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Cross+A 谜题种类




Slitherlink

Sheep and Wolves("狼和羊"):除了0至3 数字以外,在格网中有黑圆圈("羊")和黑交叉符号("狼")。需要划一条不间断的线,所有的"羊"都要处在该条线内,而"狼"要处在该条线外。

Sheep and Wolves



Battleships

Digital Battleships – 在网格中的所有方格包含数目。需要在盘面上摆放"船舰",主要条件是“隐藏”的数字中船舰在对角和邻边都不可以相邻。

Digital Battleships

Retrograde Battleships ("Reverse Battleships") contains all segments of the ships in the grid. The aim is to find the correct locations of the ships. No ship may touch another, even diagonally.

Retrograde Battleships



Fillomino

No Rectangles Fillomino有附加条件:不得构成长方形或正方形的大块。

No Rectangles Fillomino

Only Rectangles Fillomino:所有的大块都是长方形或正方形。

Only Rectangles Fillomino

No 2 x 2 Squares Fillomino:在格网中不得构成包含相同数字的 2x2大块。

No 2 x 2 Squares Fillomino

Non-Consecutive Fillomino:任何大块的数字和在横向或纵向邻接的大块的数字要至少大于或小于二。

Non-Consecutive Fillomino

Consecutive Fillomino:任何大块的数字和在横向或纵向邻接的大块的数字要大于或小于一。

Consecutive Fillomino

No Row/Column Repeats Fillomino ("Deadomino"):在任何行或列里的相同的数字都属于一个大块。例如,在一条列里有两个"5"数字,则它们都属于一个大块。

No Row/Column Repeats Fillomino

All Odds Fillomino:任何大块数字大小相当于奇数。

All Odds Fillomino

All Evens Fillomino:任何大块大小相当于偶数。

All Evens Fillomino



Nurikabe

Line Nurikabe: a grid cannot contain five consecutive black cells in a row or column (2 x 2 cell area can be all black).

Line Nurikabe

Pairs Nurikabe ("双数墙")与普通的Nurikabe("数墙")主要差别是每个"岛"含有两个数字,数字之和等于该岛的面积。

Pairs Nurikabe



Skyscrapers

Sum SkyscrapersSkyscrapers谜题的不同点是格网外面的数字不表明可看到的楼房数量,而是表明那些楼房的所有楼层之和。

Sum Skyscrapers



Tapa

Tapa这种谜题有各种各样的玩法。Cross+A软件能解答其中几种。

Tapa [Line]有附加规则:不得有水平或垂直一连四个黑格的线。

Tapa [Line]

No Squares Tapa:不得有只含白格的2×2正方体。

No Squares Tapa

Equal Tapa: 除了含数字的方格以外,白色方格的数量应等于黑色方格的数量。

Equal Tapa

B&W Tapa

  • 所有的白色方格组成结合的区域。
  • 不得有只含白色或黑色方格的2×2正方体。
  • 有数字的方格算为白色方格。

B&W Tapa

Tapa Islands

  • 白色方格形成分隔的区域("岛")。
  • 每个白色的区域只能有一个含数字的方格。
  • 方格里一组数字中的一个数字应等于"岛"面积。
  • 有的白色区域可以没有数字。

Tapa Islands

Pata

  • 数字代表在方格周围的一连几个白格的区域。
  • 不同的白格区域是用至少一个黑格分隔的。

Pata

Tapa Balance: 格网左边的黑色方格数量应等于格网右边的黑色方格数量,白色方格和有数字的方格不影响到在格网两个部分中黑色方格的平衡。

Tapa Balance

Tapa Row: 一行所有的数字之和等于该行黑色方格的数量。

Tapa Row

Tapa 1-n:每个行和列所有的黑色方格数量不得相同。

Tapa 1-n

Dissected Tapa:黑色方格和白色方格应形成两个全等的图形。能够完全重合的两个图形叫做全等的图形。

Dissected Tapa

Tapa [Diagonal Neighbors]: every black cell must have at least one diagonally adjacent black cell.

