Acronym twau eikadobcu
Name dodeca-augmented elongated ikadobcu
General of army (is itself convex)
Colonel of regiment (is itself locally convex)
Dihedral angles
  • at {3} between tet and tet:   arccos[-(1+3 sqrt(5))/8] = 164.477512°
  • at {3} between squippy and squippy:   arccos[-(1+3 sqrt(5))/8] = 164.477512°
  • at {3} between pedpy and squippy:   arccos(-sqrt[7+3 sqrt(5)]/4) = 157.761244°
  • at {4} between squippy and squippy:   arccos(-4/5) = 143.130102°
  • at {3} between ike and tet:   arccos[-sqrt(5/8)] = 142.238756°
  • at {3} between pedpy and tet:   arccos[-sqrt(5/8)] = 142.238756°
Face vector 76, 380, 490, 186
Confer
uniform relatives:
dope  
segmentochora:
ikadoe   pippy  
related CRFs:
eikadoe   ikadobcu   owaudope   twau eikadoe  

Incidence matrix according to Dynkin symbol

xoAox3ooooo5oxoxo&#xt   → all heights = 1/2
                          where A = 3/sqrt(5) = 1.341641
(ike || pseudo doe || pseudo A-ike || pseudo doe || ike)

o....3o....5o....     & | 24  *  * |  5   5  0   0  0 |  5  10   5   0  0  0 | 1  5  5  1  0
.o...3.o...5.o...     & |  * 40  * |  0   3  3   3  1 |  0   3   6   6  3  3 | 0  1  3  3  6
..o..3..o..5..o..       |  *  * 12   0   0  0  10  0 |  0   0   0  10  0  5 | 0  0  0  2  5
------------------------+----------+------------------+----------------------+--------------
x.... ..... .....     & |  2  0  0 | 60   *  *   *  * |  2   2   0   0  0  0 | 1  2  1  0  0
oo...3oo...5oo...&#x  & |  1  1  0 |  * 120  *   *  * |  0   2   2   0  0  0 | 0  1  2  1  0
..... ..... .x...     & |  0  2  0 |  *   * 60   *  * |  0   0   2   2  1  0 | 0  0  1  2  2
.oo..3.oo..5.oo..&#x  & |  0  1  1 |  *   *  * 120  * |  0   0   0   2  0  1 | 0  0  0  1  2
.o.o.3.o.o.5.o.o.&#x    |  0  2  0 |  *   *  *   * 20 |  0   0   0   0  3  3 | 0  0  0  0  6
------------------------+----------+------------------+----------------------+--------------
x....3o.... .....     & |  3  0  0 |  3   0  0   0  0 | 40   *   *   *  *  * | 1  1  0  0  0
xo... ..... .....&#x  & |  2  1  0 |  1   2  0   0  0 |  * 120   *   *  *  * | 0  1  1  0  0
..... ..... ox...&#x  & |  1  2  0 |  0   2  1   0  0 |  *   * 120   *  *  * | 0  0  1  1  0
..... ..... .xo..&#x  & |  0  2  1 |  0   0  1   2  0 |  *   *   * 120  *  * | 0  0  0  1  1
..... ..... .x.x.&#x    |  0  4  0 |  0   0  2   0  2 |  *   *   *   * 30  * | 0  0  0  0  2
.ooo.3.ooo.5.ooo.&#x    |  0  2  1 |  0   0  0   2  1 |  *   *   *   *  * 60 | 0  0  0  0  2
------------------------+----------+------------------+----------------------+--------------
x....3o....5o....     &  12  0  0 | 30   0  0   0  0 | 20   0   0   0  0  0 | 2  *  *  *  *
xo...3oo... .....&#x  &   3  1  0 |  3   3  0   0  0 |  1   3   0   0  0  0 | * 40  *  *  *
xo... ..... ox...&#x  &   2  2  0 |  1   4  1   0  0 |  0   2   2   0  0  0 | *  * 60  *  *
..... ooo..5oxo..&#xt &   1  5  1 |  0   5  5   5  0 |  0   0   5   5  0  0 | *  *  * 24  *
..... ..... .xox.&#x      0  4  1 |  0   0  2   4  2 |  0   0   0   2  1  2 | *  *  *  * 60


((uxo xoA3ooo5oxo))&#zxt   → heights = 0
                             where A = 3/sqrt(5) = 1.341641

o.. o..3o..5o..     | 24  *  * |  5   5  0  0   0 |  5  10   5  0  0   0 | 1  5  5  1  0
.o. .o.3.o.5.o.     |  * 40  * |  0   3  1  3   3 |  0   3   6  3  3   6 | 0  1  3  3  6
..o ..o3..o5..o     |  *  * 12   0   0  0  0  10 |  0   0   0  0  5  10 | 0  0  0  2  5
--------------------+----------+------------------+----------------------+--------------
... x.. ... ...     |  2  0  0 | 60   *  *  *   * |  2   2   0  0  0   0 | 1  2  1  0  0
oo. oo.3oo.5oo.&#x  |  1  1  0 |  * 120  *  *   * |  0   2   2  0  0   0 | 0  1  2  1  0
.x. ... ... ...     |  0  2  0 |  *   * 20  *   * |  0   0   0  3  3   0 | 0  0  0  0  6
... ... ... .x.     |  0  2  0 |  *   *  * 60   * |  0   0   2  1  0   2 | 0  0  1  2  2
.oo .oo3.oo5.oo&#x  |  0  1  1 |  *   *  *  * 120 |  0   0   0  0  1   2 | 0  0  0  1  2
--------------------+----------+------------------+----------------------+--------------
... x..3o.. ...     |  3  0  0 |  3   0  0  0   0 | 40   *   *  *  *   * | 1  1  0  0  0
... xo. ... ...&#x  |  2  1  0 |  1   2  0  0   0 |  * 120   *  *  *   * | 0  1  1  0  0
... ... ... ox.&#x  |  1  2  0 |  0   2  0  1   0 |  *   * 120  *  *   * | 0  0  1  1  0
.x. ... ... .x.     |  0  4  0 |  0   0  2  2   0 |  *   *   * 30  *   * | 0  0  0  0  2
.xo ... ... ...&#x  |  0  2  1 |  0   0  1  0   2 |  *   *   *  * 60   * | 0  0  0  0  2
... ... ... .xo&#x  |  0  2  1 |  0   0  0  1   2 |  *   *   *  *  * 120 | 0  0  0  1  1
--------------------+----------+------------------+----------------------+--------------
... x..3o..5o..      12  0  0 | 30   0  0  0   0 | 20   0   0  0  0   0 | 2  *  *  *  *
... xo.3oo. ...&#x    3  1  0 |  3   3  0  0   0 |  1   3   0  0  0   0 | * 40  *  *  *
... xo. ... ox.&#x    2  2  0 |  1   4  0  1   0 |  0   2   2  0  0   0 | *  * 60  *  *
... ... ooo5oxo&#xt   1  5  1 |  0   5  0  5   5 |  0   0   5  0  0   5 | *  *  * 24  *
.xo ... ... .xo&#x    0  4  1 |  0   0  2  2   4 |  0   0   0  1  2   2 | *  *  *  * 60

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