Not finishing my quest=300mc/ep. I pay 1000mc/ep if I don't finish your quest; however, it didn't happen yet 😀.
Sometimes, the beginner difficulty creates crazy layouts...
https://minesweeper.online/new-game?g=3201566397https://minesweeper.online/new-game?g=2360067337
Not mine, but I had to analyze this crazy game with an opening on 31st click:
https://minesweeper.online/new-game?g=3837990684
P[blast] = [
0, 97/471, 94/465, 92/461, 91/455, 90/451, 89/445, 88/441, 84/435, 83/431, 82/425,
80/419, 78/410, 77/404, 76/398, 74/389, 73/380, 71/371, 68/362, 65/353, 62/344,
59/335, 55/326, 53/317, 52/311, 51/302, 49/296, 47/290, 45/281, 43/272, 42/266
]
P[opening including the clicked square] = [
0.122623980, 0.248590836, 0.403883321, 0.260854071, 0.408244079,
0.260825230, 0.408213480, 0.260795070, 0.422502421, 0.274771835,
0.273987613, 0.145522432, 0.279482563, 0.278716317, 0.145322603,
0.146436765, 0.143299044, 0.144403874, 0.150169409, 0.156452189,
0.163319118, 0.170848433, 0.185285484, 0.330437333, 0.188171613,
0.326255787, 0.334198959, 0.198709207, 0.202769051, 0.352399163
]
P[not blasting 31 times] = product(1 - P[blast]) for each click = 0.00221552770207336, i.e. cca 1/451
P[not blasting 31 times and not getting an opening 30 times] = product(1 - P[blast] - P[opening]) for each click * (1 - P[blast on 31st click]) = 2.9895597810233593e-08, i.e. cca 1:33449741, unbelievable 1 in 33 millions!
Not finishing my quest=300mc/ep. I pay 1000mc/ep if I don't finish your quest; however, it didn't happen yet 😀.
Sometimes, the beginner difficulty creates crazy layouts...
https://minesweeper.online/new-game?g=3201566397https://minesweeper.online/new-game?g=2360067337
Not mine, but I had to analyze this crazy game with an opening on 31st click:
https://minesweeper.online/new-game?g=3837990684
P[blast] = [
0, 97/471, 94/465, 92/461, 91/455, 90/451, 89/445, 88/441, 84/435, 83/431, 82/425,
80/419, 78/410, 77/404, 76/398, 74/389, 73/380, 71/371, 68/362, 65/353, 62/344,
59/335, 55/326, 53/317, 52/311, 51/302, 49/296, 47/290, 45/281, 43/272, 42/266
]
P[opening including the clicked square] = [
0.122623980, 0.248590836, 0.403883321, 0.260854071, 0.408244079,
0.260825230, 0.408213480, 0.260795070, 0.422502421, 0.274771835,
0.273987613, 0.145522432, 0.279482563, 0.278716317, 0.145322603,
0.146436765, 0.143299044, 0.144403874, 0.150169409, 0.156452189,
0.163319118, 0.170848433, 0.185285484, 0.330437333, 0.188171613,
0.326255787, 0.334198959, 0.198709207, 0.202769051, 0.352399163
]
P[not blasting 31 times] = product(1 - P[blast]) for each click = 0.00221552770207336, i.e. cca 1/451
P[not blasting 31 times and not getting an opening 30 times] = product(1 - P[blast] - P[opening]) for each click * (1 - P[blast on 31st click]) = 2.9895597810233593e-08, i.e. cca 1:33449741, unbelievable 1 in 33 millions!
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