ΜΑΘΗΜΑΤΙΚΑ

Πέμπτη 14 Μαΐου 2026

ETC

X(72409) = (name pending)

Barycentrics a^2*(2*a^10 - 7*a^8*b^2 + 5*a^6*b^4 + 5*a^4*b^6 - 7*a^2*b^8 + 2*b^10 + 8*a^8*c^2 + 8*a^6*b^2*c^2 - 72*a^4*b^4*c^2 + 8*a^2*b^6*c^2 + 8*b^8*c^2 - 55*a^6*c^4 + 36*a^4*b^2*c^4 + 36*a^2*b^4*c^4 - 55*b^6*c^4 + 50*a^4*c^6 - 16*a^2*b^2*c^6 + 50*b^4*c^6 - a^2*c^8 - b^2*c^8 - 4*c^10)*(2*a^10 + 8*a^8*b^2 - 55*a^6*b^4 + 50*a^4*b^6 - a^2*b^8 - 4*b^10 - 7*a^8*c^2 + 8*a^6*b^2*c^2 + 36*a^4*b^4*c^2 - 16*a^2*b^6*c^2 - b^8*c^2 + 5*a^6*c^4 - 72*a^4*b^2*c^4 + 36*a^2*b^4*c^4 + 50*b^6*c^4 + 5*a^4*c^6 + 8*a^2*b^2*c^6 - 55*b^4*c^6 - 7*a^2*c^8 + 8*b^2*c^8 + 2*c^10) : :

Antreas Hatzipolakis and Ercole Suppa, euclid 9480.

X(72409) lies on the circumcircle and these lines: { }

X(72409) = intersection, other than A, B, C, of the circumconics : {{A, B, C, X (6), X (47588)}, {A, B, C, X (74), X (98)}, {A, B, C, X (13377), X (14490)}}

X(72410) = X(2)X(47589)∩X(381)X(31748)

Barycentrics -4*a^10-37*a^8*b^2+185*a^6*b^4-109*a^4*b^6-73*a^2*b^8+38*b^10-37*a^8*c^2-70*a^6*b^2*c^2+225*a^4*b^4*c^2+152*a^2*b^6*c^2-142*b^8*c^2+185*a^6*c^4+225*a^4*b^2*c^4-126*a^2*b^4*c^4+104*b^6*c^4-109*a^4*c^6+152*a^2*b^2*c^6+104*b^4*c^6-73*a^2*c^8-142*b^2*c^8+38*c^10 : :
X(72410) = X[2]+2*X[47589], 2*X[2]+X[50730], 4*X[47589]-X[50730], 2*X[381]+X[31748], 5*X[381]-2*X[46673], 5*X[31748]+4*X[46673], 5*X[1656]+4*X[47591], 7*X[3090]+2*X[47590], 2*X[3545]-X[13378], 2*X[14866]+X[50729], 2*X[46732]-5*X[61985]

Antreas Hatzipolakis and Ercole Suppa, euclid 9480.

X(72410) lies on these lines: {2, 47589}, {381, 31748}, {1656, 47591}, {3090, 47590}, {3545, 13378}, {3839, 11645}, {5056, 47592}, {14866, 50729}, {46732, 61985}

X(72410) = reflection of X(i) in X(j) for these {i,j}: {13378, 3545}
X(72410) = {X(i),X(j)}-harmonic conjugate of X(k) for these (i,j,k): {2, 47589, 50730}

X(72411) = X(115)X(1499)∩X(187)X(524)

Barycentrics (b^2-c^2)^2*(-2*a^2+b^2+c^2)*(7*a^4-4*a^2*b^2+b^4-4*a^2*c^2-b^2*c^2+c^4) : :
X(72411) = X[115] - 2*X[67397], X[843] + X[6792], 2*X[620] - X[56429], 3*X[1691] - X[70601], 2*X[2030] - X[62373], 3*X[5215] - 2*X[37745], 2*X[32525] - X[44956], 3*X[26613] - X[62295], X[31173] - 2*X[37746]

Antreas Hatzipolakis and Ercole Suppa, euclid 9499.

X(72411) lies on these lines: {32, 67227}, {115, 1499}, {187, 524}, {476, 843}, {512, 6791}, {542, 67371}, {620, 56429}, {1648, 5099}, {1691, 70601}, {2030, 15303}, {2549, 67717}, {3815, 53798}, {3849, 62293}, {5104, 43913}, {5215, 37745}, {5475, 9169}, {5913, 67557}, {6077, 45672}, {6388, 14858}, {7603, 9151}, {7746, 15098}, {8288, 35605}, {9181, 41672}, {10418, 50566}, {14916, 21843}, {15357, 44398}, {17964, 34806}, {26613, 62295}, {31173, 37746}, {32761, 48945}, {37637, 57312}

