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Q: Three congruent regular hexagons can be drawn in such a way that all of them overlap each other and create more than 6 distinct areas or compartments.?

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Yes.

example based on these method

All 3 hands overlap 24 times a day.

Overlap happens once 12/11 hour. So 24÷12/11=22 Then overlap occurs 22 or 21 times a day.

Then they are simultaneous equations.

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First, a hexagon has 6 sides. Second, congruent means the polygons are the same size and shape. Third, regular hexagon means that all of the angles and the same and the lengths of the sides are the same. For my explanation, let's work with squares. If you were to overlap two perfect squares, you would get at 1 area. Rotate one of those squares, and you will get 8 areas, 4 on the inside and 4 on the outside. Since there is also a center area, we have 9 areas. Working with two hexagons would give you 1 or 13 areas. Obviously, adding a third square or hexagon will not achieve 10 areas, so you can stop here. ------ If you overlap 3 hexagons you get 3 sections that are unique to each hexagon 1 section in the middle that is part of each hexagon 3 sections that are shared between only 2 hexagons Those 7 are straightforward - I drew 3 hexagons in powerpoint to visualize it The last 3 are a matter of interpretation, but they are there. it depends on what is meant by "distinct." There are an additional 3 sections that are made up of the outlines of the 3 sections that shared between only two hexagons plus the section in the middle. That gets you to 10. My 2 cents is that this is a poorly worded question because the answer could be 7 or 10 depending on the interpretation of distinct.

Yes.

Some hexagons can tessellate because replicates of the shape can cover a plane without overlap or gaps.

There are very rarely distinct boundaries where a region abruptly changes.

answ2. Topographic contours of a large overhang could conceptually overlap, but convention merely prints them as congruent.

Yes they both will overlap each other perfectly

This is a pattern made up of identical shapes, they must fit together without any gaps and the shapes must not overlap. Multiple regular shapes are squares, triangles, hexagons and dodecagons

Judaism and Catholicism are distinct religions and do not have any symbols that overlap in terms of both aspect and interpretation.

Some examples of polygons include circles, triangles, squares, rectangles, pentagons, and hexagons. These are examples of 'simple polygons,' in that none of the lines overlap and intersect each other, such as in a pentagram, which is a 'star polygon.'

Each has distinct areas of authority with very little overlap.

competition for limited resources. This competition can drive natural selection, leading to the divergence of species or the partitioning of resources to reduce competition. Over time, this can result in the development of distinct ecological niches to reduce overlap and promote coexistence.

hexagons work because each angle is 120 degress, as you say, and 3 times 120 equals 360 degrees. So three hexagons will surround a point with no 'space" left over. but the interior angle of a pentagon is108 degrees. three pentagons together only fill up 3 time 108, or 324 degrees. There is space left over. But four pentagons would overlap. so 3 is not enough and 4 is too many. Pentagons cannot surround a point the way hexagons do.