Q: How many regular hexagons meet at a vertex to form a regular tessellation?

Write your answer...

Submit

Still have questions?

Continue Learning about Math & Arithmetic

Three regular hexagons meeting at a vertex would form a tessellation. So they would form a plane not a solid.

Yes, it will.

A regular pentagon is one example.

A regular triangle, quadrilateral (i.e., square) and hexagon may be used.

Certain polygons, yes. Squares, Triangles and Hexagons are all shapes which, in their regular form, can tessellate. Other polygons cannot.

Related questions

3

Three regular hexagons meeting at a vertex would form a tessellation. So they would form a plane not a solid.

No. Regular hexagons tessellate and cannot form a 3-d shape.No. Regular hexagons tessellate and cannot form a 3-d shape.No. Regular hexagons tessellate and cannot form a 3-d shape.No. Regular hexagons tessellate and cannot form a 3-d shape.

Triangle :)

Triangle :)

Yes, it will.

All triangles will tessellate. All quadrilaterals will tessellate There are 15 classes of convex pentagons â€“ the latest discovered in 2015 â€“ which will tessellate. Regular hexagons will tessellate. In addition, there are 3 classes of irregular convex hexagons which will tessellate. No convex polygon with 7 or more sides will tessellate.

Triangles, Hexagons and Squares. I am not a math professor or a college student, but I'm pretty sure that there are some more irregular shapes out there that will form a tessellation.

They are shapes or figures that can be put together to form a surface with no cracks in between and no overlapping. Squares, hexagons, and triangles are all examples of tesselations.

It can have 3, 4 or 6 sides.

It can have 3, 4 or 6 sides.

A regular pentagon is one example.