| Sr no. | class members | # points | points | 1 | y2 = x3 + 103x + 6 | 69 | (5,38) (5,95) (6,21) (6,112) (12,24) (12,52) (12,81) (12,109) (19,24) (19,52) (19,81) (19,109) (26,24) (26,52) (26,81) (26,109) (34,28) (34,105) (40,31) (40,45) (40,88) (40,102) (41,0) (47,3) (47,60) (47,73) (47,130) (55,56) (55,77) (61,11) (61,46) (61,87) (61,122) (62,0) (68,38) (68,95) (69,14) (69,119) (75,4) (75,53) (75,80) (75,129) (76,14) (76,119) (82,17) (82,59) (82,74) (82,116) (83,14) (83,119) (97,7) (97,126) (104,35) (104,98) (110,10) (110,66) (110,67) (110,123) (117,38) (117,95) (118,49) (118,84) (125,0) (131,18) (131,39) (131,94) (131,115) (132,42) (132,91) | 2 | y2 = x3 + 48x + 104 | 69 | (3,3) (3,60) (3,73) (3,130) (10,11) (10,46) (10,87) (10,122) (17,38) (17,95) (19,35) (19,98) (26,21) (26,112) (33,28) (33,105) (38,3) (38,60) (38,73) (38,130) (45,17) (45,59) (45,74) (45,116) (47,7) (47,126) (52,10) (52,66) (52,67) (52,123) (54,35) (54,98) (66,31) (66,45) (66,88) (66,102) (68,14) (68,119) (73,3) (73,60) (73,73) (73,130) (75,63) (75,70) (82,0) (87,24) (87,52) (87,81) (87,109) (94,25) (94,32) (94,101) (94,108) (96,56) (96,77) (101,38) (101,95) (110,0) (115,18) (115,39) (115,94) (115,115) (117,35) (117,98) (124,49) (124,84) (129,38) (129,95) (131,0) | 3 | y2 = x3 + 108x + 104 | 69 | (13,38) (13,95) (20,17) (20,59) (20,74) (20,116) (24,35) (24,98) (27,25) (27,32) (27,101) (27,108) (34,11) (34,46) (34,87) (34,122) (38,35) (38,98) (45,14) (45,119) (52,35) (52,98) (59,28) (59,105) (62,3) (62,60) (62,73) (62,130) (66,0) (73,0) (76,3) (76,60) (76,73) (76,130) (80,7) (80,126) (83,24) (83,52) (83,81) (83,109) (87,56) (87,77) (90,3) (90,60) (90,73) (90,130) (97,10) (97,66) (97,67) (97,123) (104,38) (104,95) (108,0) (111,38) (111,95) (115,21) (115,112) (118,31) (118,45) (118,88) (118,102) (122,63) (122,70) (125,18) (125,39) (125,94) (125,115) (129,49) (129,84) | 4 | y2 = x3 + 3x + 118 | 69 | (13,25) (13,32) (13,101) (13,108) (17,35) (17,98) (24,7) (24,126) (31,56) (31,77) (34,17) (34,59) (34,74) (34,116) (38,21) (38,112) (45,49) (45,84) (52,42) (52,91) (55,3) (55,60) (55,73) (55,130) (62,31) (62,45) (62,88) (62,102) (66,0) (69,18) (69,39) (69,94) (69,115) (73,14) (73,119) (76,17) (76,59) (76,74) (76,116) (80,21) (80,112) (83,11) (83,46) (83,87) (83,122) (87,0) (90,4) (90,53) (90,80) (90,129) (94,0) (104,38) (104,95) (108,63) (108,70) (111,24) (111,52) (111,81) (111,109) (118,17) (118,59) (118,74) (118,116) (125,38) (125,95) (129,21) (129,112) (132,38) (132,95) | 5 | y2 = x3 + 34x + 104 | 69 | (3,10) (3,66) (3,67) (3,123) (5,0) (10,38) (10,95) (12,63) (12,70) (17,3) (17,60) (17,73) (17,130) (19,35) (19,98) (24,38) (24,95) (26,56) (26,77) (31,25) (31,32) (31,101) (31,108) (38,3) (38,60) (38,73) (38,130) (40,35) (40,98) (45,18) (45,39) (45,94) (45,115) (59,3) (59,60) (59,73) (59,130) (61,0) (68,21) (68,112) (80,38) (80,95) (82,7) (82,126) (87,17) (87,59) (87,74) (87,116) (89,49) (89,84) (96,14) (96,119) (101,31) (101,45) (101,88) (101,102) (108,11) (108,46) (108,87) (108,122) (115,24) (115,52) (115,81) (115,109) (117,28) (117,105) (124,0) (131,35) (131,98) | 6 | y2 = x3 + 40x + 118 | 69 | (5,24) (5,52) (5,81) (5,109) (6,21) (6,112) (13,21) (13,112) (19,17) (19,59) (19,74) (19,116) (20,49) (20,84) (26,38) (26,95) (27,0) (40,4) (40,53) (40,80) (40,129) (48,63) (48,70) (54,3) (54,60) (54,73) (54,130) (55,7) (55,126) (61,38) (61,95) (62,14) (62,119) (75,18) (75,39) (75,94) (75,115) (76,21) (76,112) (82,17) (82,59) (82,74) (82,116) (83,0) (89,17) (89,59) (89,74) (89,116) (96,11) (96,46) (96,87) (96,122) (97,42) (97,91) (103,38) (103,95) (111,35) (111,98) (118,0) (124,25) (124,32) (124,101) (124,108) (131,31) (131,45) (131,88) (131,102) (132,56) (132,77) | 7 | y2 = x3 + 75x + 6 | 69 | (6,49) (6,84) (13,28) (13,105) (19,24) (19,52) (19,81) (19,109) (20,14) (20,119) (26,38) (26,95) (27,42) (27,91) (33,38) (33,95) (41,7) (41,126) (47,17) (47,59) (47,74) (47,116) (54,18) (54,39) (54,94) (54,115) (55,0) (61,3) (61,60) (61,73) (61,130) (75,24) (75,52) (75,81) (75,109) (76,14) (76,119) (82,11) (82,46) (82,87) (82,122) (83,0) (89,10) (89,66) (89,67) (89,123) (90,0) (96,24) (96,52) (96,81) (96,109) (103,4) (103,53) (103,80) (103,129) (104,21) (104,112) (111,56) (111,77) (117,31) (117,45) (117,88) (117,102) (118,35) (118,98) (131,38) (131,95) (132,14) (132,119) | 8 | y2 = x3 + 90x + 118 | 69 | (3,4) (3,53) (3,80) (3,129) (5,35) (5,98) (10,17) (10,59) (10,74) (10,116) (12,0) (17,24) (17,52) (17,81) (17,109) (19,21) (19,112) (24,3) (24,60) (24,73) (24,130) (31,38) (31,95) (38,17) (38,59) (38,74) (38,116) (47,21) (47,112) (54,7) (54,126) (66,17) (66,59) (66,74) (66,116) (68,49) (68,84) (73,31) (73,45) (73,88) (73,102) (82,0) (87,11) (87,46) (87,87) (87,122) (96,0) (101,38) (101,95) (103,56) (103,77) (110,63) (110,70) (115,38) (115,95) (117,42) (117,91) (122,18) (122,39) (122,94) (122,115) (124,21) (124,112) (129,25) (129,32) (129,101) (129,108) (131,14) (131,119) | 9 | y2 = x3 + 52x + 118 | 69 | (3,42) (3,91) (6,38) (6,95) (10,21) (10,112) (17,14) (17,119) (20,38) (20,95) (24,35) (24,98) (27,18) (27,39) (27,94) (27,115) (31,0) (34,25) (34,32) (34,101) (34,108) (38,21) (38,112) (41,4) (41,53) (41,80) (41,129) (48,17) (48,59) (48,74) (48,116) (55,24) (55,52) (55,81) (55,109) (62,3) (62,60) (62,73) (62,130) (66,21) (66,112) (69,38) (69,95) (73,7) (73,126) (76,17) (76,59) (76,74) (76,116) (87,49) (87,84) (101,0) (104,17) (104,59) (104,74) (104,116) (111,31) (111,45) (111,88) (111,102) (115,0) (122,56) (122,77) (125,11) (125,46) (125,87) (125,122) (129,63) (129,70) | 