X(72411) = midpoint of X(843) and X(6792)
X(72411) = reflection of X(i) in X(j) for these {i,j} : {115, 67397}, {31173, 37746}, {44956, 32525}, {56429, 620}, {62373, 2030}
X(72411) = reflection of X(i) in the line X(j)X(k) for these {i,j,k} : {2482, 2, 1499}, {5477, 6, 1499}, {18800, 597, 1499}, {50567, 141, 1499}
X(72411) = foot of the perpendicular from X(i) to the line X(j)X(k) for these {i, j, k} : {115, 187, 2482}, {187, 115, 38395}, {1691, 8288, 35605}, {8288, 1691, 70601}
X(72411) = perspector of the circumconic through X(5468) and X(9123)
X(72411) = intersection, other than A, B, C, of the circumconics : {{A, B, C, X(476), X(9123)}, {A,B,C,X(524),X(26613)}, {A,B,C,X(1648),X(39785)},{A,B,C,X(2482),X(20382)}}
X(72411) = center of circle {X(843), X(5912), X(6792)}
X(72411) = pole of the line {2793, 5461} with respect to Kiepert hyperbola
X(72411) = pole of the line {111, 52239} with respect to Stammler hyperbola
X(72411) = pole of the line {125, 62293} with respect to orthoptic circle of Jerabek hyperbola
X(72411) = pole of tripolar of X(62672) with respect to orthoptic circle of Kiepert hyperbola
X(72411) = pole of the line {22110, 42008} with respect to dual conic of Wallace hyperbola
X(72411) = crossdifference of every pair of points on the line X(9124)X(9178)
X(72411) = barycentric product X(i)*X(j) for these (i,j): {690, 9123}, {1648, 26613}
X(72411) = barycentric quotient X(i)/X(j) for these (i,j) : {51, 9124}, {9123, 892}, {21906, 52239}, {26613, 52940}
X(72411) = trilinear product X(2642)*X(9123)
X(72411) = trilinear quotient X(i)/X(j) for these (i,j) : {2642, 9124}, {9123, 36085}

X(72412) = X(125)X(1499)∩X(468)X(524)

Barycentrics (b^2-c^2)^2*(-2*a^2+b^2+c^2)*(3*a^6-a^4*b^2-3*a^2*b^4+b^6-a^4*c^2+7*a^2*b^2*c^2-2*b^4*c^2-3*a^2*c^4-2*b^2*c^4+c^6) : :
X(72412) = X[125]-2*X[67398], X[31655]-2*X[32525], X[2770]+X[6792], 2*X[5972]-X[67394], X[7426]+X[62293], 5*X[47453]-X[70601], 3*X[47455]-X[62373]

Antreas Hatzipolakis and Ercole Suppa, euclid 9499.

X(72412) lies on these lines: {30, 37746}, {115, 47587}, {125, 1499}, {373, 2679}, {468, 524}, {511, 47349}, {512, 57425}, {523, 6791}, {542, 32222}, {1316, 9169}, {1648, 5099}, {2696, 54012}, {2715, 2770}, {3258, 46659}, {5108, 61644}, {5912, 47200}, {5972, 67394}, {6077, 50567}, {7426, 18800}, {9125, 23992}, {10989, 43910}, {13857, 47574}, {15638, 51258}, {34806, 68315}, {37638, 57355}, {37648, 53805}, {43964, 45303}, {44114, 55148}, {44569, 64966}, {47004, 52038}, {47453, 70601}, {47455, 62373}, {48317, 63758}, {57345, 63128}, {61645, 67392}

X(72412) = midpoint of X(i) and X(j) for these {i,j}: {2770, 6792}, {7426, 62293}
X(72412) = reflection of X(i) in X(j) for these {i,j}: {125, 67398}, {31655, 32525}, {67394, 5972}
X(72412) = reflection of X(i) in the line X(j)X(k) for these {i,j,k}: {5095, 6, 1499}, {5181, 141, 1499}, {5642, 2, 1499}, {15303, 597, 1499}
X(72412) = foot of the perpendicular from X(i) to the line X(j)X(k) for these {i,j,k}: {37746, 6791, 67397}, {115, 7426, 18800}, {7426, 115, 47587}, {125, 468, 3292}, {468, 125, 2682}, {3258, 1316, 9169}, {1316, 3258, 46659}
X(72412) = {X(468),X(47550)}-harmonic conjugate of X(5642)
X(72412) = perspector of the circumconic through X(4235) and X(23287)
X(72412) = intersection, other than A, B, C, of the circumconics: {{A,B,C,X(468),X(57604)}, {A,B,C,X(5095),X(20382)}, {A,B,C,X(44102),X(52238)}}
X(72412) = center of circle {X(2770), X(6792), X(67393)}
X(72412) = pole of the line {30786, 52236} with respect to Wallace hyperbola
X(72412) = pole of the line {125, 524} with respect to orthoptic circle of Jerabek hyperbola
X(72412) = pole of the line {115, 62373} with respect to orthoptic circle of Kiepert hyperbola
X(72412) = pole of the line {42008, 47097} with respect to dual conic of Wallace hyperbola
X(72412) = cross-difference of every pair of points on the line X(10097)X(32583)
X(72412) = barycentric product X(i)*X(j) for these (i, j): {524, 57604}, {52238, 52628}
X(72412) = barycentric quotient X(i)/X(j) for these (i, j): {1648, 52236}, {52238, 66929}, {57604, 671}
X(72412) = trilinear product X(896)*X(57604)
X(72412) = trilinear quotient X(897)/X(57504)

ORTHOLOGIC TRIANGLES

Let ABC be a triangle, P, Q two points, A'B'C' the padal triangle of Q and S a point on the Euler line such that OS/OH= t: number.

