hexagons fit perfectly with one another so the answer is six.
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A hexagon, which is a six-sided figure or object, is unique in respect to the number of its sides. More practically, in the physical world, a hexagon is uniquely efficient: in grid-form, a hexagon's six sides are short enough to enable numerous such figures (or objects) to fill a defined space -- much more, in fact, than most other polygons. This factor enables the hexagon to serve as a time- and cost-saver in constructions of various kinds.
Okay. What do you want to know? No information can be drawn from that statement. No information can be given to you because you are too ambiguous. All sides congruent, by definition, makes the shape equilateral. But there is no guarantee that it is equiangular and therefore it isn't necessarily a regular polygon. Hexagons have six sides. If all sides are congruent then the perimeter is six times the length of one side and the length of one side is one-sixth the length of the perimeter. Aside from general size, an equilateral hexagon can come in only two unique types: concave and convex. For any given side-length/perimeter, there are only two possible equilateral hexagons. The area of an equiangular equilateral hexagon is 3/2*(length of one side)*(length of one side)*(square root of 3).
No the word unique is not an adverb. Unique is an adjective as it describes a noun.
unique key
This sentence is unique.
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.
A hexagon, which is a six-sided figure or object, is unique in respect to the number of its sides. More practically, in the physical world, a hexagon is uniquely efficient: in grid-form, a hexagon's six sides are short enough to enable numerous such figures (or objects) to fill a defined space -- much more, in fact, than most other polygons. This factor enables the hexagon to serve as a time- and cost-saver in constructions of various kinds.
A hexagon deck is a unique design that can add an element of fun to your home. You can find some examples of hexagon deck plans at the following websites: decks.com deckplans.com creativehomeowner.com
Okay. What do you want to know? No information can be drawn from that statement. No information can be given to you because you are too ambiguous. All sides congruent, by definition, makes the shape equilateral. But there is no guarantee that it is equiangular and therefore it isn't necessarily a regular polygon. Hexagons have six sides. If all sides are congruent then the perimeter is six times the length of one side and the length of one side is one-sixth the length of the perimeter. Aside from general size, an equilateral hexagon can come in only two unique types: concave and convex. For any given side-length/perimeter, there are only two possible equilateral hexagons. The area of an equiangular equilateral hexagon is 3/2*(length of one side)*(length of one side)*(square root of 3).
is pattern formation unique for liveing organisms
If you want to ask questions about "this unique pattern", then I suggest that you make sure that there is a pattern that follows!
Sky islands
An individual's unique dosha pattern
they are all unique.
they are all unique.
No
No! Their markings are a bit like our fingerprints, each having their own unique pattern.