Very important question!!
What’s your favorite Japanese number puzzle?
sudoku
kakuro
hashi
hitori
nurikabe
futoshiki
kenken
shikaku
heyawake
slitherlink
fillomino
other/multiple/nuance/bald/vanilla extract, whatever
“What am I looking at here?”
seen from United States
seen from United States

seen from United Kingdom
seen from United States
seen from Egypt
seen from China
seen from United States
seen from United States
seen from Brazil
seen from United States
seen from United States
seen from China
seen from United States
seen from United States

seen from United States
seen from United States

seen from Croatia

seen from United Kingdom
seen from China

seen from United States
Very important question!!
What’s your favorite Japanese number puzzle?
sudoku
kakuro
hashi
hitori
nurikabe
futoshiki
kenken
shikaku
heyawake
slitherlink
fillomino
other/multiple/nuance/bald/vanilla extract, whatever
“What am I looking at here?”
PZV link
here’s a new Fillomino! This one was tricky to set up so hopefully I didn’t accidentally give it multiple solutions.
Edit: Someone pointed out that the original version had multiple solutions... orz. The version you see should have that fixed.
Rules:
Divide the grid along the grey lines to form regions. If a region contains a number, its area must be equal to that number. (A region can contain more than one number, but in that case it must be the same number.) Regions with the same area cannot share an edge.
PZV link
here’s another Fillomino!
Rules:
Divide the grid along the grey lines to form regions. If a region contains a number, its area must be equal to that number. (A region can contain more than one number, but in that case it must be the same number.) Regions with the same area cannot share an edge.
PZV link
the last fillomino for now. this one is much more challenging than my previous ones so be wary! I’ll be posting some slitherlinks next
Rules:
Divide the grid along the grey lines to form regions. If a region contains a number, its area must be equal to that number. (A region can contain more than one number, but in that case it must be the same number.) Regions with the same area cannot share an edge.
PZV link
another fillomino! enjoy.
Rules:
Divide the grid along the grey lines to form regions. If a region contains a number, its area must be equal to that number. (A region can contain more than one number, but in that case it must be the same number.) Regions with the same area cannot share an edge.
PZV link
here’s a hopefully easy fillomino! Enjoy the feeling of squeezing the numbers out like toothpaste
Rules:
Divide the grid along the grey lines to form regions. If a region contains a number, its area must be equal to that number. (A region can contain more than one number, but in that case it must be the same number.) Regions with the same area cannot share an edge.
PZV link
here’s the next fillomino! this one has a tricky setup in the top right, but otherwise it’s straightforward
Rules:
Divide the grid along the grey lines to form regions. If a region contains a number, its area must be equal to that number. (A region can contain more than one number, but in that case it must be the same number.) Regions with the same area cannot share an edge.
PZV link
it’s been a while, but I think it’s a good time to start posting puzzles again. I’ve got quite the backlog built up so look forward to them! I’ll start off with some Fillominos as the early ones I’ve posted are on the harder side, so there will be a few easier ones coming up. This one has a cute solving theme at the start!
also, I’ve found a site that has a interface for puzzle solving, so I’ll be adding a link to puzzles that are supported by it, you can see the one for this puzzle above (I’ve also added these links to my old puzzles.) If you’re new to these styles then the link is actually a good resource as it has a check function, which lets you know if you’ve messed something up.
Rules:
Divide the grid along the grey lines to form regions. If a region contains a number, its area must be equal to that number. (A region can contain more than one number, but in that case it must be the same number.) Regions with the same area cannot share an edge.