Three-twist knot

The three-twist knot is a prime knot, and it is invertible but not amphichiral. Its Alexander polynomial is

${\displaystyle \Delta (t)=2t-3+2t^{-1},\,}$

since ${\displaystyle {\begin{pmatrix}1&-1\\0&2\end{pmatrix}}}$ is a possible Seifert matrix, or because of its Conway polynomial, which is

${\displaystyle \nabla (z)=2z^{2}+1,\,}$

and its Jones polynomial is

${\displaystyle V(q)=q^{-1}-q^{-2}+2q^{-3}-q^{-4}+q^{-5}-q^{-6}.\,}$^[2]

Because the Alexander polynomial is not monic, the three-twist knot is not fibered.

The three-twist knot is a hyperbolic knot, with its complement having a volume of approximately 2.82812.

If the fibre of the knot in the initial image of this page were cut at the bottom right of the image, and the ends were pulled apart, it would result in a single-stranded figure-of-nine knot (not the figure-of-nine loop).