The Diva’s Challenge this week was a UMT challenge involving an interesting tangle, Athitzi by Eleanor Holt. The pattern is just a series of short, parallel lines, but Eleanor produced a stunning effect in her tile.
I didn’t know where to go with this tangle, so I just drew a tile and incorporated Athitzi here and there. By my count Athitzi pops up 7 times in this tile. Can you find them all?
A non-Zentangle based craft challenge that I take part in recently challenged us to create something to reflect a mathematical braid. A mathematical braid is made up of any number of strings that travel from one point down to another, but never travel upward again. They may intertwine, but they don’t have to.
This was my first tile. I hadn’t grasped the concept of a mathematical braid, so I just did a normal braid, with three strands going over and under each other.
Bridgen, Peaks Border, Scoodle, W2
Then I realised that in a mathematical braid, the strands don’t have to intertwine! So I did another tile with strands in the middle that don’t intertwine, with Punzel in the periphery, that has four strands that do intertwine.
Punzel, Quib, Static, Tipple
I actually tried using Cadent at the left, but I felt Punzel didn’t stand out against Cadent, so I blacked out the area instead. Now I wish I used shading to help Punzel stand out. Shading saves everything!