10 | y2 = x3 + 94x + 6 | 69 | (3,7) (3,126) (6,11) (6,46) (6,87) (6,122) (13,10) (13,66) (13,67) (13,123) (17,0) (20,24) (20,52) (20,81) (20,109) (27,4) (27,53) (27,80) (27,129) (38,14) (38,119) (41,31) (41,45) (41,88) (41,102) (45,0) (52,0) (55,38) (55,95) (66,21) (66,112) (73,56) (73,77) (76,24) (76,52) (76,81) (76,109) (80,35) (80,98) (83,38) (83,95) (90,38) (90,95) (94,14) (94,119) (101,49) (101,84) (104,17) (104,59) (104,74) (104,116) (108,28) (108,105) (111,18) (111,39) (111,94) (111,115) (115,14) (115,119) (118,3) (118,60) (118,73) (118,130) (122,42) (122,91) (132,24) (132,52) (132,81) (132,109) | 11 | y2 = x3 + 69x + 6 | 69 | (5,56) (5,77) (10,10) (10,66) (10,67) (10,123) (12,42) (12,91) (19,14) (19,119) (24,18) (24,39) (24,94) (24,115) (31,4) (31,53) (31,80) (31,129) (33,7) (33,126) (38,24) (38,52) (38,81) (38,109) (40,0) (47,49) (47,84) (52,31) (52,45) (52,88) (52,102) (54,0) (59,38) (59,95) (61,21) (61,112) (66,11) (66,46) (66,87) (66,122) (68,14) (68,119) (73,38) (73,95) (80,17) (80,59) (80,74) (80,116) (82,35) (82,98) (87,24) (87,52) (87,81) (87,109) (96,0) (101,3) (101,60) (101,73) (101,130) (103,14) (103,119) (115,38) (115,95) (122,24) (122,52) (122,81) (122,109) (124,28) (124,105) | 12 | y2 = x3 + 117x + 118 | 69 | (5,31) (5,45) (5,88) (5,102) (12,18) (12,39) (12,94) (12,115) (13,63) (13,70) (19,17) (19,59) (19,74) (19,116) (26,11) (26,46) (26,87) (26,122) (33,4) (33,53) (33,80) (33,129) (34,21) (34,112) (47,38) (47,95) (54,24) (54,52) (54,81) (54,109) (55,35) (55,98) (61,17) (61,59) (61,74) (61,116) (62,7) (62,126) (68,38) (68,95) (69,56) (69,77) (75,38) (75,95) (76,21) (76,112) (83,49) (83,84) (89,25) (89,32) (89,101) (89,108) (90,42) (90,91) (104,0) (110,17) (110,59) (110,74) (110,116) (111,14) (111,119) (118,21) (118,112) (125,0) (131,3) (131,60) (131,73) (131,130) (132,0) | 13 | y2 = x3 + 13x + 104 | 69 | (5,35) (5,98) (19,35) (19,98) (24,3) (24,60) (24,73) (24,130) (26,14) (26,119) (33,35) (33,98) (38,3) (38,60) (38,73) (38,130) (40,28) (40,105) (45,24) (45,52) (45,81) (45,109) (47,0) (52,3) (52,60) (52,73) (52,130) (54,0) (59,10) (59,66) (59,67) (59,123) (61,7) (61,126) (66,38) (66,95) (68,56) (68,77) (73,38) (73,95) (80,31) (80,45) (80,88) (80,102) (87,18) (87,39) (87,94) (87,115) (89,0) (96,21) (96,112) (103,63) (103,70) (108,38) (108,95) (110,49) (110,84) (115,17) (115,59) (115,74) (115,116) (122,25) (122,32) (122,101) (122,108) (129,11) (129,46) (129,87) (129,122) | 14 | y2 = x3 + 10x + 104 | 69 | (3,35) (3,98) (6,38) (6,95) (10,49) (10,84) (17,0) (20,18) (20,39) (20,94) (20,115) (34,38) (34,95) (38,35) (38,98) (41,3) (41,60) (41,73) (41,130) (45,21) (45,112) (48,11) (48,46) (48,87) (48,122) (52,28) (52,105) (55,38) (55,95) (66,7) (66,126) (73,35) (73,98) (76,3) (76,60) (76,73) (76,130) (83,17) (83,59) (83,74) (83,116) (87,14) (87,119) (90,10) (90,66) (90,67) (90,123) (94,63) (94,70) (101,0) (104,31) (104,45) (104,88) (104,102) (111,3) (111,60) (111,73) (111,130) (115,56) (115,77) (125,24) (125,52) (125,81) (125,109) (129,0) (132,25) (132,32) (132,101) (132,108) | 15 | y2 = x3 + 122x + 6 | 69 | (3,0) (6,17) (6,59) (6,74) (6,116) (17,56) (17,77) (24,0) (31,14) (31,119) (34,10) (34,66) (34,67) (34,123) (38,14) (38,119) (41,38) (41,95) (45,14) (45,119) (55,18) (55,39) (55,94) (55,115) (59,7) (59,126) (62,38) (62,95) (66,35) (66,98) (69,24) (69,52) (69,81) (69,109) (76,24) (76,52) (76,81) (76,109) (80,49) (80,84) (83,24) (83,52) (83,81) (83,109) (87,0) (94,42) (94,91) (97,31) (97,45) (97,88) (97,102) (101,21) (101,112) (104,3) (104,60) (104,73) (104,130) (118,11) (118,46) (118,87) (118,122) (125,38) (125,95) (129,28) (129,105) (132,4) (132,53) (132,80) (132,129) | 16 | y2 = x3 + 89x + 104 | 69 | (5,3) (5,60) (5,73) (5,130) (13,0) (19,3) (19,60) (19,73) (19,130) (20,21) (20,112) (26,24) (26,52) (26,81) (26,109) (27,63) (27,70) (33,3) (33,60) (33,73) (33,130) (34,49) (34,84) (40,10) (40,66) (40,67) (40,123) (47,38) (47,95) (54,38) (54,95) (61,31) (61,45) (61,88) (61,102) (62,35) (62,98) (68,18) (68,39) (68,94) (68,115) (76,35) (76,98) (83,14) (83,119) (89,38) (89,95) (90,35) (90,98) (96,17) (96,59) (96,74) (96,116) (97,28) (97,105) (103,25) (103,32) (103,101) (103,108) (104,0) (110,11) (110,46) (110,87) (110,122) (111,0) (118,7) (118,126) (125,56) (125,77) | 17 | y2 = x3 + 41x + 118 | 69 | (5,7) (5,126) (12,56) (12,77) (17,3) (17,60) (17,73) (17,130) (19,21) (19,112) (24,31) (24,45) (24,88) (24,102) (26,49) (26,84) (31,18) (31,39) (31,94) (31,115) (33,42) (33,91) (38,17) (38,59) (38,74) (38,116) (45,11) (45,46) (45,87) (45,122) (47,0) (52,4) (52,53) (52,80) (52,129) (54,14) (54,119) (61,21) (61,112) (66,38) (66,95) (68,0) (73,24) (73,52) (73,81) (73,109) (75,0) (80,17) (80,59) (80,74) (80,116) (87,38) (87,95) (89,63) (89,70) (94,38) (94,95) (108,25) (108,32) (108,101) (108,108) (110,21) (110,112) (129,17) (129,59) (129,74) (129,116) (131,35) (131,98) | 18 | y2 = x3 + 129x + 104 | 69 | (3,28) (3,105) (6,31) (6,45) (6,88) (6,102) (10,0) (13,11) (13,46) (13,87) (13,122) (17,35) (17,98) (20,24) (20,52) (20,81) (20,109) (24,0) (31,63) (31,70) (38,35) (38,98) (41,10) (41,66) (41,67) (41,123) (45,56) (45,77) (48,38) (48,95) (55,3) (55,60) (55,73) (55,130) (59,35) (59,98) (62,38) (62,95) (69,25) (69,32) (69,101) (69,108) (76,3) (76,60) (76,73) (76,130) (80,0) (83,18) (83,39) (83,94) (83,115) (87,21) (87,112) (97,3) (97,60) (97,73) (97,130) (101,7) (101,126) (108,49) (108,84) (115,14) (115,119) (118,38) (118,95) (125,17) (125,59) (125,74) (125,116) | 