Solids are usually divided into different types, all with different sets of characteristics. If each face of a solid is a polygon, the solid is called a polyhedron. A finer division can consist of types such as prism, pyramid, cylinder, cone, and sphere.
A prism is a three-dimensional object created by connecting a polygon with a translated version of the same polygon, vertex to vertex. All the faces are polygons, so prisms are polyhedra.
Pyramids are created by connecting a polygon's vertices with a single point, using line segments. Pyramids are also polyhedra.
A cylinder is made up of two congruent, parallel circles connected in a way corresponding to how the polygons in a prism are connected. As it contains circles, it is not a polyhedron.
Cones look like cylinders, though one of the circles is replaced by a point. Thus, they taper from a circle to a point. They are not polyhedra.
A sphere is the three-dimensional equivalent of a circle. It consists of every point in space at a certain distance away from the center of the sphere. It is not a polyhedron.
Name the solids and tell whether they are polyhedra.
The intersection between a plane and a solid is a two-dimensional surface called a cross-section. Often, it is possible to get different types of cross-sections from the same solid. For instance, the cross-section of a cylinder could be a rectangle or a circle, among other things.
Name the shapes of the cross-sections.
The cross-section of the first solid has four vertices. As there are no parts of the solid that are curved, the cross-section can't have any curves either. Thus, the cross-section is in the shape of a quadrilateral.
This cross-section has three vertices instead. Similarly, the cube has no curved parts, meaning the cross-section has no curves. Therefore, the cross-section is a triangle.
A solid of revolution is a three-dimensional object formed by rotating some two-dimensional object around an axis. The axis is referred to as the axis of revolution. Rotating a rectangle with one side against the axis of revolution creates a cylinder.
Depending on the shape used, many different types of solids can be created.
Sketch and describe the solid of revolution corresponding to the following shape and axis.
Notice that if the top segment of the shape were extended to the left, the shape would be a triangle. Thus, we can think of it as a triangle without its pointy top. This means that the solid of revolution will be the same as though the shape were a triangle, but without the top. Thus, the resulting solid of revolution is a cone without a top.
It's base radius is units, top radius is unit, and its height is units.