Denote:

Ab, Ac = the orthogonal projections of A on BP, CP, resp.
Sa = same to S point of the triangle A'AbAc.
Similary Sb,Sc.

Cases the triangle ABC, SaSbSc are orthologic.

1. Let ABC be a triangle, P a point and A'B'C' the pedal triangle of a point Q.

Denote:

Ab, Ac = the orthogonal projections of A on BP, CP, resp.

Ga = the centroid of A'AbAc.
Similarly Gb, Gc

ABC, GaGbGc are circumorthologic.
ie The Orthologic center (ABC, GaGbGc) = X1 lies on the circumcircle of ABC.
The Orthologic center (GaGbGc, ABC) = X2 lies on the circumcircle of GaGbGc.

2. Let ABC be a triangle, P = I = X(1), A'B'C' the pedal triangle of a point Q and S a point on the Euler line such that OS/OH= t: number.

Denote:

Ab, Ac = the orthogonal projections of A on BI, CI, resp.

Sa = same to S point of the triangle A'AbAc.
Similarly Sb, Sc

ABC, SaSbSc are Orthologic.

3. Let ABC be a triangle, P, Q two isogonal conjugate points, A'B'C' the pedal triangle of Q and S a point on the Euler line such that OS/OH= t: number.

Denote:

Ab, Ac = the orthogonal projections of A on BP, CP, resp.

Sa = same to S point of the triangle A'AbAc.
Similarly Sb, Sc

ABC, SaSbSc are circumoerthologic. ie The Orthologic center (ABC, SaSbSc) = X1 lies on the circumcircle of ABC.
The Orthologic center (SaSbSc, ABC) = X2 lies on the circumcircle of SaSbSc.

Πέμπτη 7 Μαΐου 2026

EULER

X(72398) = 105TH HATZIPOLAKIS-MOSES-EULER POINT

Barycentrics 6*a^10 - 11*a^8*b^2 - 2*a^6*b^4 + 12*a^4*b^6 - 4*a^2*b^8 - b^10 - 11*a^8*c^2 + 38*a^6*b^2*c^2 - 21*a^4*b^4*c^2 - 9*a^2*b^6*c^2 + 3*b^8*c^2 - 2*a^6*c^4 - 21*a^4*b^2*c^4 + 26*a^2*b^4*c^4 - 2*b^6*c^4 + 12*a^4*c^6 - 9*a^2*b^2*c^6 - 2*b^4*c^6 - 4*a^2*c^8 + 3*b^2*c^8 - c^10 : :
X(72398) = 5 X[3] - 3 X[16532], 3 X[3] - X[43893], 7 X[3] - 3 X[46451], X[23] - 4 X[62087], 3 X[140] - 2 X[403], 5 X[140] - 4 X[15350], 5 X[140] - 2 X[44267], 3 X[376] + X[35452], 4 X[403] - 3 X[11558], 5 X[403] - 6 X[15350], X[403] - 3 X[34152], 5 X[403] - 3 X[44267], 4 X[468] - 7 X[61784], 5 X[546] - 8 X[5159], 7 X[546] - 8 X[63838], 3 X[547] - 4 X[10257], 7 X[547] - 4 X[47310], 25 X[548] - 4 X[37899], 9 X[548] - 4 X[37931], 7 X[548] - 4 X[47335], 19 X[548] - 4 X[47342], 3 X[549] - X[52403], 5 X[550] + X[5189], 3 X[550] - X[13619], 2 X[858] + X[62151], X[1657] + 3 X[44450], X[2070] - 3 X[8703], 5 X[2071] - X[18403], 3 X[2071] - X[37938], 9 X[2071] - X[64890], 7 X[2072] - 3 X[65087], 5 X[3522] - X[5899], 7 X[3528] - 3 X[37922], 2 X[3530] - 3 X[37948], 3 X[3534] + X[46450], X[3627] - 3 X[65085], 7 X[3853] - 6 X[65087], 3 X[5066] - 2 X[44283], 7 X[5159] - 5 X[63838], 3 X[5189] + 5 X[13619], X[5189] - 5 X[18859], 3 X[7426] - 5 X[15646], 2 X[7426] - 5 X[34200], X[7464] + 2 X[44245], X[7574] + 2 X[62136], 5 X[10096] - 6 X[16532], 3 X[10096] - 2 X[43893], 7 X[10096] - 6 X[46451], 4 X[10151] - 5 X[61940], 7 X[10257] - 3 X[47310], 5 X[11558] - 8 X[15350], X[11558] - 4 X[34152], 5 X[11558] - 4 X[44267], X[11563] - 3 X[37948], 2 X[11799] - 5 X[61790], 3 X[12100] - 2 X[44234], 3 X[12101] - 4 X[23323], X[12103] + 2 X[37950], 5 X[12812] - 2 X[62288], X[13473] - 3 X[15122], 4 X[13473] - 3 X[62026], X[13619] + 3 X[18859], 3 X[14893] - 2 X[64891], 4 X[15122] - X[62026], 2 X[15350] - 5 X[34152], 2 X[15646] - 3 X[34200], 9 X[15688] - X[37949], 3 X[15690] - 2 X[44246], X[15690] + 2 X[54995], 5 X[15712] - 3 X[37943], 9 X[16532] - 5 X[43893], 7 X[16532] - 5 X[46451], 8 X[16976] - 7 X[61821], X[18325] - 4 X[61792], 3 X[18403] - 5 X[37938], 9 X[18403] - 5 X[64890], 2 X[18572] + X[62156], X[20063] - 13 X[62105], 5 X[22248] - 2 X[62344], 3 X[25338] - 4 X[37935], 7 X[25338] - 4 X[47338], 2 X[25338] - 5 X[62064], 5 X[30745] - 2 X[62013], 5 X[34152] - X[44267], X[35001] + 5 X[62104], 3 X[35489] - 7 X[62100], 5 X[37760] - 11 X[62062], 9 X[37899] - 25 X[37931], 7 X[37899] - 25 X[47335], 19 X[37899] - 25 X[47342], 5 X[37923] - 17 X[62084], X[37924] - 7 X[62091], X[37925] - 6 X[62089], 7 X[37931] - 9 X[47335], 19 X[37931] - 9 X[47342], 2 X[37935] - 3 X[37968], 7 X[37935] - 3 X[47338], 8 X[37935] - 15 X[62064], 3 X[37938] - X[64890], 3 X[37941] - 4 X[58190], X[37944] + 4 X[41981], X[37947] - 3 X[44280], 3 X[37955] - 2 X[44264], 3 X[37955] - 5 X[46853], 3 X[37956] - 11 X[62085], 5 X[37958] - 11 X[62079], 7 X[37968] - 2 X[47338], 4 X[37968] - 5 X[62064], 9 X[41982] - 8 X[47114], 3 X[41983] - 2 X[44282], 7 X[43893] - 9 X[46451], 2 X[44214] - 3 X[61782], X[44246] + 3 X[54995], 2 X[44264] - 5 X[46853], 4 X[44452] - 5 X[61810], 8 X[44911] - 9 X[47598], 4 X[44961] - 7 X[61821], 4 X[46031] - 5 X[48154], 4 X[47090] + X[58203], 4 X[47311] + 5 X[62138], 19 X[47335] - 7 X[47342], 4 X[47336] - 7 X[55862], 8 X[47338] - 35 X[62064], 7 X[50693] + X[60466], 5 X[60455] + 7 X[62134], 3 X[60462] + 5 X[62131], 13 X[62092] - X[62290], 3 X[13363] - 2 X[13446]

