[size=150]A right cone has a base with diameter 10 units. The volume of the cone is [math]100\pi[/math] cubic units. What is the length of a segment drawn from the apex to the edge of the circular base?[/size]

[size=150]A right pyramid has a square base with sides of length 10 units. Each segment connecting the apex to a midpoint of a side of the base has length 13 units. What is the volume of the pyramid?[/size]

A prism and a pyramid have the same height. The pyramid’s base has 3 times the area of the prism's base.

A pyramid and a cylinder have bases with the same area. The cylinder’s height is 3 times that of the pyramid.

A cone and a cylinder have the same height. The cone’s radius is 3 times the length of the cylinder’s radius.

[size=150]A pyramid has a height of 8 inches and a volume of 120 cubic inches. Determine 2 possible shapes, with dimensions, for the base. [br][/size]

[size=150]A toy company packages modeling clay in the shape of a rectangular prism. This prism has dimensions 6 inches by 1 inch by [math]\frac{1}{2}[/math] inch. They want to change the shape to a rectangular pyramid that uses the same amount of clay. Determine 2 sets of possible dimensions for the pyramid.[/size]

[size=150]These 3 congruent square pyramids can be assembled into a cube with side length 2 feet. What is the volume of each pyramid?[/size][br][br][img]data:image/png;base64,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[/img][br]

[size=150]A monster truck wheel has an area of [math]324\pi[/math] square inches. A toy company wants to create a scaled copy of the monster truck with a wheel area of [math]9\pi[/math] square inches. What scale factor should the company use?[/size]