Intersection PuzzleOptimal play for 2 by 2 dots and boxesIn the Undead Game, what makes one board more difficult than another?Oct - Dots and Boxes on Steroids!A Total Masyu puzzleLatin square puzzleLatin Square Puzzle - Difficult$verb|Eight Circles|$Finding the hidden path (new grid puzzle concept?)A “Find the Path” PuzzleMasyu puzzles with many circles
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Intersection Puzzle
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Intersection Puzzle
Optimal play for 2 by 2 dots and boxesIn the Undead Game, what makes one board more difficult than another?Oct - Dots and Boxes on Steroids!A Total Masyu puzzleLatin square puzzleLatin Square Puzzle - Difficult$verb|Eight Circles|$Finding the hidden path (new grid puzzle concept?)A “Find the Path” PuzzleMasyu puzzles with many circles
$begingroup$
I have invented a new puzzle called Intersection. Let's find out what it is!
Intersection
You are given an $ntimes n$ grid with circles and boxes inside arbitrary squares. A circle cannot be in the same grid square as another box; there must always be at least two circles, but at least one box; the circles and/or boxes cannot fill up every square in the grid. Now onto the real rules of the game!
Suppose we let $n=3$ and have the following configuration:
$$beginarray hline
& & \ hline
&bigcirc &square \ hline
bigcirc & & \ hline
endarray$$
The aim of the game in this case is to connect the two circles with lines, but the lines must intersect at the grid square with the box in the middle.
- Lines only start from circles, not boxes or anywhere else;
- When a line reaches an outer edge of the grid from a particular grid square, the line can be continued from the grid square on the directly opposite end of the same row/column, unless a line or circle is in the grid square on that very opposite end (kind of like how Pac-Man can leave the maze from one end and enter it back in from the directly opposite end);
- Lines cannot start from a circle and then connect back to the same circle;
- Lines cannot interfere with each other in regular grid squares, but only on the squares where the boxes are in;
- Lines can only travel in rows and columns, no diagonals;
- Up to four lines can protrude from a given circle in general, but that can vary depending on the position of a circle.
- Lines can only connect to other circles by crossing at least one grid square — if two circles are in grid squares adjacent to each other, a line cannot connect them in between.
- Lines must fill every grid square!
With those rules, here is the solution (though there could be more than one, but that I don't know for sure):
$qquadqquadqquadqquadqquadquad$
How about something else?
$$beginarray hline
& &bigcirc \ hline
&bigcirc & \ hline
square & & \ hline
endarray$$
The solution to this is:
$qquadqquadqquadqquadqquadqquadquad$
(sorry for the bad drawing skill; trust me, I'm better by hand than by software, but that's besides the point)
So, let's bump it up to something a little harder, shall we?
Puzzle
Solve the following intersection grid!
$$beginarray hline
bigcirc& & & \ hline
& &bigcirc & \ hline
&square &square & \ hline
& &bigcirc &square \ hline
endarray$$
The first user to answer with a solution will get the tick; another answer to follow that might also have a solution will get a $+50$ rep bounty; if an answer holds more than one solution, then it will get a $+100$ rep bounty (and if that one comes first, it will instead get the tick).
I hope my puzzle makes sense.
Good luck! :D
P.S. This game is like Flow for those who know that game, except the lines, well, intersect each other.
grid-deduction puzzle-creation pencil-and-paper-games connections-puzzle
asked 2 hours ago
user477343user477343
3,2211857
$endgroup$
|
show 2 more comments
$begingroup$
I have invented a new puzzle called Intersection. Let's find out what it is!
Intersection
You are given an $ntimes n$ grid with circles and boxes inside arbitrary squares. A circle cannot be in the same grid square as another box; there must always be at least two circles, but at least one box; the circles and/or boxes cannot fill up every square in the grid. Now onto the real rules of the game!
Suppose we let $n=3$ and have the following configuration:
$$beginarray hline
& & \ hline
&bigcirc &square \ hline
bigcirc & & \ hline
endarray$$
The aim of the game in this case is to connect the two circles with lines, but the lines must intersect at the grid square with the box in the middle.
- Lines only start from circles, not boxes or anywhere else;
- When a line reaches an outer edge of the grid from a particular grid square, the line can be continued from the grid square on the directly opposite end of the same row/column, unless a line or circle is in the grid square on that very opposite end (kind of like how Pac-Man can leave the maze from one end and enter it back in from the directly opposite end);
- Lines cannot start from a circle and then connect back to the same circle;
- Lines cannot interfere with each other in regular grid squares, but only on the squares where the boxes are in;
- Lines can only travel in rows and columns, no diagonals;
- Up to four lines can protrude from a given circle in general, but that can vary depending on the position of a circle.
