Original math for Polar Grids

The angle of the polar grid is kept constant with the following theory.

$angles$

When a is small and r large, the small edge of the pie could be considered straight.

With b = 45 degrees, r₁ equals the small pie edge.

The approximation above in math: $r_1 = \frac{ 2*\pi*r }{ nr \ of \ segments }' align='absmiddle' title='r_1 = \frac{ 2*\pi*r }{ nr \ of \ segments }$

For the circle we get: $r_2 = \frac{ 2*\pi*(r + r_1) }{ nr \ of \ segments }' align='absmiddle' title='r_2 = \frac{ 2*\pi*(r + r_1) }{ nr \ of \ segments }$

From the mathematical rule: $tan(b) = \frac{ r_1 }{ curve \ length }' align='absmiddle' title='tan(b) = \frac{ r_1 }{ curve \ length }$

we can deduce: $r_1 = \frac{ 2 * \pi * r * tan(b) }{ nr \ of \ segments }' align='absmiddle' title='r_1 = \frac{ 2 * \pi * r * tan(b) }{ nr \ of \ segments }$

Diagrams for Bobbin Lace

Inkscape plugins

Original math for Polar Grids