strangle knot 3d models
6284 3d models found related to strangle knot.
cults3d
Here is a strangling worm that you can use as a flower pot. ...Add a cactus, a bonsai or any other plant.
thingiverse
... DUNGEONS can be found on Kickstarter at https://www.kickstarter.com/projects/rocketpiggames/tilescape-dungeons. Fans of the Strangle Sprout can support Rocket Pig Games by becoming patrons on Patreon at https://www.patreon.com/rocketpiggames.
grabcad
... can be found on Wikipedia at https://en.wikipedia.org/wiki/M._C._Escher. ...Inspired by an exhibition in Milano, I created this model to mimic Escher's intricate knots (http://www.mcescher.com/gallery/recognition-success/knots/) featured in his art.
cults3d
The STL file for the symbol shown: Eternal Knot, also known as a Mystic Knot. ...It can be scaled, and used for signs, wall art, etc.
cults3d
mathematical object for decorative purposes Clover knot with triangular (or square) section whose faces consist of a single continuous band that traverses the node three times (or four times). ... Printed in pla, the knots were then dressed with a wood...
prusaprinters
Knot Pot inspired by the torus knot (shown in the last photo).The pot design was created by taking the 3 sides of a torus knot duplicated 3 times over, twisted and then wrapped them around the sides.The pot is designed to be a simple and easy print...
prusaprinters
Knot Pot inspired by the torus knot (shown in the last photo).The pot design was created by taking the 3 sides of a torus knot duplicated 3 times over, twisted and then wrapped them around the sides.The pot is designed to be a simple and easy print...
prusaprinters
Knot Pot inspired by the torus knot (shown in the last photo).The pot design was created by taking the 3 sides of a torus knot duplicated twice, twisted and then wrapped them around the sides.The pot is designed to be a simple and easy print with no...
grabcad
An illustration crafted by Catia is presented here, showcasing her artistic talent and creativity in creating the piece.
grabcad
In Solidworks, a parametric curve can be generated using equations x = (2 + cos(3 * t)) * cos(2 * t), y = (2 + cos(3 * t)) * sin(2 * t), and z = sin(3 * t). ...By altering the parameters (t, 2, 3), various shapes can be achieved.