Suppose there is a shape of rocking horse made up of a number of pieces.
Now move several of them to convert the horse into a fox. How foxy this
challenge really is?
Could you reconstruct an interesting story of
Danila the apprentice which created two stone flowers in such a way
that they can be combined together in a perfect circle?
Two rhombuses, two irregular hexagons and one
irregular pentagon - all of them have to be arranged into a single
perfect shape which is a five-point star. And no part of a piece has
to be hidden in any way.
Three color snakes, each of the same length but
of the different shape. Just put them all onto the hexagonal board.
The snakes can be freely rotated and flipped over but not overlapped.
One of the proposed seven chocolate pieces can be copied six times in
order to fit them into a rectangular chocolate bar. The key questions
are what piece is it and what the final chocolate bar should look
like?
The 6x10 rectangle arranged from twelve pentominoes is a base for a 2-in-1
puzzle. First is the dissection challenge. Second is the put-together
problem. Can you solve them both?
Arrange eight pieces to create a shape with a triangular pattern on it.
Each piece is cut from a hexagon and includes a part of the pattern on it.
The goal is to fit the pieces correctly within the board.
A colorful set of seven pieces which have to be arranged into a Greek
cross. You can rotate the pieces or turn them over, but not overlap or
damage. How perfect your final shape of the cross will be?
Seven pieces are already fitted into a square table top. One is left, and,
unfortunately, the cabinetmaker doesn't know how to be with it. Can you
help him to solve this fitting challenge?
Place six color loops onto a 4x5 grid. No loop should touch any other one; no loop should be left outside the grid’s borders. Is the grid big enough to hold all the loops within strictly following the rules?
Eight pairs of identical moons are orbiting a green planet. The goal is to
connect them all to the planet with a link per moon. It's a harder sequel
to The 4 Angles
puzzle by the same author.
If several silhouettes are superimposed in a pile in some certain way a
silhouette of a rabbit can appear. Moreover two different rabbit's
silhouettes can be obtained. Can you find them both?
The four identical triangles can be arranged into the same triangle, only
bigger. Can you perform the same thing with another set of four identical
shapes?
There is one Sun and eight planets in this puzzle. And your goal is to
supply each planet with its portion of light - exactly one ray per planet.
Enjoy and relax!
Every piece in this set has two parameters: shape and color. And they both
are very important when you're placing the pieces within a square grid.
You'll see why.
