Building a Surface from One Knot

In the previous section we used two torus knots to form the boundary of a surface. In this section we will examine what surfaces result from using a single curve as the boundary of a surface.

Question #6

Consider a torus knot of type (2,1). You parametrized and sketched this knot in Question #1.

Parametrize the surface generated by inserting a line segment from the point p(s)=T(2s,s) to the point q(s)=T(2s,s+Pi). Hint: Let s=0 to get your bearings. Notice that you are connecting a line segment between two different points on the same curve, but this doesn't change the way that you parametrize the line segment from p(s) to q(s).
What surface is this? What is its boundary?
Include a plot of this surface in your lab writeup with the outside portion of the surface colored red and the inside portion of the surface colored green.

Question #7

Repeat the previous problem for the torus knot of type (2,3)
Conjecture what surface is formed by connecting the points T(2s,ns) to T(2s,ns+Pi) when n is an odd integer.

Up: Introduction
Previous: Building a Surface from Torus Knots

Robert E. Thurman<thurman@geom.umn.edu>

Original lab created by Frederick J. Wicklin

Document Created: Thu Feb 23 1995
Last modified: Tue Mar 5 08:05:49 1996