It has an internal angle degree of ~152.308 degrees and a total of 6840 degrees. The area is <math>A={\frac{13}{4}} a^{2} \cot {\frac{\pi}{13}}</math> which is about <math>13.1858  a^2</math> where a is the side length. This cannot be constructed by using a compass and straightedge, but can be constructed using an angle trisector or neusis. Btu, what if there's is not a side length value given? There is a formula for that too! The side length, where <math>r</math> is the radius of the circumcircle that this is being constructed on, of a tridecagon is <math>r \cdot 2 \cdot \sin{\frac{\pi}{13}}</math> or <math>2r \cdot 0.23931566428755777</math>. If this was constructed on a unit circle the side length would be <math>0.478631328575115</math>. The error of side length being off is 0.0 for up to 15 decimal places, so pretty accurate. If the radius was 1 billion km, then this formula would be off by lass than 1mm. The central angle of a tridecagon is about <math>27.6923076923077</math>, which is of by 0.0 degrees up to 13 decimal places.