QG-P11: 2nd QG-Quasi Nine-point Center


Let P1.P2.P3.P4 be a Quadrigon and let S be its Diagonal Crosspoint QG-P1.
Let Ni i+1 = Nine-point Center of Triangle Pi.Pi+1.S (i = cyclic sequence 1,2,3,4) .
Now is N12.N23.N34.N41 a parallelogram.
QG-P11 is the Center of this parallelogram.
QG-P11-2ndNine-pointCenter-01

CT-Coordinates: 
CT-Coordinates QG-P11 in 3 QA-Quadrigons:         (only coordinates of 1st Quadrigon point are given)
  • ((-24 Δ2 + a2 SA) p2 + (-8 Δ2 - a2 (a2 - c2)) q r + (-8 Δ2 + a2 SA) r2 + p ((-16 Δ2 - (a2 - c2) SB) q + (-24 Δ2 - (a2 + c2) SC) r)  :
       (-8 Δ2 + b2 SB) p2 + (-16 Δ2 + b2 (a2 + SB)) q r + (-8 Δ2 + b2 SB) r2 + p ((-8 Δ2 - (a2 - c2) SA) q + (-16 Δ2 + b2 (a2 + c2)) r)  :
       (-8 Δ2 + c2 SC) p2 + (-16 Δ2 + (a2 - c2) SB) q r + (-24 Δ2 + c2 SC) r2 + p ((-8 Δ2 + (a2 - c2) c2 ) q + (-24 Δ2 - SA (a2 + c2)) r) )
CT-Coordinates QG-P11 in 3 QL-Quadrigons:         (only coordinates of 1st Quadrigon point are given)
  • (2 a2 m (b2 l2 + c2 l2 - 2 b2 l m + b2 m2) n - 16 Δ2 (-l2 m2 + l m3 + 2 l2 m n - 6 l m2 n + 3 m3 n
      - l2 n2 + 3 l m n2 - 3 m2 n2) - 2 a2 (l2 m2 + l2 n2 + m2 n2) SA - 2 l m (b2 m2 + a2 n2 + b2 n2) SB - 4 c2 l m2 n S :
      2 b2 (a2 + b2 + c2) l m2 n - 16 Δ2 (-l2 m2 + 3 l2 m n - 2 l m2 n - 3 l2 n2 + 3 l m n2 - m2 n2)
      - 2 l m (b2 m2 + a2 n2 + b2 n2) SA - 2 b2 (l2 m2 + l2 n2 + m2 n2) SB - 2 m (b2 l2 + c2 l2 + b2 m2) n SC   :
      -c2 l (-2 b2 m3 + 4 b2 m2 n + a2 l n2 + b2 l n2 - c2 l n2 - 2 a2 m n2 - 2 b2 m n2) - 16 Δ2 (-3 l2 m2
      + 3 l m3 + 3 l2 m n - 6 l m2 n + m3 n - l2 n2 + 2 l m n2 - m2 n2) - 4 a2 l m2 n SA - 2 m (b2 l2 + c2 l2 + b2 m2) n SB - 2 c2 m2 (l2 + n2) SC)
CT-Area of QG-P11-Triangle in the QA-environment:
  • (a4 q r (p2 + p q + p r - 3 q r) + b4 p r (p q + q2 - 3 p r + q r) + c4 p q (-3 p q + p r + q r + r2) - 2 b2 c2 p q r (4 p + q + r) - 2 a2 c2 p q r (p + 4 q + r) - 2 a2 b2 p q r (p + q + 4 r) )   /   (128 Δ (p + q) (p + r) (q + r) (p + q + r))
 
CT-Area of QG-P11-Triangle in the QL-environment:
  • (+a4 m2 n2 (l - m)2 (l - n)2 (13 l2 m2 - 22 l2 m n - 2 l m2 n + 13 l2 n2 - 2 l m n2 + m2 n2)
      + b4 l2 n2 (l - m)2 (m - n)2 (13 l2 m2 - 2 l2 m n - 22 l m2 n + l2 n2 - 2 l m n2 + 13 m2 n2)
      + c4 l2 m2 (l - n)2 (m - n)2 (l2 m2 - 2 l2 m n - 2 l m2 n + 13 l2 n2 - 22 l m n2 + 13 m2 n2)
      + 2 b2 c2 l2 m n (l - m) (l - n) (m - n)2 (l2 m2 - 14 l2 m n + 12 l m2 n + l2 n2 + 12 l m n2 - 13 m2 n2)
      + 2 a2 c2 l m2 n (m - l) (m - n) (l - n)2 (l2 m2 + 12 l2 m n - 14 l m2 n - 13 l2 n2 + 12 l m n2 + m2 n2)
      + 2 a2 b2 l m n2 (n - l) (m - n) (l - m)2 (13 l2 m2 - 12 l2 m n - 12 l m2 n - l2 n2 + 14 l m n2 - m2 n2))
/ (256 Δ (l - m)2 (l - n)2 (m - n)2 (l m - l n - m n) (l m + l n - m n) (l m - l n + m n))
 

DT-Coordinates: 
DT-Coordinates QG-P11 in 3 QA-Quadrigons:         (only coordinates of 1st Quadrigon point are given)
  • ( (3 S2 p2-Sa Sb p2-Sb2 q2-Sc a2 r2)(-p2+q2+r2)+Sb q2 (( Sa+c2) p2+Sb q2-(a2+ Sc) r2)   :
      (-p2+q2+r2) ((S2-Sa2) p2-4 S2 q2-(S2-Sc2) r2)+2 q2 (5 S2 r2+Sa c2 p2+Sb Sc r2)   :
      (3 S2 r2-Sc Sb r2-Sb2 q2-Sa c2 p2)(-r2+q2+p2)+Sb q2 (( Sc+a2) r2+Sb q2-(c2+ Sa) p2))
DT-Coordinates QG-P11 in 3 QL-Quadrigons:         (only coordinates of 1st Quadrigon point are given)
  • (m2 (-Sb a2 l2+(S2+ Sb Sc) m2-(S2-Sb2) n2) :
      (l2-m2) (Sb Sc m2+S2 n2)-(3 S2 l2-2 S2 m2+Sa Sb m2) (m2-n2) :
      -m2 ((S2-Sb2) l2-(Sa Sb+S2) m2+Sb c2 n2))
DT-Area of QG-P11-Triangle in the QA-environment:
  • S/32 + 3(Sa p2+Sb q2+Sc r2)2 / (32 S (-p+q+r) (p+q-r) (p-q+r) (p+q+r))
DT-Area of QG-P11-Triangle in the QL-environment:
  • 3 S/32 - (Sc (l2-m2)2 n2+Sb m2 (l2-n2)2+Sa l2 (m2-n2)2)2 / (32 S (l2-m2)2 (l2-n2)2 (m2-n2)2)


Properties:
    • QG-P8, QG-P9, QG-P10, QG-P11 are collinear on QG-L5, the 2nd QG-Quasi Euler Line.
    • QG-P11 is the Nine-point center of the 2nd QG-Quasi Diagonal Triangle: QG-Tr2.
    • QG-P11 is the Midpoint of QG-P1 and QG-P7.
    • The Midpoint of QA-P1 and QA-P2 lies on the circumcircle of the triangle formed by the three 2nd QG-Quasi Nine-point Centers in a Quadrangle.
    • Let Ni be the Nine-point centers of the Component Triangles Pj.Pk.Pl of the Reference Quadrigon. Now QG-P11 is the Diagonal Crosspoint of the Quadrigon formed by the Midpoints(Pi, Ni) (Eckart Schmidt, September 18, 2012).