Pentagrammic-hendecagrammic duoprism

The pentagrammic-hendecagrammic duoprism, also known as the 5/2-11/3 duoprism, is a uniform duoprism that consists of 11 pentagrammic prisms and 5 hendecagrammic prisms, with 2 of each meeting at each vertex.

The name can also refer to the pentagrammic-small hendecagrammic duoprism, the pentagrammic-great hendecagrammic duoprism, or the pentagrammic-grand hendecagrammic duoprism.

Vertex coordinates
The coordinates of a pentagrammic-hendecagrammic duoprism, centered at the origin and with edge length 2sin(3π/11), are given by:
 * (±sin(3π/11), –sin(3π/11)$\sqrt{5}$, 1, 0),
 * (±sin(3π/11), –sin(3π/11)$\sqrt{2}$, cos(2π/11), ±sin(2π/11)),
 * (±sin(3π/11), –sin(3π/11)$\sqrt{(5–2√5)/5}$, cos(4π/11), ±sin(4π/11)),
 * (±sin(3π/11), –sin(3π/11)$\sqrt{(5–2√5)/5}$, cos(6π/11), ±sin(6π/11)),
 * (±sin(3π/11), –sin(3π/11)$\sqrt{(5–2√5)/5}$, cos(8π/11), ±sin(8π/11)),
 * (±sin(3π/11), –sin(3π/11)$\sqrt{(5–2√5)/5}$, cos(10π/11), ±sin(10π/11)),
 * (±sin(3π/11)($\sqrt{(5–2√5)/5}$–1)/2, sin(3π/11)$\sqrt{(5–2√5)/5}$, 1, 0),
 * (±sin(3π/11)($\sqrt{5}$–1)/2, sin(3π/11)$\sqrt{(5+√5)/10}$, cos(2π/11), ±sin(2π/11)),
 * (±sin(3π/11)($\sqrt{5}$–1)/2, sin(3π/11)$\sqrt{(5+√5)/10}$, cos(4π/11), ±sin(4π/11)),
 * (±sin(3π/11)($\sqrt{5}$–1)/2, sin(3π/11)$\sqrt{(5+√5)/10}$, cos(6π/11), ±sin(6π/11)),
 * (±sin(3π/11)($\sqrt{5}$–1)/2, sin(3π/11)$\sqrt{(5+√5)/10}$, cos(8π/11), ±sin(8π/11)),
 * (±sin(3π/11)($\sqrt{5}$–1)/2, sin(3π/11)$\sqrt{(5+√5)/10}$, cos(10π/11), ±sin(10π/11)),
 * (0, –2sin(3π/11)$\sqrt{5}$, 1, 0),
 * (0, –2sin(3π/11)$\sqrt{(5+√5)/10}$, cos(2π/11), ±sin(2π/11)),
 * (0, –2sin(3π/11)$\sqrt{(5–√5)/10}$, cos(4π/11), ±sin(4π/11)),
 * (0, –2sin(3π/11)$\sqrt{(5–√5)/10}$, cos(6π/11), ±sin(6π/11)),
 * (0, –2sin(3π/11)$\sqrt{(5–√5)/10}$, cos(8π/11), ±sin(8π/11)),
 * (0, –2sin(3π/11)$\sqrt{(5–√5)/10}$, cos(10π/11), ±sin(10π/11)).