The knot I chose: "8_18". It is called 8_18 because it has 8 crossings and is the 18th knot on the knot table with 8 crossings. Picture of my knot (from http://katlas.math.toronto.edu/wiki/8_18) Crossing number: 8; the smallest number of crossings of any diagram with this knot is eight. Sequence of crossing switches that gives the unknot (upper bound on the unknotting number): An unknotting number is the number of changes you can make at intersections by changing which line is over or under at that intersection which at the end of all the changes gives you the unknot, or a simple loop with no knots in it. Basically you can change which line is over and which line is under at each intersection without sacrificing the integrity of the knot by cutting it in any way and the number of crossings you have to alter that give you the unknot becomes the upper bound of the unknotting number because there could be a simpler way to do it that requires less ...