See Antreas Hatzipolakis and Peter Moses, euclid 9446.

X(72398) lies on these lines: {2, 3}, {74, 50708}, {477, 33639}, {930, 67735}, {1154, 17855}, {1291, 67797}, {1294, 13863}, {2693, 30248}, {2777, 46114}, {6799, 53934}, {13363, 13446}, {13391, 37853}, {13399, 32423}, {13445, 34153}, {14677, 43574}, {22115, 43391}, {29011, 67784}, {40111, 50434}, {53884, 67727}

X(72398) = midpoint of X(i) and X(j) for these {i,j}: {550, 18859}, {3153, 15704}, {13445, 34153}, {14677, 43574}, {16386, 37950}, {40111, 50434}
X(72398) = reflection of X(i) in X(j) for these {i,j}: {140, 34152}, {186, 33923}, {3853, 2072}, {10096, 3}, {11558, 140}, {11563, 3530}, {12103, 16386}, {25338, 37968}, {31726, 3628}, {44267, 15350}, {44961, 16976}, {47096, 22249}
X(72398) = {X(i),X(j)}-harmonic conjugate of X(k) for these (i,j,k): {403, 13473, 44226}, {427, 21284, 65154}, {3520, 13619, 403}, {3530, 50143, 140}, {5159, 7426, 6677}, {5189, 6636, 7426}, {11563, 37948, 3530}, {15690, 66718, 548}, {16387, 47311, 5159}

