Square Gluing Topology

This entry is part 43 of 72 in the series Durtles Problems of the Weeks
Problem of the Week #43: Monday October 30th, 2023
As before, these problems are the results of me following my curiosity, and I make no promises regarding the topics, difficulty, solvability of these problems.
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In topology, a shape can be stretched or bent while still being considered the same shape.  For example, a solid square can be stretched into a solid circle, but a washer (a circle with a hole in the middle) cannot, so a solid square and a solid circle are considered topologically the same, but a washer is topologically different from a circle.

Now let’s consider the surfaces we obtain by stretching and gluing the sides of a square together:

Instructions to glue sides of the squares:
- one set of opposite edges in the same direction, results in a cylinder.
- one set of opposite edges in reverse direction, results in a Möbius strip
- both sets of opposite edges in the same direction, results in a torus (donut)
- one set of opposite edges in the same direction and the other set in reverse direction, results in a Klein Bottle
- two pairs of adjacent edges in reverse direction, results in a sphere
- both sets of opposite edges in reverse direction, result?
- one pair of adjacent edges in reverse direction and the other in the same direction, result?
- two pairs of adjacent edges in the same direction, result?
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