle as shows is rotated $360\degree$ about the  $y-axis$ in three dimensions. What is the 3-Dimensional solid resulting from the rotation?

Which of the shapes are possible cross-sections of a cube? 

Cavalieri’s Principle states that any two objects with the same cross sectional areas and heights must have the same volume.

Based on Cavalieri's Principle, will the two prisms have the same volume?

A right cylinder is cut perpendicular to its base. The shape of the cross section is a

Select the 2D object that can be rotated to form the 3D object shown.

Both stacks of coins have the same number of the same kind of coins. Which has the larger volume - the coins stacked vertically or the coins pushed into a zigzag?

The solids shown have the same height and the same Base area. Which has the larger volume?

Sheila believes that the two cylinders shown in the diagram below have equal volumes. Is Sheila correct or incorrect? Select ALL that apply.