- Lines can only connect to other circles by crossing at least one grid square — if two circles are in grid squares adjacent to each other, a line cannot connect them in between.
- Lines must fill every grid square!
With those rules, here is the solution (though there could be more than one, but that I don't know for sure):
$qquadqquadqquadqquadqquadquad$
How about something else?
$$beginarray hline
& &bigcirc \ hline
&bigcirc & \ hline
square & & \ hline
endarray$$
The solution to this is:
$qquadqquadqquadqquadqquadqquadquad$
(sorry for the bad drawing skill; trust me, I'm better by hand than by software, but that's besides the point)
So, let's bump it up to something a little harder, shall we?
Puzzle
Solve the following intersection grid!
$$beginarray hline
bigcirc& & & \ hline
& &bigcirc & \ hline
&square &square & \ hline
& &bigcirc &square \ hline
endarray$$
The first user to answer with a solution will get the tick; another answer to follow that might also have a solution will get a $+50$ rep bounty; if an answer holds more than one solution, then it will get a $+100$ rep bounty (and if that one comes first, it will instead get the tick).
I hope my puzzle makes sense.
Good luck! :D
P.S. This game is like Flow for those who know that game, except the lines, well, intersect each other.
grid-deduction puzzle-creation pencil-and-paper-games connections-puzzle
asked 2 hours ago
user477343user477343
3,2211857
$endgroup$
$begingroup$
Must we fill in every square? Asking this given the "Flow" reference.
$endgroup$
– EKons
2 hours ago
$begingroup$
This is like the sequel Flow Free: Bridges.
$endgroup$
– noedne
2 hours ago
$begingroup$
@EKons yes! I will add that in
$endgroup$
– user477343
2 hours ago
$begingroup$
@noedne I have never heard of that... please don't tell me my game is the exact concept :(
$endgroup$
– user477343
2 hours ago
$begingroup$
I don't think it's the exact concept, since we have to connect all pairs of circles, not just each pair of same-colored circles (your grid has three such pairs, for example, Flow Free: Bridges needs an even number of circles because of the way it works).
$endgroup$
– EKons
2 hours ago
|
show 2 more comments
$begingroup$
I have invented a new puzzle called Intersection. Let's find out what it is!
Intersection
You are given an $ntimes n$ grid with circles and boxes inside arbitrary squares. A circle cannot be in the same grid square as another box; there must always be at least two circles, but at least one box; the circles and/or boxes cannot fill up every square in the grid. Now onto the real rules of the game!
Suppose we let $n=3$ and have the following configuration:
$$beginarray hline
& & \ hline
&bigcirc &square \ hline
bigcirc & & \ hline
endarray$$
The aim of the game in this case is to connect the two circles with lines, but the lines must intersect at the grid square with the box in the middle.
- Lines only start from circles, not boxes or anywhere else;
- When a line reaches an outer edge of the grid from a particular grid square, the line can be continued from the grid square on the directly opposite end of the same row/column, unless a line or circle is in the grid square on that very opposite end (kind of like how Pac-Man can leave the maze from one end and enter it back in from the directly opposite end);
- Lines cannot start from a circle and then connect back to the same circle;
- Lines cannot interfere with each other in regular grid squares, but only on the squares where the boxes are in;
- Lines can only travel in rows and columns, no diagonals;
- Up to four lines can protrude from a given circle in general, but that can vary depending on the position of a circle.
- Lines can only connect to other circles by crossing at least one grid square — if two circles are in grid squares adjacent to each other, a line cannot connect them in between.
- Lines must fill every grid square!
With those rules, here is the solution (though there could be more than one, but that I don't know for sure):
$qquadqquadqquadqquadqquadquad$
How about something else?
$$beginarray hline
& &bigcirc \ hline
&bigcirc & \ hline
square & & \ hline
endarray$$
The solution to this is:
$qquadqquadqquadqquadqquadqquadquad$
(sorry for the bad drawing skill; trust me, I'm better by hand than by software, but that's besides the point)
So, let's bump it up to something a little harder, shall we?
