RELATIONSHIPS OF THE VOLUMES OF SOLID FIGURES
RELATIONSHIPS OF THE VOLUMES OF SOLID FIGURES M6MEIVa-95 - determines the relationship of the volume between a rectangular prism and a pyramid; a cylinder and a cone; and a cylinder and sphere. ______________________________________________________________________________ Determining the relationship of volume between a rectangular prism and a pyramid: The volume of a rectangular prism is length x width x height. The volume of a pyramid is (length x width x height)/3. A rectangular pyramid has one-third the volume of a rectangular prism with the same base and height. Determining the relationship of volume between a cylinder and a cone: The volume of a cylinder is π x radius² x height. The volume of a cone is (π x radius² x height)/3. A cone has one-third the volume of a cylinder with the same base and height. Determining the relationship of volume between a cylinder and sphere: The volume of a cylinder is π x radius² x height. The volume of a sphere is (4/3) x π x radius³. A sphere ha