19 | y2 = x3 + 59x + 118 | 69 | (6,17) (6,59) (6,74) (6,116) (10,63) (10,70) (13,17) (13,59) (13,74) (13,116) (17,7) (17,126) (20,11) (20,46) (20,87) (20,122) (24,14) (24,119) (27,38) (27,95) (38,21) (38,112) (45,0) (48,25) (48,32) (48,101) (48,108) (55,31) (55,45) (55,88) (55,102) (59,42) (59,91) (62,24) (62,52) (62,81) (62,109) (73,35) (73,98) (76,17) (76,59) (76,74) (76,116) (80,0) (83,38) (83,95) (94,56) (94,77) (97,4) (97,53) (97,80) (97,129) (101,21) (101,112) (108,21) (108,112) (111,3) (111,60) (111,73) (111,130) (115,49) (115,84) (118,38) (118,95) (122,0) (132,18) (132,39) (132,94) (132,115) | 20 | y2 = x3 + 33x + 118 | 69 | (5,3) (5,60) (5,73) (5,130) (6,0) (12,38) (12,95) (19,17) (19,59) (19,74) (19,116) (20,0) (27,56) (27,77) (34,63) (34,70) (41,42) (41,91) (47,17) (47,59) (47,74) (47,116) (48,21) (48,112) (54,31) (54,45) (54,88) (54,102) (55,14) (55,119) (62,35) (62,98) (68,11) (68,46) (68,87) (68,122) (69,0) (76,21) (76,112) (82,38) (82,95) (96,38) (96,95) (103,18) (103,39) (103,94) (103,115) (104,21) (104,112) (110,25) (110,32) (110,101) (110,108) (111,7) (111,126) (117,4) (117,53) (117,80) (117,129) (124,17) (124,59) (124,74) (124,116) (125,49) (125,84) (131,24) (131,52) (131,81) (131,109) | 21 | y2 = x3 + 132x + 6 | 69 | (3,31) (3,45) (3,88) (3,102) (17,38) (17,95) (19,14) (19,119) (26,0) (33,0) (38,24) (38,52) (38,81) (38,109) (45,38) (45,95) (47,21) (47,112) (52,38) (52,95) (54,56) (54,77) (61,35) (61,98) (66,17) (66,59) (66,74) (66,116) (73,18) (73,39) (73,94) (73,115) (75,14) (75,119) (80,3) (80,60) (80,73) (80,130) (82,49) (82,84) (89,28) (89,105) (94,24) (94,52) (94,81) (94,109) (96,14) (96,119) (101,11) (101,46) (101,87) (101,122) (103,42) (103,91) (108,10) (108,66) (108,67) (108,123) (115,24) (115,52) (115,81) (115,109) (117,7) (117,126) (122,4) (122,53) (122,80) (122,129) (131,0) | 22 | y2 = x3 + 31x + 6 | 69 | (6,3) (6,60) (6,73) (6,130) (10,28) (10,105) (20,38) (20,95) (24,56) (24,77) (27,24) (27,52) (27,81) (27,109) (31,42) (31,91) (38,14) (38,119) (48,10) (48,66) (48,67) (48,123) (52,7) (52,126) (59,0) (62,18) (62,39) (62,94) (62,115) (66,49) (66,84) (69,4) (69,53) (69,80) (69,129) (73,0) (76,24) (76,52) (76,81) (76,109) (80,21) (80,112) (87,14) (87,119) (90,31) (90,45) (90,88) (90,102) (97,38) (97,95) (101,35) (101,98) (104,11) (104,46) (104,87) (104,122) (111,38) (111,95) (115,0) (118,17) (118,59) (118,74) (118,116) (122,14) (122,119) (125,24) (125,52) (125,81) (125,109) | 23 | y2 = x3 + 124x + 104 | 69 | (6,0) (19,3) (19,60) (19,73) (19,130) (20,56) (20,77) (26,17) (26,59) (26,74) (26,116) (33,10) (33,66) (33,67) (33,123) (34,0) (41,35) (41,98) (47,31) (47,45) (47,88) (47,102) (48,49) (48,84) (54,3) (54,60) (54,73) (54,130) (55,0) (68,24) (68,52) (68,81) (68,109) (75,25) (75,32) (75,101) (75,108) (76,35) (76,98) (82,38) (82,95) (83,21) (83,112) (90,28) (90,105) (96,18) (96,39) (96,94) (96,115) (104,7) (104,126) (110,38) (110,95) (111,35) (111,98) (117,3) (117,60) (117,73) (117,130) (124,11) (124,46) (124,87) (124,122) (125,14) (125,119) (131,38) (131,95) (132,63) (132,70) | 24 | y2 = x3 + 27x + 6 | 69 | (3,38) (3,95) (5,0) (12,14) (12,119) (17,18) (17,39) (17,94) (17,115) (19,14) (19,119) (24,38) (24,95) (26,14) (26,119) (31,24) (31,52) (31,81) (31,109) (38,24) (38,52) (38,81) (38,109) (40,7) (40,126) (45,24) (45,52) (45,81) (45,109) (47,35) (47,98) (59,31) (59,45) (59,88) (59,102) (61,49) (61,84) (66,3) (66,60) (66,73) (66,130) (68,0) (75,42) (75,91) (80,11) (80,46) (80,87) (80,122) (82,21) (82,112) (87,38) (87,95) (94,4) (94,53) (94,80) (94,129) (101,17) (101,59) (101,74) (101,116) (110,28) (110,105) (117,0) (129,10) (129,66) (129,67) (129,123) (131,56) (131,77) | 25 | y2 = x3 + 110x + 104 | 69 | (5,38) (5,95) (6,7) (6,126) (12,25) (12,32) (12,101) (12,108) (13,49) (13,84) (19,3) (19,60) (19,73) (19,130) (20,14) (20,119) (26,18) (26,39) (26,94) (26,115) (40,3) (40,60) (40,73) (40,130) (41,28) (41,105) (48,0) (55,35) (55,98) (61,38) (61,95) (62,0) (68,17) (68,59) (68,74) (68,116) (69,63) (69,70) (76,35) (76,98) (82,31) (82,45) (82,88) (82,102) (83,56) (83,77) (89,11) (89,46) (89,87) (89,122) (96,24) (96,52) (96,81) (96,109) (97,35) (97,98) (117,10) (117,66) (117,67) (117,123) (118,0) (124,38) (124,95) (125,21) (125,112) (131,3) (131,60) (131,73) (131,130) | 26 | y2 = x3 + 97x + 118 | 69 | (5,14) (5,119) (10,25) (10,32) (10,101) (10,108) (17,31) (17,45) (17,88) (17,102) (19,21) (19,112) (24,24) (24,52) (24,81) (24,109) (26,0) (38,17) (38,59) (38,74) (38,116) (40,42) (40,91) (45,38) (45,95) (54,35) (54,98) (59,4) (59,53) (59,80) (59,129) (61,0) (73,3) (73,60) (73,73) (73,130) (75,56) (75,77) (80,38) (80,95) (82,21) (82,112) (89,21) (89,112) (94,18) (94,39) (94,94) (94,115) (96,49) (96,84) (101,17) (101,59) (101,74) (101,116) (103,0) (108,17) (108,59) (108,74) (108,116) (115,11) (115,46) (115,87) (115,122) (122,38) (122,95) (124,63) (124,70) (131,7) (131,126) | 27 | y2 = x3 + 12x + 6 | 69 | (5,18) (5,39) (5,94) (5,115) (6,35) (6,98) (12,4) (12,53) (12,80) (12,129) (19,24) (19,52) (19,81) (19,109) (20,0) (27,14) (27,119) (33,31) (33,45) (33,88) (33,102) (40,38) (40,95) (47,11) (47,46) (47,87) (47,122) (48,28) (48,105) (54,38) (54,95) (61,17) (61,59) (61,74) (61,116) (62,56) (62,77) (68,24) (68,52) (68,81) (68,109) (69,42) (69,91) (76,14) (76,119) (82,3) (82,60) (82,73) (82,130) (90,7) (90,126) (96,38) (96,95) (97,0) (103,24) (103,52) (103,81) (103,109) (104,49) (104,84) (111,0) (118,21) (118,112) (124,10) (124,66) (124,67) (124,123) (125,14) (125,119) |
|---|