X(72399) = 106TH HATZIPOLAKIS-MOSES-EULER POINT

Barycentrics 4*a^10 - 12*a^8*b^2 + 8*a^6*b^4 + 8*a^4*b^6 - 12*a^2*b^8 + 4*b^10 - 12*a^8*c^2 + 2*a^6*b^2*c^2 - 7*a^4*b^4*c^2 + 29*a^2*b^6*c^2 - 12*b^8*c^2 + 8*a^6*c^4 - 7*a^4*b^2*c^4 - 34*a^2*b^4*c^4 + 8*b^6*c^4 + 8*a^4*c^6 + 29*a^2*b^2*c^6 + 8*b^4*c^6 - 12*a^2*c^8 - 12*b^2*c^8 + 4*c^10 : :
X(72399) = X[2] - 9 X[37943], X[2] - 3 X[44282], 25 X[2] - 9 X[44450], 7 X[2] + 9 X[46451], 17 X[2] - 9 X[65085], 2 X[5] + X[12105], X[23] + 3 X[5055], 7 X[140] + 2 X[47338], 3 X[186] + X[3830], 5 X[381] - X[10296], X[381] + 3 X[37907], 3 X[403] - X[3845], 3 X[403] + X[44265], 4 X[468] - X[18571], 3 X[468] - X[18579], 5 X[468] - 2 X[22249], 2 X[468] + X[44961], 9 X[468] - X[47031], 13 X[468] - X[47308], 11 X[468] + X[47309], 7 X[468] + X[47310], 3 X[468] + X[47332], 5 X[468] - X[47333], 7 X[468] - X[47335], 5 X[468] + X[47336], 3 X[549] - X[54995], 5 X[632] + X[62344], X[858] - 3 X[15699], 5 X[1656] - X[10989], 5 X[1656] + X[37967], 3 X[2070] + 5 X[19709], 3 X[2071] - 7 X[15701], 3 X[2072] + X[47313], 3 X[2072] - 5 X[61910], 7 X[3090] + X[37901], 3 X[3153] - 11 X[61932], 3 X[3524] + X[18325], X[3534] - 3 X[15646], 3 X[3545] - X[18572], 3 X[3545] + 5 X[37760], 2 X[3628] + X[16619], 5 X[3843] + 7 X[37957], 7 X[3851] + 5 X[37953], X[3853] + 2 X[37934], 3 X[5054] - X[37950], X[5066] + 3 X[10096], X[5066] - 6 X[37942], 2 X[5066] - 3 X[46031], 7 X[5066] - 6 X[63838], 11 X[5070] + X[37946], 5 X[5071] - X[7574], 5 X[5071] + 3 X[37909], 2 X[5159] - 3 X[47599], X[5189] - 9 X[61899], 3 X[5899] + 13 X[61901], X[7464] - 5 X[15694], X[7574] + 3 X[37909], 5 X[7575] + X[10296], X[7575] - 3 X[37907], X[8703] + 3 X[11563], 5 X[8703] - 3 X[16386], 2 X[8703] - 3 X[37968], X[8703] - 3 X[44214], X[8703] - 6 X[44900], X[10096] + 2 X[37942], 2 X[10096] + X[46031], 7 X[10096] + 2 X[63838], 2 X[10109] + X[37904], 3 X[10151] - 2 X[61997], 3 X[10257] - 4 X[11540], X[10296] + 15 X[37907], X[10297] + 2 X[44264], X[11001] + 3 X[31726], X[11558] + 2 X[16531], 3 X[11558] + X[62138], 5 X[11563] + X[16386], 2 X[11563] + X[37968], X[11563] + 2 X[44900], 3 X[11799] + X[54995], 2 X[11812] - 3 X[44452], X[12100] - 3 X[44234], 4 X[12811] - X[47339], 3 X[13619] + 5 X[62007], 3 X[14269] + 5 X[37958], 3 X[14892] + 4 X[47316], 2 X[15350] + X[37971], 6 X[15350] - X[47311], 3 X[15350] - 2 X[61896], X[15681] - 5 X[37952], X[15682] - 3 X[44283], X[15685] - 9 X[37955], 5 X[15693] - 3 X[34152], 5 X[15695] - 9 X[37941], 7 X[15703] + X[37924], 5 X[15713] + 3 X[43893], 2 X[16386] - 5 X[37968], X[16386] - 5 X[44214], X[16386] - 10 X[44900], 6 X[16531] - X[62138], 9 X[16532] - X[19710], 3 X[16532] - X[44280], X[18323] - 3 X[23046], 3 X[18403] - 7 X[41106], 3 X[18571] - 4 X[18579], 5 X[18571] - 8 X[22249], X[18571] + 2 X[44961], 9 X[18571] - 4 X[47031], 13 X[18571] - 4 X[47308], 11 X[18571] + 4 X[47309], 7 X[18571] + 4 X[47310], 3 X[18571] + 4 X[47332], 5 X[18571] - 4 X[47333], X[18571] + 4 X[47334], 7 X[18571] - 4 X[47335], 5 X[18571] + 4 X[47336], X[18572] + 5 X[37760], 5 X[18579] - 6 X[22249], 2 X[18579] + 3 X[44961], 3 X[18579] - X[47031], 13 X[18579] - 3 X[47308], 11 X[18579] + 3 X[47309], 7 X[18579] + 3 X[47310], 5 X[18579] - 3 X[47333], X[18579] + 3 X[47334], 7 X[18579] - 3 X[47335], 5 