10 124 Further Notes and Views

If one takes the symmetric diagram for 10_123 and makes it doubly alternating one gets a diagram for 10_124. That's the torus knot view. There is then a nice representation of the quandle of 10_124 into the dodecahedral quandle ${\displaystyle Q_{30}}$. See [1].

10_124 is not ${\displaystyle k}$-colourable for any ${\displaystyle k}$. See The Determinant and the Signature.

Torus knot T(5,3) form