Yaah ... point.
Poi
Poi
Poi
Poi
Poi
Poi
forum
OT Bingo 2 [OVER; Winner: Meah]
posted
Total Posts
545
Topic Starter
updated
Topic Starter
You still do, but they are worth nothing nowBlitzfrog wrote:
I still get points right?
Who cares about bingo
Points is what matters
They are worth looking atabraker wrote:
You still do, but they are worth nothing nowBlitzfrog wrote:
I still get points right?
Who cares about bingo
Points is what matters
Topic Starter
Had Blitzfrog not screw up, he would have won OT Bingo today
I'm selling tiles boysabraker wrote:
Had Blitzfrog not screw up, he would have won OT Bingo today
1 nude = 1 tile
I demand 10 tiles http://www.ulta.com/colorstay-not-just- ... od13361779
really cant be bothered to puush it.
really cant be bothered to puush it.
Topic Starter
So this is what the recent pm blitz nudes thing is aboutBlitzfrog wrote:
I'm selling tiles boysabraker wrote:
Had Blitzfrog not screw up, he would have won OT Bingo today
1 nude = 1 tile
ch ch ch smh
/in
giving into temptation, i hate myself now
giving into temptation, i hate myself now
johnmedina999 wrote:
/in
giving into temptation, i hate myself now
have fun and remember there no such thing as to much spam
glhf
butMeah wrote:
Avoid silences
levesterz wrote:
have fun and remember there no such thing as to much spam
I'll trykai99 wrote:
glhf
Topic Starter
up up updated
but is tuck at 19 point now ><Blitzfrog wrote:
Get points for lifekai99 wrote:
glhf
Send nudes for tile revealslevesterz wrote:
but is tuck at 19 point now ><
Noots is not nudeslevesterz wrote:
sentBlitzfrog wrote:
Send nudes for tile reveals
Try again
i cant win anyway lol ... i am just curious what that last tile of the slot is *i got two line that stuck at that last box*
tru truBlitzfrog wrote:
It's not about winning,
It's about points
Mea Mea
TRAP TRAP TRAP TRAP TRAP TRAP TRAP TRAPjohnmedina999 wrote:
Mea Mea
Blitzfrog wrote:
TRAP TRAP TRAP TRAP TRAP TRAP TRAP
Topic Starter
John, you were away for too long. We were finished with this a week agojohnmedina999 wrote:
Blitzfrog wrote:
TRAP TRAP TRAP TRAP TRAP TRAP TRAP
What happened?
Also, do I get the "bring up old meme/taboo topic" box?
Also, do I get the "bring up old meme/taboo topic" box?
Lots of stuff happenedjohnmedina999 wrote:
What happened?
Also, do I get the "bring up old meme/taboo topic" box?
Invisible trapMeah wrote:
Im no trap frog, Im legit John Cena 101%
We call them land mines
Topic Starter
U P D A T E
P
D
A
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E
P
D
A
T
E
oh wow, I see how this works
Topic Starter
This math is flawed. Given 17 unlocked tiles and 36 tiles total, any 12 positions which any of the 6 of the 17 tiles can be in if the game is won, and 11 positions where 11 of the 17 tiles cannot be in if the game is won:Blitzfrog wrote:
Well considering that there is 36 tiles
The total outcome is 36!/(36-19)!
=36!/17!
=1.0458433e+27
And that is a huge number
Considering also that the only possible way he/she I'm still not sure about micro-dick's gender gets a bingo is reaching 6 in a row horizontally or vertically. We can do an estimation of the possible bingo hits.
We know for sure he/she(it) has at least got 1 row/column. We can conclude that there is only 30 tiles available for randomisation. Consider also that this will be an over estimation due to the fact that you can't get bingos in multiple columns/multiple rows as the game would have ended. (note it is possible to get a row and a column). So we can conclude that the number of ways you can sort the 13 tiles in the 30 available tile space is
30!/(30-13)!
=30!/17!
=7.4574708e+17
Now note that 1.0458433e+27 is a much much larger number than 7.4574708e+17
Hence it is unlikely he/she would have got a bingo
Let Tile[x] be Tile 1 to 17.
Tile[1.. 6] = 6 tiles
Tile[7.. 12] = 6 tiles
Tile[13.. 17] = 5 tiles
Therefore at most, two positions of six are possible ignoring winning.
Suppose the game is won. Then there is one position where there are 6 tiles in a row.
Let Tile[1.. 6] by the tiles in the position.
Therefore the number of tiles there are free to for others to be placed on are:
NUM_TOTAL_TILES - NUM_WINNING_TILES - NUM_IMPOSSIBLE_TILES = 36 - 6 - 11, where
(NUM_TILES_NEEDED_TO_WIN - MAX_TILES_THERE_CAN_BE_WITHOUT_WIN) * NUM_IMPOSSIBLE_POSITIONS = (6 - 5) * 11 = 11
Which gives us 19 possible places where the remaining 11 tiles can be. 19 choose 11 = 75,582 possible combinations if win
Now in the instance the game is not won, there are 12 locations the 17 tiles cannot be in
The total number of position the tiles can be in ignoring that is 36 chose 17. Factoring in the 12 impossible locations, we get (36-12) choose 17 = 346,104 positions the tiles can be in if not win
To get the odds of win:
Win combinations/ (Win combinations + not win combinations) = 75,582/(75,582 + 346,104) = 17.92%
To get the odds of not win:
Not win combinations/ (Win com - fuck it just subtract from 100% you math illiterate fag.
Well I hope you learned something. I will now go while in fear I left a mistake somewhere. Have fun!
Fuck what did I miss.
Don't answer, it's probably best if I didn't know.
Don't answer, it's probably best if I didn't know.