Puzzle
Solve the following intersection grid!
$$beginarray hline
bigcirc& & & \ hline
& &bigcirc & \ hline
&square &square & \ hline
& &bigcirc &square \ hline
endarray$$
The first user to answer with a solution will get the tick; another answer to follow that might also have a solution will get a $+50$ rep bounty; if an answer holds more than one solution, then it will get a $+100$ rep bounty (and if that one comes first, it will instead get the tick).
I hope my puzzle makes sense.
Good luck! :D
P.S. This game is like Flow for those who know that game, except the lines, well, intersect each other.
grid-deduction puzzle-creation pencil-and-paper-games connections-puzzle
asked 2 hours ago
user477343user477343
3,2211857
$endgroup$
I have invented a new puzzle called Intersection. Let's find out what it is!
Intersection
You are given an $ntimes n$ grid with circles and boxes inside arbitrary squares. A circle cannot be in the same grid square as another box; there must always be at least two circles, but at least one box; the circles and/or boxes cannot fill up every square in the grid. Now onto the real rules of the game!
Suppose we let $n=3$ and have the following configuration:
$$beginarray hline
& & \ hline
&bigcirc &square \ hline
bigcirc & & \ hline
endarray$$
The aim of the game in this case is to connect the two circles with lines, but the lines must intersect at the grid square with the box in the middle.
- Lines only start from circles, not boxes or anywhere else;
- When a line reaches an outer edge of the grid from a particular grid square, the line can be continued from the grid square on the directly opposite end of the same row/column, unless a line or circle is in the grid square on that very opposite end (kind of like how Pac-Man can leave the maze from one end and enter it back in from the directly opposite end);
- Lines cannot start from a circle and then connect back to the same circle;
- Lines cannot interfere with each other in regular grid squares, but only on the squares where the boxes are in;
- Lines can only travel in rows and columns, no diagonals;
- Up to four lines can protrude from a given circle in general, but that can vary depending on the position of a circle.
- Lines can only connect to other circles by crossing at least one grid square — if two circles are in grid squares adjacent to each other, a line cannot connect them in between.
- Lines must fill every grid square!
With those rules, here is the solution (though there could be more than one, but that I don't know for sure):
$qquadqquadqquadqquadqquadquad$
How about something else?
$$beginarray hline
& &bigcirc \ hline
&bigcirc & \ hline
square & & \ hline
endarray$$
The solution to this is:
$qquadqquadqquadqquadqquadqquadquad$
(sorry for the bad drawing skill; trust me, I'm better by hand than by software, but that's besides the point)
So, let's bump it up to something a little harder, shall we?
Puzzle
Solve the following intersection grid!
$$beginarray hline
bigcirc& & & \ hline
& &bigcirc & \ hline
&square &square & \ hline
& &bigcirc &square \ hline
endarray$$
The first user to answer with a solution will get the tick; another answer to follow that might also have a solution will get a $+50$ rep bounty; if an answer holds more than one solution, then it will get a $+100$ rep bounty (and if that one comes first, it will instead get the tick).
I hope my puzzle makes sense.
Good luck! :D
P.S. This game is like Flow for those who know that game, except the lines, well, intersect each other.
grid-deduction puzzle-creation pencil-and-paper-games connections-puzzle
grid-deduction puzzle-creation pencil-and-paper-games connections-puzzle
asked 2 hours ago
user477343user477343
3,2211857
asked 2 hours ago
user477343user477343
3,2211857
edited 2 hours ago
user477343
asked 2 hours ago
user477343user477343
3,2211857
asked 2 hours ago
user477343user477343
3,2211857
asked 2 hours ago
user477343user477343
3,2211857
3,2211857
$begingroup$
Must we fill in every square? Asking this given the "Flow" reference.
$endgroup$
– EKons
2 hours ago
$begingroup$
This is like the sequel Flow Free: Bridges.
$endgroup$
– noedne
2 hours ago
$begingroup$
@EKons yes! I will add that in
$endgroup$
– user477343
2 hours ago
$begingroup$
@noedne I have never heard of that... please don't tell me my game is the exact concept :(
$endgroup$
– user477343
2 hours ago
$begingroup$
I don't think it's the exact concept, since we have to connect all pairs of circles, not just each pair of same-colored circles (your grid has three such pairs, for example, Flow Free: Bridges needs an even number of circles because of the way it works).
$endgroup$
– EKons
2 hours ago
|
show 2 more comments
$begingroup$
Must we fill in every square? Asking this given the "Flow" reference.
$endgroup$
– EKons
2 hours ago
$begingroup$
This is like the sequel Flow Free: Bridges.