Tapa [Diagonal Neighbors]



Corral

Inside/Outside CorralCorral谜题的一种。其主要的差别是数字不仅放在闭合的线内,也放在闭合的线外。在两种游戏中数字表明水平和垂直看到的方格数量,包括该数字的方格。

Inside/Outside Corral



Arukone

Arukone3:

  • Every line must not cover 2 x 2 area.
  • All cells in the grid must be filled.

Arukone



Easy as ABC

Not as Easy as ABC is a variation of Easy as ABC puzzle. The goal is to fill in the first letters of the alphabet on every row and every column exactly once. One cell in every row and every column remains empty. Letters and numbers on the outside indicate at what position you come across this letter when looking from that side (e.g. C2 means the C is the second letter encountered when looking from that side).

Not as Easy as ABC



Ichimaga

Crossing Ichimaga: the lines may cross other lines; the lines cannot change direction at the point of intersection.

Crossing Ichimaga

Magnetic Ichimaga ("Jishaku-Ichimaga"): the circles with the same digits cannot be connected.

Magnetic Ichimaga



Snake

Multiple Snakes: a grid contains multiple snakes. Head and tail of all snakes are given. Different snakes do not touch each other, even diagonally.

Multiple Snakes

Toroidal Snake: a grid wraps around itself. A snake can go from one edge to another.

Toroidal Snake



Minesweeper

Double Minesweeper: place mines into each empty cell in the grid, at most two mines per cell.

Double Minesweeper



Mirukuti

Milk Tease is a variation of Mirukuti ("Milk-T") puzzle. T-shaped line may connect:

  • one black circle and two white circles;
  • one white circle and two black circles.

Two circles of the same color must be connected by the straight-line segment of the T-shaped line.

Milk Tease



Light Up

Mirror Akari ("!irakAkari!"): a square or rectangular grid contains diagonal walls (black triangles) with mirrors.

  • No two bulbs shine on each other, even by reflected light. A bulb cannot shine on itself.
  • If a cell contains a diagonal wall ("mirror"), it should be lit.
  • If a cell contains a diagonal line ("two-sided mirror"), both sides of a mirror should be lit.
  • A cell with a mirror cannot contain a bulb.

Mirror Akari



Tren

Tren+:

  • Each block contains exactly one number or a question sign (unknown number), indicating the amount of its possible movements.
  • All cells that are not part of any block must be connected horizontally or vertically.

Tren+

Ghost Tren:

  • Blocks can also be placed without any numbers, with no restrictions on their ability to move.
  • All cells that are not part of any block must be connected horizontally or vertically.

Ghost Tren



Mubunanba

Mubunanba+:

  • Each block contains exactly one digit or a question sign (unknown digit), indicating the number of possible directions to move a block.
  • All cells that are not part of any block must be connected horizontally or vertically.

Mubunanba+



Yajilin

Regional Yajilin (also known as "Yajilin (Regions)") is a square or rectangular grid divided into regions. The aim is to blacken some cells and to draw a single non-intersecting loop through all the white cells. A number in a region indicates the number of black cells in that region. A region without a number can contain any amount of black cells. No two black cells can share a border. The loop may visit numbered cells; numbered cells can be blackened.

Regional Yajilin



LITS

Double LITS has one difference from the classic variant of the puzzle: each region must contain two tetrominoes. These two tetrominoes within a region cannot touch each other horizontally or vertically (only diagonally); they can be the same or different shapes.

Double LITS



Kapama

Sunglasses is a logic puzzle. A rectangular or square grid contains lines ("bridges") in some cells. The goal is to blacken some cells to create pairs of figures (twin shapes). Twin shapes ("lenses") are symmetrical with respect to a bridge. Two lenses may not share an edge. Cells with bridges can not be blacken. Numbers outside the grid show the number of black cells in a corresponding row or column.

Sunglasses



Makaro

Masakuchi is a logic puzzle published by Nikoli. A rectangular or square grid is divided into regions. Each region must be filled with each of the digits from 1 to the number of cells in the region. When two numbers are orthogonally adjacent across a region boundary, the numbers must be different. The grid may contain black cells with arrows and numbers: the arrow points at the greatest number among the four cells around (up, under, left, right) the black cell. The number in the black cell shows the difference between the greatest number and the second highest number in all orthogonally adjacent cells around the black cell.

Masakuchi