X[18579] + 3 X[47336], 3 X[18859] - 11 X[61843], 5 X[19708] + 3 X[52403], X[19710] - 3 X[44280], X[20063] + 15 X[61906], 5 X[22248] + 3 X[41987], 4 X[22249] + 5 X[44961], 18 X[22249] - 5 X[47031], 26 X[22249] - 5 X[47308], 22 X[22249] + 5 X[47309], 14 X[22249] + 5 X[47310], 6 X[22249] + 5 X[47332], 2 X[22249] + 5 X[47334], 14 X[22249] - 5 X[47335], 2 X[22249] + X[47336], 3 X[23323] - 4 X[61960], X[25338] + 2 X[68319], 5 X[30745] - 9 X[61887], 7 X[33699] - 9 X[65087], X[35001] - 9 X[61864], 4 X[35018] + X[47312], 4 X[35018] - X[47341], 3 X[35452] - 19 X[61857], 9 X[35489] + 7 X[62009], 2 X[37897] + 3 X[47478], X[37899] + 6 X[45757], X[37900] + 9 X[61909], 4 X[37911] - 3 X[47598], 9 X[37922] + 7 X[61974], 5 X[37923] + 11 X[61925], 3 X[37925] + 17 X[61893], 3 X[37931] + 2 X[62010], 6 X[37935] + X[62022], 3 X[37936] + 7 X[61920], 3 X[37938] - X[47314], 3 X[37938] - 7 X[61898], 9 X[37940] + 11 X[61950], 4 X[37942] - X[46031], 7 X[37942] - X[63838], 9 X[37943] + X[44266], 3 X[37943] - X[44282], 25 X[37943] - X[44450], 7 X[37943] + X[46451], 17 X[37943] - X[65085], 3 X[37944] - 23 X[61862], 3 X[37947] + 11 X[61908], 9 X[37948] - 13 X[61797], X[37968] - 4 X[44900], 3 X[37971] + X[47311], 3 X[37971] + 4 X[61896], 3 X[38335] + X[56369], 3 X[44246] - X[62154], X[44266] + 3 X[44282], 25 X[44266] + 9 X[44450], 7 X[44266] - 9 X[46451], 17 X[44266] + 9 X[65085], 25 X[44282] - 3 X[44450], 7 X[44282] + 3 X[46451], 17 X[44282] - 3 X[65085], 7 X[44450] + 25 X[46451], 17 X[44450] - 25 X[65085], 9 X[44961] + 2 X[47031], 13 X[44961] + 2 X[47308], 11 X[44961] - 2 X[47309], 7 X[44961] - 2 X[47310], 3 X[44961] - 2 X[47332], 5 X[44961] + 2 X[47333], 7 X[44961] + 2 X[47335], 5 X[44961] - 2 X[47336], 7 X[46031] - 4 X[63838], 3 X[46450] - 19 X[61913], 17 X[46451] + 7 X[65085], 13 X[47031] - 9 X[47308], 11 X[47031] + 9 X[47309], 7 X[47031] + 9 X[47310], X[47031] + 3 X[47332], 5 X[47031] - 9 X[47333], X[47031] + 9 X[47334], 7 X[47031] - 9 X[47335], 5 X[47031] + 9 X[47336], 3 X[47096] + 7 X[61851], 11 X[47308] + 13 X[47309], 7 X[47308] + 13 X[47310], 3 X[47308] + 13 X[47332], 5 X[47308] - 13 X[47333], X[47308] + 13 X[47334], 7 X[47308] - 13 X[47335], 5 X[47308] + 13 X[47336], 7 X[47309] - 11 X[47310], 3 X[47309] - 11 X[47332], 5 X[47309] + 11 X[47333], X[47309] - 11 X[47334], 7 X[47309] + 11 X[47335], 5 X[47309] - 11 X[47336], 3 X[47310] - 7 X[47332], 5 X[47310] + 7 X[47333], X[47310] - 7 X[47334], 5 X[47310] - 7 X[47336], X[47311] - 4 X[61896], X[47313] + 5 X[61910], X[47314] - 7 X[61898], 5 X[47332] + 3 X[47333], X[47332] - 3 X[47334], 7 X[47332] + 3 X[47335], 5 X[47332] - 3 X[47336], X[47333] + 5 X[47334], 7 X[47333] - 5 X[47335], 7 X[47334] + X[47335], 5 X[47334] - X[47336], 5 X[47335] + 7 X[47336], X[47340] + 4 X[67236], X[47342] + 4 X[61922], 7 X[55856] - X[62332], 3 X[57584] - 5 X[61998], 5 X[60455] - 21 X[61897], 15 X[61882] + X[62290], 7 X[62000] - 3 X[64890], X[62043] - 3 X[64891], X[110] + 3 X[15362], 3 X[5215] - X[38611], X[9158] + 3 X[57305], X[11179] - 5 X[47453], X[11801] + 2 X[15448], 3 X[14643] + X[15360], 2 X[15088] + X[32237], X[20423] + 3 X[47450], X[21850] + 5 X[47452], X[34315] + 3 X[59403], X[34316] + 3 X[59404], 3 X[47455] - X[50979], X[47471] + 3 X[47562], X[50955] + 3 X[52238]

