class leader: y2 = x3 + 24
Sr no. class members # points points
1 y2 = x3 + 24 216 (1,5) (1,44) (1,47) (1,86) (3,18) (3,31) (3,60) (3,73) (4,19) (4,33) (4,58) (4,72) (8,9) (8,30) (8,61) (8,82) (9,5) (9,44) (9,47) (9,86) (10,32) (10,45) (10,46) (10,59) (11,9) (11,30) (11,61) (11,82) (12,32) (12,45) (12,46) (12,59) (16,5) (16,44) (16,47) (16,86) (17,32) (17,45) (17,46) (17,59) (20,4) (20,17) (20,74) (20,87) (22,5) (22,44) (22,47) (22,86) (23,19) (23,33) (23,58) (23,72) (24,4) (24,17) (24,74) (24,87) (25,19) (25,33) (25,58) (25,72) (27,18) (27,31) (27,60) (27,73) (29,5) (29,44) (29,47) (29,86) (30,19) (30,33) (30,58) (30,72) (33,4) (33,17) (33,74) (33,87) (34,4) (34,17) (34,74) (34,87) (36,19) (36,33) (36,58) (36,72) (37,9) (37,30) (37,61) (37,82) (38,32) (38,45) (38,46) (38,59) (40,18) (40,31) (40,60) (40,73) (43,19) (43,33) (43,58) (43,72) (46,9) (46,30) (46,61) (46,82) (47,4) (47,17) (47,74) (47,87) (48,18) (48,31) (48,60) (48,73) (50,9) (50,30) (50,61) (50,82) (51,19) (51,33) (51,58) (51,72) (53,5) (53,44) (53,47) (53,86) (55,18) (55,31) (55,60) (55,73) (59,4) (59,17) (59,74) (59,87) (60,9) (60,30) (60,61) (60,82) (61,18) (61,31) (61,60) (61,73) (62,32) (62,45) (62,46) (62,59) (64,19) (64,33) (64,58) (64,72) (66,18) (66,31) (66,60) (66,73) (68,18) (68,31) (68,60) (68,73) (69,32) (69,45) (69,46) (69,59) (72,9) (72,30) (72,61) (72,82) (73,4) (73,17) (73,74) (73,87) (74,5) (74,44) (74,47) (74,86) (75,32) (75,45) (75,46) (75,59) (76,4) (76,17) (76,74) (76,87) (79,5) (79,44) (79,47) (79,86) (81,5) (81,44) (81,47) (81,86) (82,32) (82,45) (82,46) (82,59) (85,9) (85,30) (85,61) (85,82) (86,9) (86,30) (86,61) (86,82) (87,18) (87,31) (87,60) (87,73) (88,19) (88,33) (88,58) (88,72) (89,4) (89,17) (89,74) (89,87) (90,32) (90,45) (90,46) (90,59)
2 y2 = x3 + 80 216 (1,9) (1,30) (1,61) (1,82) (2,19) (2,33) (2,58) (2,72) (3,4) (3,17) (3,74) (3,87) (4,12) (4,40) (4,51) (4,79) (5,32) (5,45) (5,46) (5,59) (6,32) (6,45) (6,46) (6,59) (9,9) (9,30) (9,61) (9,82) (10,25) (10,38) (10,53) (10,66) (12,25) (12,38) (12,53) (12,66) (15,19) (15,33) (15,58) (15,72) (16,9) (16,30) (16,61) (16,82) (17,25) (17,38) (17,53) (17,66) (18,19) (18,33) (18,58) (18,72) (19,32) (19,45) (19,46) (19,59) (22,9) (22,30) (22,61) (22,82) (23,12) (23,40) (23,51) (23,79) (25,12) (25,40) (25,51) (25,79) (27,4) (27,17) (27,74) (27,87) (29,9) (29,30) (29,61) (29,82) (30,12) (30,40) (30,51) (30,79) (31,32) (31,45) (31,46) (31,59) (32,19) (32,33) (32,58) (32,72) (36,12) (36,40) (36,51) (36,79) (38,25) (38,38) (38,53) (38,66) (40,4) (40,17) (40,74) (40,87) (41,32) (41,45) (41,46) (41,59) (43,12) (43,40) (43,51) (43,79) (44,19) (44,33) (44,58) (44,72) (45,32) (45,45) (45,46) (45,59) (48,4) (48,17) (48,74) (48,87) (51,12) (51,40) (51,51) (51,79) (53,9) (53,30) (53,61) (53,82) (54,32) (54,45) (54,46) (54,59) (55,4) (55,17) (55,74) (55,87) (57,19) (57,33) (57,58) (57,72) (58,19) (58,33) (58,58) (58,72) (61,4) (61,17) (61,74) (61,87) (62,25) (62,38) (62,53) (62,66) (64,12) (64,40) (64,51) (64,79) (66,4) (66,17) (66,74) (66,87) (67,19) (67,33) (67,58) (67,72) (68,4) (68,17) (68,74) (68,87) (69,25) (69,38) (69,53) (69,66) (71,19) (71,33) (71,58) (71,72) (74,9) (74,30) (74,61) (74,82) (75,25) (75,38) (75,53) (75,66) (79,9) (79,30) (79,61) (79,82) (80,32) (80,45) (80,46) (80,59) (81,9) (81,30) (81,61) (81,82) (82,25) (82,38) (82,53) (82,66) (83,32) (83,45) (83,46) (83,59) (87,4) (87,17) (87,74) (87,87) (88,12) (88,40) (88,51) (88,79) (90,25) (90,38) (90,53) (90,66)