p16 pond hassler. 76P8 fits with regard to the active region, but not with regard to the Rich's p16s.
Code: Select all
x = 100, y = 35, rule = B3/S23
51bo3bo$50bobobobo$51b2ob2o$13b2o13b2o$9b2obo2bo3b2ob2o3bo2bob2o$10bob
3obo2b2ob2o2bob3obo14b2o9b2o$7b3o6bo9bo6b3o11bob4ob4obo$7bo2b3ob2ob9ob
6o2bo12bo3bobo3bo$2bo7bo2bobobo7bo7bo14bo3bobo3bo$bo9bo2b3o3b3o4b3o2b
2o8bo6b3o3b3o$o10bo2bo3bo3bo5b4o6b2o3bo$bo5bo2b5o6bo11bo5bo3bo$2b4o3bo
bobo3bo3bo11b2ob2obo3bo26b2o13b2o$2b4o3bobobo3bo3bo11b2ob2obo3bo4b2o
16b2obo2bo3b2ob2o3bo2bob2o$bo5bo2b5o6bo11bo5bo3bo3bo2bo16bob3obo2b2ob
2o2bob3obo$o10bo2bo3bo3bo5b4o6b2o3bo3bo2bo13b3o6bo9bo6b3o$bo9bo2b3o3b
3o4b3o2b2o8bo5b2o14bo2b6ob9ob2ob3o2bo$2bo7bo2bobobo7bo7bo32bo7bo7bobob
o2bo7bo$7bo2b3ob2ob9ob6o2bo14b2o5bo8b2o2b3o4b3o3b3o2bo9bo$7b3o6bo9bo6b
3o13bo2bo3bo3b2o6b4o5bo3bo3bo2bo10bo$10bob3obo2b2ob2o2bob3obo16bo2bo3b
o3bo5bo11bo6b5o2bo5bo$9b2obo2bo3b2ob2o3bo2bob2o16b2o4bo3bob2ob2o11bo3b
o3bobobo3b4o$13b2o13b2o26bo3bob2ob2o11bo3bo3bobobo3b4o$56bo3bo5bo11bo
6b5o2bo5bo$56bo3b2o6b4o5bo3bo3bo2bo10bo$42b3o3b3o6bo8b2o2b3o4b3o3b3o2b
o9bo$41bo3bobo3bo14bo7bo7bobobo2bo7bo$41bo3bobo3bo12bo2b6ob9ob2ob3o2bo
$40bob4ob4obo11b3o6bo9bo6b3o$40b2o9b2o14bob3obo2b2ob2o2bob3obo$66b2obo
2bo3b2ob2o3bo2bob2o$70b2o13b2o$44b2ob2o$43bobobobo$44bo3bo!
p24 pond hassler (or wing hassler)
Code: Select all
x = 41, y = 38, rule = B3/S23
19b2o$18bobo$18bo$16b2ob4o$12b2obobo4bo$12b2obobob2o2b2o$15bobo3b2o2bo
$15bobob2o2b2obo8b2o$16bo4bo4bo8b2o$17b3obob3o$19b2ob2o9b4o$32bo4bo$
31bob5o$31bobo4b2o$30b2o5bo2bo$21b2o7bo2bobobob2o$7b2o11bo2bo6b3obo2bo
$6bo2bo10bo2bo6bo3bob2o$5bobobo11b2o7b2obobo$5bobob2o7b2o11bobobo$3b2o
bo3bo6bo2bo10bo2bo$3bo2bob3o6bo2bo11b2o$2obobobo2bo7b2o$o2bo5b2o$b2o4b
obo$3b5obo$3bo4bo$4b4o9b2ob2o$15b3obob3o$4b2o8bo4bo4bo$4b2o8bob2o2b2ob
obo$15bo2b2o3bobo$16b2o2b2obobob2o$18bo4bobob2o$18b4ob2o$22bo$20bobo$
20b2o!
Can someone create a double domino sparker that hassles this at p20? While several methods of hassling this are known, an exposed version is not. If one is found, it would create a weak p20 thumb sparker.
Code: Select all
x = 20, y = 14, rule = B3/S23
11b2o$9bo2bo$9bobo$9b3o2$7b2o$2b2obo5bo3bo$2bo11bobo$3b2o9bobo$3o2b8ob
obob2o$o2bo12bob2o$b2o13bo$8b2o4bobo$8b2o4b2o!
EDIT: One of my earliest discoveries (actually a co-discovery), the p120 pi-heptomino hassler, has been reduced and made simpler. I found the figure eight and mold; iNoMed replaced the mold with a fishhook while keeping the figure eight.
Code: Select all
x = 60, y = 60, rule = B3/S23
33b2o$31bob2o$20bo9bo$20b3o10bo$23bo5b2obo$22b2o5b2o13$28b3o$27bo3bo$
27b2ob2o24b2o$56bo$54bobo$54b2o2$2o$2obo$4bo34b2o$bo17b2o18bobo$2bob2o
12bobo20bo12b2o$4b2o12bo20bobo12b2obo$18bobo18b2o17bo$19b2o34bo$56bob
2o$58b2o2$4b2o$3bobo$3bo$2b2o24b2ob2o$28bo3bo$29b3o13$29b2o5b2o$27bob
2o5bo$26bo10b3o$29bo9bo$25b2obo$25b2o!
