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Incorporates: Complicated mines ($i$ mines, the place $i:=sqrt{-1}$), Anti mines (-1 mines)
Notice: That is together with my Minesweeper puzzles
Sorry for not posting a Minesweeper puzzle yesterday. I’ll strive my greatest to get Day 10 and 11 out tomorrow
So the gimmick right this moment is that there are complicated mines! What’s a posh mine, chances are you’ll ask? Nicely, a posh mine is $i$ mines, the place$$i:=sqrt{-1}$$The explanation we’re together with anti mines right here (the place an anti mine is the same as (-1) mines, you’ll be able to study extra about them on Day 16 of the Minesweeper Creation Calendar right here) The final definition of an anti-mine is a mine that counts (-1) mines in the direction of a tile, which in some circumstances may result as a tile having a complete of 0 mines that the tile “sees”. (a complete of $n$ mines added to $n$ anti-mines, the place the full of anti mines “seeable” by a tile is similar of the full of normal mines (single, double, triple mines) “seeable” by a mine) Right here is the puzzle:
| 4i | 4i | ||||||
| -6+i | -3+5i | ||||||
| -2 | 6i | 5i | |||||
| -2 | -6 | -4+3i | -1+3i | 5i | |||
| -1+3i | -2+3i | ||||||
| -4+i | -8 | -3+i | -2+2i | ||||
| -3+2i | -3+2i | -5 | |||||
| -2+i | -5 |
If I’ve counted accurately, there are 18 complicated mines and 17 anti mines.
Notice that there aren’t any numbers which were eliminated to make this gimmick extra simply comprehensible.
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