Eight possible folding patterns for a unit cube.
But not all of them are correct. Find out which can be successfully
folded into the cube and which cannot. A spatial challenge to train
and enrich your imagination.
It is known only two among eight colored patterns can produce two
identically colored prisms when folded. Can you spot them correctly in
this "2D-to-3D" folding-spatial puzzle?
A shape consists of five adjacent squares and two triangles. There are
some variations of the shape provided. The goal is to figure out which of
them can be folded into a cube. A good exercise to train your spatial
reasoning.
Three colored strips have to be folded into three colored letters. The key
idea is to keep the number of the performed folds as low as possible. Is
it a challenge that would be TOY to you?
Cut out some shape from a perfect square, then apply to it some folding
and get... a perfect cube. It's not squaring the circle, but could it be
cubing the square?
A strip of six squares is not among those hexominoes that can be folded
into a one-unit cube. But it's said the seventh square added to the strip
may help.
Can the rectangle coordinates provide us with a perfect pentagon? Yes,
they can! Now the puzzle is to reveal how to make such a pentagon from...
a simple strip.
A funny C letter states it can be folded from some capital letter and only
within one fold. But what letter it can be if C insists it was not a
capital L?