EDIT 2: A new p40 honey farm hassler, found by revisiting one of my partials.
Code: Select all
x = 54, y = 31, rule = B3/S23
25b3o$28bo$24bo3bo$23bobo2bo$21bo2bobo$15b2o4bo3bo$15b2o4bo$6bobo13b3o
$5b2ob3o26bo$4b3o28b3o$34bo$20b3o11b2o$19bo3bo28b2o$18bo5bo6b3o18b2o$
10b3o5bo5bo5bo3bo8bobo$6b3ob2o6bo5bo4bo5bo6b2ob3o$8bobo8bo3bo5bo5bo5b
3o$2o18b3o6bo5bo$2o28bo3bo$18b2o11b3o$19bo$16b3o28b3o$16bo26b3ob2o$29b
3o13bobo$32bo4b2o$28bo3bo4b2o$27bobo2bo$25bo2bobo$25bo3bo$25bo$26b3o!
This was the one found a few weeks ago, just to prove it's not a duplicate despite looking very similar:
Code: Select all
x = 38, y = 31, rule = B3/S23
7b2o9b2o$6bo2bo7bo2bo$6b3o2b5o2b3o$b2o6b2o5b2o$b2o5bo9bo$8b2obo3bob2o$
13bo$2o$2obo25bo$3bo23b3o$3bo8b3o11bo$o2bo7bo3bo10b2o$b2o7bo5bo$10bo5b
o$10bo5bo6b3o$11bo3bo6bo3bo$12b3o6bo5bo$21bo5bo$21bo5bo7b2o$10b2o10bo
3bo7bo2bo$11bo11b3o8bo$8b3o23bo$8bo25bob2o$36b2o$24bo$19b2obo3bob2o$
19bo9bo5b2o$20b2o5b2o6b2o$17b3o2b5o2b3o$17bo2bo7bo2bo$18b2o9b2o!
EDIT 3:
Despite being in the p72 part of my partials list, I didn't notice that this was a higher-clearance p24 domino sparker. It allows this p24 LOM hassler to be completed:
Code: Select all
x = 66, y = 41, rule = B3/S23
58b2o$58bobo$44b2o14bo$43bo2bo6b2o4b2ob2obo$41bo2bobo6bobo3bo2bob2o$
45bo10bo3bo$41bob2o9bo3bob2o$6b2o34bo11bo3b4o$5bobo23b2o14bo6b3obo$5bo
14b2o9bo13bo2bo5b2o3bobo$ob2ob2o4b2o6bo2bo9b3o8b3ob3o4b3obo$2obo2bo3bo
bo6bobo2bo2b2o5bo9bobobo5bo3b4o$5bo3bo10bo7bo16b3o6bo3bob2o$4b2obo3bo
9b2obo3bobo15bo9bo3bo$4b4o3bo11bo5b2o4b2o16bobo3bo2bob2o$7bob3o6bo15bo
bo11bo4b2o4b2ob2obo$4bobo3b2o5bo2bo13bobo10bobo10bo$7bob3o4b3ob3o11b2o
11bobo10bo$4b4o3bo5bobobo26bo4b2o4b2ob2obo$4b2obo3bo6b3o32bobo3bo2bob
2o$5bo3bo9bo26bo9bo3bo$2obo2bo3bobo32b3o6bo3bob2o$ob2ob2o4b2o4bo26bobo
bo5bo3b4o$5bo10bobo11b2o11b3ob3o4b3obo$5bo10bobo10bobo13bo2bo5b2o3bobo
$ob2ob2o4b2o4bo11bobo15bo6b3obo$2obo2bo3bobo16b2o4b2o5bo11bo3b4o$5bo3b
o9bo15bobo3bob2o9bo3bob2o$4b2obo3bo6b3o16bo7bo10bo3bo$4b4o3bo5bobobo9b
o5b2o2bo2bobo6bobo3bo2bob2o$7bob3o4b3ob3o8b3o9bo2bo6b2o4b2ob2obo$4bobo
3b2o5bo2bo13bo9b2o14bo$7bob3o6bo14b2o23bobo$4b4o3bo11bo34b2o$4b2obo3bo
9b2obo$5bo3bo10bo$2obo2bo3bobo6bobo2bo$ob2ob2o4b2o6bo2bo$5bo14b2o$5bob
o$6b2o!
User:HotdogPi/My discoveries
Periods discovered: 5-16,⑱,⑳G,㉑G,㉒㉔㉕,㉗-㉛,㉜SG,㉞㉟㊱㊳㊵㊷㊹㊺㊽㊿,54G,55G,56,57G,60,62-66,68,70,73,74S,75,76S,80,84,88,90,96
100,02S,06,08,10,12,14G,16,17G,20,26G,28,38,47,48,54,56,72,74,80,92,96S
217,486,576
S: SKOP
G: gun