Section 12.6: Cylinders & Quadric Surfaces

SOLUTION Notice that the equation of the graph, \(z = x^2\), doesn’t involve \(y\). This means that any vertical plane with equation \(y = k\) (parallel to the xz-plane) intersects the graph in a curve with equation \(z = x^2\). So these vertical traces are parabolas. Figure 1 shows how the graph is formed by taking the parabola \(z = x^2\) in the xz-plane and moving it in the direction of the y-axis. The graph is a surface, called a parabolic cylinder, made up of infinitely many shifted copies of the same parabola. Here the rulings of the cylinder are parallel to the y-axis.

We noticed that the variable \(y\) is missing from the equation of the cylinder in Example 1. This is typical of a surface whose rulings are parallel to one of the coordinate axes. If one of the variables \(x\), \(y\), or \(z\) is missing from the equation of a surface, then the surface is a cylinder.

SOLUTION (a) Since \(z\) is missing and the equations \(x^2 + y^2 = 1\), \(z = k\) represent a circle with radius 1 in the plane \(z = k\), the surface \(x^2 + y^2 = 1\) is a circular cylinder whose axis is the z-axis. (See Figure 2.) Here the rulings are vertical lines.

2. In this case \(x\) is missing and the surface is a circular cylinder whose axis is the x-axis. (See Figure 3.) It is obtained by taking the circle \(y^2 + z^2 = 1\), \(x = 0\) in the yz-plane and moving it parallel to the x-axis.