$endgroup$
– noedne
2 hours ago
$begingroup$
@EKons yes! I will add that in
$endgroup$
– user477343
2 hours ago
$begingroup$
@noedne I have never heard of that... please don't tell me my game is the exact concept :(
$endgroup$
– user477343
2 hours ago
$begingroup$
I don't think it's the exact concept, since we have to connect all pairs of circles, not just each pair of same-colored circles (your grid has three such pairs, for example, Flow Free: Bridges needs an even number of circles because of the way it works).
$endgroup$
– EKons
2 hours ago
$begingroup$
Must we fill in every square? Asking this given the "Flow" reference.
$endgroup$
– EKons
2 hours ago
$begingroup$
Must we fill in every square? Asking this given the "Flow" reference.
$endgroup$
– EKons
2 hours ago
$begingroup$
This is like the sequel Flow Free: Bridges.
$endgroup$
– noedne
2 hours ago
$begingroup$
This is like the sequel Flow Free: Bridges.
$endgroup$
– noedne
2 hours ago
$begingroup$
@EKons yes! I will add that in
$endgroup$
– user477343
2 hours ago
$begingroup$
@EKons yes! I will add that in
$endgroup$
– user477343
2 hours ago
$begingroup$
@noedne I have never heard of that... please don't tell me my game is the exact concept :(
$endgroup$
– user477343
2 hours ago
$begingroup$
@noedne I have never heard of that... please don't tell me my game is the exact concept :(
$endgroup$
– user477343
2 hours ago
$begingroup$
I don't think it's the exact concept, since we have to connect all pairs of circles, not just each pair of same-colored circles (your grid has three such pairs, for example, Flow Free: Bridges needs an even number of circles because of the way it works).
$endgroup$
– EKons
2 hours ago
$begingroup$
I don't think it's the exact concept, since we have to connect all pairs of circles, not just each pair of same-colored circles (your grid has three such pairs, for example, Flow Free: Bridges needs an even number of circles because of the way it works).
$endgroup$
– EKons
2 hours ago
|
show 2 more comments
2 Answers
2
active
oldest
votes
$begingroup$
answered 2 hours ago
noednenoedne
8,51412365
$endgroup$
add a comment |
$begingroup$
I think I've got an alternative solution to noedne
answered 1 hour ago
hexominohexomino
45.4k4139219
$endgroup$
add a comment |
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2 Answers
2
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2 Answers
2
active
oldest
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$begingroup$
answered 2 hours ago
noednenoedne
8,51412365
$endgroup$
add a comment |
$begingroup$
answered 2 hours ago
noednenoedne
8,51412365
$endgroup$
add a comment |
$begingroup$
answered 2 hours ago
noednenoedne
8,51412365
$endgroup$
answered 2 hours ago
noednenoedne
8,51412365
answered 2 hours ago
noednenoedne
8,51412365
answered 2 hours ago
noednenoedne
8,51412365
answered 2 hours ago
noednenoedne
8,51412365
8,51412365
add a comment |
add a comment |
$begingroup$
I think I've got an alternative solution to noedne
answered 1 hour ago
hexominohexomino
45.4k4139219
$endgroup$
add a comment |
$begingroup$
I think I've got an alternative solution to noedne
answered 1 hour ago
hexominohexomino
45.4k4139219
$endgroup$
add a comment |
$begingroup$
I think I've got an alternative solution to noedne
answered 1 hour ago
hexominohexomino
45.4k4139219
$endgroup$
I think I've got an alternative solution to noedne
answered 1 hour ago
hexominohexomino
45.4k4139219
answered 1 hour ago
hexominohexomino
45.4k4139219
answered 1 hour ago
hexominohexomino
45.4k4139219
answered 1 hour ago
hexominohexomino
45.4k4139219
45.4k4139219
add a comment |
add a comment |
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$begingroup$
Must we fill in every square? Asking this given the "Flow" reference.
$endgroup$
– EKons
2 hours ago
$begingroup$
This is like the sequel Flow Free: Bridges.
$endgroup$
– noedne
2 hours ago
$begingroup$
@EKons yes! I will add that in
$endgroup$
– user477343
2 hours ago
$begingroup$
@noedne I have never heard of that... please don't tell me my game is the exact concept :(
$endgroup$
– user477343
2 hours ago
$begingroup$
I don't think it's the exact concept, since we have to connect all pairs of circles, not just each pair of same-colored circles (your grid has three such pairs, for example, Flow Free: Bridges needs an even number of circles because of the way it works).
$endgroup$
– EKons
2 hours ago