Hello everyone! In this thread I will be posting all the fun, extra drawings that are related to the comic, but not official updates! I didnโt post this on Xmas here, because I just barely got it in under the line on the other site, but itโs a fun little puzzle for you! If you want to know the answer, itโs
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No. You cannot help Santa Klaus to do that, because it is impossible. Itโs a variation of the mutilated chessboard problem, if youโd like to look up how to prove it. </right here>The correct answer was first given by dragonwarriormaster, who said:
I went with both of these at once, kinda. Shounens are either about fighting, or about childrenโs games that somehow the world runs on. Charlie lives in the second type of that shounen. Heโs really good at flipping coins, so itโs pretty lucky that he lives in a world where everything runs on coin flips! After winning his schoolโs coin flip tournament, he flips coins against the biggest bullyand best coin flipper to win a date with the cutest girl at school, Donna Vaughn. Later, he saves a bunch of people by flipping coins for a bank robber who is deciding if he should shoot his hostages, and finally he ends up flipping a coin for a vengeful God who has gotten bored of his creation and is deciding whether or not to end it all. 

can you fit those in that box? iโll give u a secret prize if you do 

you canโt solve any tetris puzzle where you put any pieces into a rectangle with an odd number of Tโs itโs a variation of the mutilated chessboard problem. Think about tiling a chessboard by putting dominoes on it, such that each domino covers two spaces. Because of the layout of a chessboard, a domino must cover one white square and one black square. Therefore, if you cut off two diagonal corners so that there are 62 squares, you might think that you can tile it with dominoes because thatโs an even number of squares, and dominoes cover 2 squares each. But thatโs not the case. In the chessboard with the removed diagonals there are 32 Black squares and 30 White squares. Because a domino placed on a chessboard must cover one black and one white square, you will always end up with at least two black squares showing once youโve placed so many dominoes that you can no longer place another domino. how this applies to the tetris problems is that you need to think of the rectangle as being tiled like a chessboard, and tetris pieces being tiled as well. Because a tetris piece can be placed anywhere on the board, it doesnโt have specific White or Black squares on it, but that doesnโt really matter. Every tetris piece, except for the T, will cover an equal number of black and white squares when placed on a chessboard. The T, however, when placed on a chessboard, will cover three of one color and one of another. Therefore, any tetris puzzle where you need to cover an equal number of โBlackโ and โWhiteโ squares canโt be solved if it has an odd number of T pieces, because the T will cause a disparity in numbers of each color covered. does that make sense 

hello everyone would you guys like to see something really cool my buddy came to visit again recently and we exchanged late holiday gifts I got them a mug that looks like the moomins house and they got me THIS: https://piyotycho.tumblr.com/post/169267706148/foracommissiononsketchbookpaperby another cool ass picture from one of my favorite artists! this is the sketch that they got in progress: way better than the gift I got them ๐ 

try writign this again but in english if youre asking if the girl is kaytee, no itโs donovanโs partner, char 

heres some goofy thing i drew as a joke Theresa may be a little younger than her halfsister, but sheโs way less shy and has many more attractive features. unfortunately, thereโs not a name thats as close to Thread as Lucy is to LUEโฆ โง Edited by meepches at 20180112 09:09:2520180112 09:09


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