Right circular cylinder

Definition

A right circular cylinder, or more precisely, a right circular cylindrical surface, is a union of all circles centered at points on a given line, of fixed radius, and each circle in the plane perpendicular to the line at that point. The line is termed the axis of the cylinder.

The above is the infinite right circular cylindrical surface. The finite version is obtained by replacing the line with an open line segment.

The term solid cylinder is used to refer to the unino of discs, instead of circles. The cylindrical surface is then termed the lateral surface of the solid cylinder.

Terminology

The line comprising centers is termed the axis of the cylinder.
Planes perpendicular to the axis are termed cross-sectional planes
The equal radius of all circles is termed the radius or base radius of the cylinder and is denoted by $r$
For a finite cylinder, the length of the open line segment is termed the height of the cylinder and is denoted by $h$

Equational descriptions

Cartesian parametric description

If the axis is the $z$ -axis, the parametric description is in terms of $t\in \mathbb {R}$ and $\theta$ an angle.

$x=r\cos \theta ,y=r\sin \theta ,z=t$

For a finite cylinder, we have, instead of $t\in \mathbb {R}$ , $t\in [t_{0},t_{1}]$ where $t_{1}-t_{0}=h$ .

Cartesian equational description

If the axis is the $z$ -axis, the equational description in Cartesian coordinates is:

$x^{2}+y^{2}=r^{2}$

In other words, the $z$ -coordinate is arbitrary, and any section with the $xy$ -plane looks like a circle of radius $r$ centered at the origin.

Polar parametric description

Polar equational description

Structure and symmetry

The infinite right circular cylinder is topologically, differentially, and geometrically the direct product of the circle $S^{1}$ and the real line $\mathbb {R}$ . Moreover, both direct factors are metrically characteristic.