See Antreas Hatzipolakis and Peter Moses, euclid 9446.

X(72399) lies on these lines: {2, 3}, {110, 15362}, {113, 15361}, {524, 10272}, {952, 47495}, {3564, 47544}, {5215, 38611}, {5844, 47488}, {9158, 57305}, {11178, 32217}, {11179, 47453}, {11645, 20304}, {11649, 13364}, {11801, 15448}, {12900, 19924}, {14643, 15360}, {15088, 32237}, {16328, 18487}, {20423, 47450}, {21850, 47452}, {32423, 35266}, {32515, 46986}, {34315, 59403}, {34316, 59404}, {34380, 47473}, {43291, 47169}, {43656, 53950}, {44204, 47219}, {44569, 46817}, {45969, 61606}, {47455, 50979}, {47471, 47562}, {47556, 47581}, {50955, 52238}, {61572, 62508}, {61619, 63124}

X(72399) = midpoint of X(i) and X(j) for these {i,j}: {2, 44266}, {5, 7426}, {113, 15361}, {376, 44267}, {381, 7575}, {468, 47334}, {547, 25338}, {549, 11799}, {3845, 44265}, {10295, 15687}, {10989, 37967}, {11178, 32217}, {11563, 44214}, {11737, 44264}, {15686, 62288}, {16619, 47097}, {18579, 47332}, {44204, 47219}, {44569, 46817}, {47310, 47335}, {47312, 47341}, {47333, 47336}, {47556, 47581}
X(72399) = reflection of X(i) in X(j) for these {i,j}: {547, 68319}, {10297, 11737}, {12105, 7426}, {14893, 37984}, {15122, 10124}, {37968, 44214}, {44214, 44900}, {44961, 47334}, {47097, 3628}, {47333, 22249}, {62139, 66595}
X(72399) = {X(i),X(j)}-harmonic conjugate of X(k) for these (i,j,k): {381, 37907, 7575}, {403, 44265, 3845}, {403, 66725, 37984}, {468, 44961, 18571}, {468, 47332, 18579}, {468, 47336, 22249}, {5071, 37909, 7574}, {10096, 37942, 46031}, {10096, 44233, 25338}, {10109, 66529, 5066}, {10296, 10298, 16386}, {11563, 44900, 37968}, {13626, 13627, 381}, {14002, 37907, 7426}, {18579, 47334, 47332}, {25338, 44234, 25337}, {34330, 62961, 14893}, {44233, 68319, 46031}, {44266, 44282, 2}, {57322, 57323, 61924}

Τρίτη 5 Μαΐου 2026

TWO PROBLEMS CONNECTED

Francisco Javier García Capitán, Two problems [by Antreas Hatzipolakis] connected.

FGJC
geogebra file

Τετάρτη 25 Μαρτίου 2026

z

X(72407) = X(13)X(42788)∩X(14)X(1506)

Barycentrics 8 a^16 - 84 a^14 b^2 + 375 a^12 b^4 - 908 a^10 b^6 + 1288 a^8 b^8 - 1086 a^6 b^10 + 528 a^4 b^12 - 136 a^2 b^14 + 15 b^16 - 84 a^14 c^2 + 594 a^12 b^2 c^2 - 1492 a^10 b^4 c^2 + 1258 a^8 b^6 c^2 + 552 a^6 b^8 c^2 - 1476 a^4 b^10 c^2 + 766 a^2 b^12 c^2 - 130 b^14 c^2 + 375 a^12 c^4 - 1492 a^10 b^2 c^4 + 1076 a^8 b^4 c^4 + 1002 a^6 b^6 c^4 + 391 a^4 b^8 c^4 - 1492 a^2 b^10 c^4 + 487 b^12 c^4 - 908 a^10 c^6 + 1258 a^8 b^2 c^6 + 1002 a^6 b^4 c^6 + 1082 a^4 b^6 c^6 + 862 a^2 b^8 c^6 - 1018 b^10 c^6 + 1288 a^8 c^8 + 552 a^6 b^2 c^8 + 391 a^4 b^4 c^8 + 862 a^2 b^6 c^8 + 1292 b^8 c^8 - 1086 a^6 c^10 - 1476 a^4 b^2 c^10 - 1492 a^2 b^4 c^10 - 1018 b^6 c^10 + 528 a^4 c^12 + 766 a^2 b^2 c^12 + 487 b^4 c^12 - 136 a^2 c^14 - 130 b^2 c^14 + 15 c^16 - 4 a^14 T + 28 a^12 b^2 T - 86 a^10 b^4 T + 138 a^8 b^6 T - 134 a^6 b^8 T + 78 a^4 b^10 T - 22 a^2 b^12 T + 2 b^14 T + 28 a^12 c^2 T - 112 a^10 b^2 c^2 T + 142 a^8 b^4 c^2 T - 48 a^6 b^6 c^2 T - 58 a^4 b^8 c^2 T + 56 a^2 b^10 c^2 T - 6 b^12 c^2 T - 86 a^10 c^4 T + 142 a^8 b^2 c^4 T - 112 a^6 b^4 c^4 T + 56 a^4 b^6 c^4 T - 84 a^2 b^8 c^4 T + 8 b^10 c^4 T + 138 a^8 c^6 T - 48 a^6 b^2 c^6 T + 56 a^4 b^4 c^6 T + 96 a^2 b^6 c^6 T - 4 b^8 c^6 T - 134 a^6 c^8 T - 58 a^4 b^2 c^8 T - 84 a^2 b^4 c^8 T - 4 b^6 c^8 T + 78 a^4 c^10 T + 56 a^2 b^2 c^10 T + 8 b^4 c^10 T - 22 a^2 c^12 T - 6 b^2 c^12 T + 2 c^14 T : : where T = Sqrt[3] S

Benjamin Lee Warren and Francisco Javier García Capitán, euclid 9479.

