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Grade 7

10.03 Classify solids

Lesson

3D shapes

 

Vertex (plural is vertices)

A vertex is a point where two or more straight lines meet. Otherwise known as a corner.

This rectangular based pyramid has $5$5 vertices.  

 

Edge

An edge is a line segment that joins two vertices. 

This rectangular based pyramid has $8$8 edges. 

 

Face

A face is any of the individual surfaces of a solid object. This rectangular based pyramid has $5$5 faces. 

 

Types of 3D shapes

 

Polyhedra

A polyhedron is the 3D equivalent of a polygon.  Remember how a polygon is a many angled (many straight sided) figure.  Well a polyhedron is a many sided flat faced figure. A polyhedron has no curved edges and each face is a polygon.  

Here are some examples of 3D solids that are polyhedra:

These ones are not.  These all have curved faces or edges.  

 

Prisms

A prism is defined as a solid geometric figure whose two end faces are similar, equal, and parallel.  These are both prisms.  Prisms need to have all straight edges and faces, no curves.

A prism has a base and a uniform cross-section.  The base is one of the two parallel identical ends.  The bases for these prisms are shaded blue.  

A uniform cross-section means that if we slice the solid (imagine cutting it liked sliced bread) at any point parallel to the base then it will have the exact same shape as the base.

Prisms occur very commonly in the packaging of grocery items, and finding the volume of these contributes to the design, shape and size of packaging and product.

       

 

Cube

A rectangular prism with all $6$6 faces being squares is called a cube

 

Cylinder

A cylinder is similar to a prism, it has two parallel circular faces.  It also has a uniform cross-section.  It is not classified as a prism because of the circular edge and face.    

 

Pyramids

A pyramid can be made in the following way:

  • Use any polygon as a base. We can have square bases, triangular bases or even hexagonal bases.
  • Then connect every vertex of the base to an apex point above the base, and you have a pyramid.

We can name a pyramid by the shape of the base. Here are some examples of square and rectangular based pyramids in real life.

         

 

Cones

A cone is made by connecting a circular base to an apex. Such as the right-cone shown below: 

 

Spheres

A sphere is made by having a central point and then creating a surface where all points on the surface are the same distance from the centre.  

Sports balls and planets may come to mind when we think of spheres.

            

Now that we know how to name a solid, the next step is to understand some of the language that is used to describe them.

 

Classifying 3D shapes

 

Regular solids

Regular solids have faces that are all identical and the same number of faces meet at each vertex. There are only $5$5 regular solids and they are given the special name: the Platonic solids.  The most familiar regular shape is a cube, where each face is a square and three squares meet at each vertex. Notice the names of these commonly have -hedron at the end. All other polyhedrons are known as irregular solids.

The $5$5 Platonic solids

 

Convex or concave

As we saw for 2D shapes, describing flat shapes as convex or concave came down to identifying if there was a cave-like shape to the edges.  

For 3D solids, the idea of concave and convex is the same.

 

Right or oblique

A right solid is one that has its axis at right angles to its base.  

  • Right cone, has its apex at right angles to the centre of the base.
  • Right pyramid, has its apex at right angles to the centre of the base.
  • Right prism has the central line (axis) at right angles to the centre of the base.
  • Right cylinder has the central line (axis) at right angles to the centre of the circular base. 

These solids are all right solids and notice the red axis line that shows it is perpendicular to the base.

These solids are all oblique solids, notice the red axis line that shows its angle to the base.

Summary
  • If the solid has a uniform cross-section it is a prism.  We name it by identifying the base, (or the shape of the cross-section) and the word prism.  eg rectangular prism, triangular prism, hexagonal prism, trapezoidal prism
  • If the solid has $2$2 parallel circles as edges, we call this a cylinder.   
  • If the solid has $6$6 sides and all of them are squares, we call this a cube.  
  • If the base is a polygon, and all the vertices are connected to a common apex then it is a pyramid and we name it by using the name of the shape that the base is and using the word pyramid.  e.g. rectangular pyramid, triangular pyramid, octagonal pyramid
  • If the base is a circle, and it connects to a point we call this a cone.
  • If each point on the surface is equally distant from the centre, we call this a sphere.  

 

Practice questions

Question 1

Select the right name for each solid:

  1. Square pyramid

    A

    Triangular pyramid

    B

    Triangular prism

    C

    Square prism

    D
  2. Rectangular prism

    A

    Square pyramid

    B

    Square prism

    C

    Rectangular pyramid

    D

Question 2

Classify the following solids as convex or non-convex:

  1. Does the shape have a uniform cross-section ?

    No

    A

    Yes

    B
  2. Is the solid convex or non-convex?

    Convex

    A

    Non-convex

    B

Question 3

Here is a rectangular prism.

  1. How many faces does it have?

  2. How many vertices does it have?

  3. How many edges does it have?

 

Rotational symmetry of solids

 

If a solid can be rotated about a straight line so that it fits into itself, it has rotational symmetry. The straight line is called its axis of symmetry. For instance, the hexagonal prism below, can rotate and fit into itself six times before it is in the same position as when it started. That means it has rotational symmetry of order $6$6

The following cylinder can rotate and fit into itself about its axis of symmetry an infinite number of times before getting back to its original position. So we say it has rotational symmetry of order infinity.

 

Worked example 1

State the order of rotational symmetry for the rectangular prism below about the given axis of symmetry. 

 

If we rotate the rectangular prism $$ clockwise about the line so that corner$B$B lies where corder $D$D is, we get the following:

So the prism fits into itself. Now we can rotate the prism another $$ it will also fit into itself and be in its original position:

 

So it fit into itself twice, which means it has rotational symmetry of order $2$2.

 

Plane symmetry of solids

A solid has plane symmetry if it can be divided into half by a two-dimensional plane (or you could think of it like a sheet of paper cutting through the solid to divide it into halves). A triangular prism is shown below, with a plane of symmetry cutting it in half: 

 

These are just some of the planes of symmetry for a cube: 


 

 

Outcomes

7.E1.1

Describe and classify cylinders, pyramids, and prisms according to their geometric properties, including plane and rotational symmetry.

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