Rigid regular nonagon from 21 Meccano strips

Question

You are given 21 Meccano strips, where the distance between adjacent holes is 1 unit:

• 9 strips of length 10 (hence having 11 holes)
• 6 strips of length 18 (19 holes)
• 6 strips of length 19 (20 holes)

By inserting nuts and bolts in the holes so as to form hinges between the strips, it is possible to create a rigid framework where

• portions of nine different strips form a perfectly regular nonagon of side length 6 (with vertices coincident with hole centres)
• no strip is redundantly long, i.e. all end holes are part of some hinge linking at least two different strips

Can you find this rigid framework and prove its rigidity?

Answer 1

The answer from my MSE question, drawn in the style of the picture in this question:

Answer 2

The MSE answer is mathematically correct, appropriate for that site. But the puzzle on this site just asks for a nonagon that is "part of" strips about a unit wide. A much simpler answer fits that criterion, based on triangles with sides of 4,4, and 6 units

Bolt the ends of two 10-unit strips together, then bolt two holes six units apart on another strip to holes 4 units from that hinge. (I used the holes 2 units in from the ends of another 10-strip in the figure below.) This gives a 4,4,6 triangle with rigid 6-unit extensions at an angle close to the 140 degrees in a regular nonagon. Make 2 more of these. Connect the ends of the arms to get a slightly irregular nonagon. The vertices of a regular nonagon, shown in black, are within about 1/9 of a unit (~0.11115916 units to be more precise) of the center of the bolts, probably within the radius of the bolt and definitely "part of" the strips.

To meet the second criterion, connect the extra ends of each strip used for the long side of a triangle to two 18- or 19-unit strips and connect the other ends of those strips to each other. (I used two 18-units strips in the figure.)