Definition:Quadrilateral

A quadrilateral (or "tetragon") is a polygon with four sides.

Because it is a polygon, it follows that it also has four vertices.

= Types of Quadrilateral =

Square
A square is a regular quadrilateral.

That is, the angles and sides of a square are all right angles:



As Euclid put it: "A square is [a quadrilateral figure] which is both equilateral and right-angled."

Oblong
An oblong is a quadrilateral whose angles are all right angles, but whose sides are not all the same length:



As Euclid put it: "An oblong [is a quadrilateral figure] which is right-angled but not equilateral."

Rectangle
A rectangle is a quadrilateral all of whose angles are equal to a right angle, and whose sides may or may not all be the same length.

That is, both squares and oblongs are types of rectangle.

The word "oblong" is rarely seen nowadays; "rectangle" is the term usually used instead.

Parallelogram
A parallelogram is a quadrilateral whose opposite sides are equal to each other, and whose sides may or may not all be the same length.



Thus a rectangle is a parallelogram all of whose angles are equal to a right angle.

Base
For a given parallelogram, one of the sides is distinguished as being the base. It is immaterial which is so chosen, but usual practice is that it is one of the two longer sides.

In the parallelogram above, line $$AB$$ is considered to be the base.

Altitude
An altitude of a parallelogram is a line drawn perpendicular to its base, through one of its vertices (extended if necessary) not on that base.

In the diagram above, line $$DE$$ is an altitude of the parallelogram $$ABCD$$.

The term is also used for the length of such a line.

It follows that the altitude of a rectangle is equal to one of its sides adjacent to its base.

Rhombus
A rhombus or rhomb is a parallelogram whose sides are all the same length.



Its angles may or may not all be equal.

Thus a square is a rhombus all of whose angles are equal to a right angle.

Rhomboid
A rhomboid is a parallelogram whose sides are not all the same length.

Its angles may or may not all be equal.

Thus an oblong is a rhomboid all of whose angles are equal to a right angle.