X(72407) lies on these lines: {5, 11602}, {13, 42788}, {14, 1506}, {17, 5615}, {18, 59403}, {76, 16966}, {83, 6671}, {5487, 35689}, {6115, 11606}, {10187, 25555}, {11122, 37832}, {11272, 43539}, {12817, 52649}, {16242, 62877}, {16964, 54861}

X(72408) = X(13)X(1506)∩X(14)X(42788)

Barycentrics 8 a^16-84 a^14 b^2+375 a^12 b^4-908 a^10 b^6+1288 a^8 b^8-1086 a^6 b^10+528 a^4 b^12-136 a^2 b^14+15 b^16-84 a^14 c^2+594 a^12 b^2 c^2-1492 a^10 b^4 c^2+1258 a^8 b^6 c^2+552 a^6 b^8 c^2-1476 a^4 b^10 c^2+766 a^2 b^12 c^2-130 b^14 c^2+375 a^12 c^4-1492 a^10 b^2 c^4+1076 a^8 b^4 c^4+1002 a^6 b^6 c^4+391 a^4 b^8 c^4-1492 a^2 b^10 c^4+487 b^12 c^4-908 a^10 c^6+1258 a^8 b^2 c^6+1002 a^6 b^4 c^6+1082 a^4 b^6 c^6+862 a^2 b^8 c^6-1018 b^10 c^6+1288 a^8 c^8+552 a^6 b^2 c^8+391 a^4 b^4 c^8+862 a^2 b^6 c^8+1292 b^8 c^8-1086 a^6 c^10-1476 a^4 b^2 c^10-1492 a^2 b^4 c^10-1018 b^6 c^10+528 a^4 c^12+766 a^2 b^2 c^12+487 b^4 c^12-136 a^2 c^14-130 b^2 c^14+15 c^16+4 a^14 T-28 a^12 b^2 T+86 a^10 b^4 T-138 a^8 b^6 T+134 a^6 b^8 T-78 a^4 b^10 T+22 a^2 b^12 T-2 b^14 T-28 a^12 c^2 T+112 a^10 b^2 c^2 T-142 a^8 b^4 c^2 T+48 a^6 b^6 c^2 T+58 a^4 b^8 c^2 T-56 a^2 b^10 c^2 T+6 b^12 c^2 T+86 a^10 c^4 T-142 a^8 b^2 c^4 T+112 a^6 b^4 c^4 T-56 a^4 b^6 c^4 T+84 a^2 b^8 c^4 T-8 b^10 c^4 T-138 a^8 c^6 T+48 a^6 b^2 c^6 T-56 a^4 b^4 c^6 T-96 a^2 b^6 c^6 T+4 b^8 c^6 T+134 a^6 c^8 T+58 a^4 b^2 c^8 T+84 a^2 b^4 c^8 T+4 b^6 c^8 T-78 a^4 c^10 T-56 a^2 b^2 c^10 T-8 b^4 c^10 T+22 a^2 c^12 T+6 b^2 c^12 T-2 c^14 T : : where T = Sqrt[3] S

Benjamin Lee Warren and Francisco Javier García Capitán, euclid 9479.

X(72408) lies on these lines: {5, 11603}, {13, 1506}, {14, 42788}, {17, 59404}, {18, 5611}, {76, 16967}, {83, 6672}, {5488, 35688}, {6114, 11606}, {10188, 25555}, {11121, 37835}, {11272, 43538}, {12816, 44289}, {16241, 62876}, {16965, 54860}

Πέμπτη 24 Απριλίου 2025

ETC

X(5459)
Let ABC be a triangle, let A', B', C' be the midpoints of BC, CA, AB. Let L_a be the perpendicular through A' to the line X(618)A'. Define L_b, L_c cyclically. Then X(5459) is the center of the equilateral triangle A''B''C'' bounded by L_a, L_b, L_c. The circumcircle of A''B''C'' passes through X(14081) and X(32552) and has squared radius (3 sqrt(3) S^3 + 9 S^2 SW + 3 sqrt(3) S SW^2 + SW^3)/(9 (3 S^2 + 2 sqrt(3) S SW + SW^2)). This circle (A''B''C'') is here named 1st Suppa circle. The 2nd Suppa circle is defined at X(5460)
(Euclid 8675, August 28, 2025 )

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X(5960)
Let ABC be a triangle, let A', B', C' be the midpoints of BC, CA, AB. Let L_a be the perpendicular through A' to the line X(619)A'. Define L_b, L_c cyclically. Then X(5460) is the center of the equilateral triangle A''B''C'' bounded by L_a, L_b, L_c. The circumcircle of A''B''C'' passes through X(14082) and X(32553)and has squared radius (-3 sqrt(3) S^3 + 9 S^2 SW - 3 sqrt(3) S SW^2 + SW^3)/(9 (3 S^2 - 2 sqrt(3) S SW + SW^2)). The circle (A''B''C'') is here named 2nd Suppa circle. The 1st Suppa circle is defined at X(5459)
(Euclid 8675, August 28, 2025 )

Δευτέρα 3 Μαρτίου 2025

Another relationship between Napoleon cubic and Neuberg cubic

Another relationship between Napoleon cubic K005 and Neuberg cubic K001
The world of Triangle Geometry is very intrincate. There are many paths that lead to the same place.

In this case a problem from proposed by Benjamin L. Warren at Euclid 8052 and later expanded by Antreas Hatzipolakis at Euclid 8057 lead to a relationship between these two cubics.

Another relationship between Napoleon cubic and Neuberg cubic

Francisco Javier García Capitán