There are eight different types of semiregular tessellations. Also called Archimedean tessellations, they occur when two or more convex regular polygons form tessellations of the plane in a way each polygon vertex is surrounded by the same polygons and in the same order.
Just look around you...On your house, there are brick walls. These are examples of non-regular tessellations...Look at pictures of honeycombs that bees live in. Those are examples of regular tessellations...Go on google or whatever you use and look up the artwork of M.C. Escher.
A dot in a problem can mean multiply. For example: 7.8=56 It also can mean the arrangement of angles about each vertex point. (Look up semiregular tessellations) It is typed like this: 3.3.4.3.4
Well here are some of the ones I remember * leaves on plants *snake skin *a pineapple *scales on a fish
An example of a dodecagon would be a semiregular tiling.There are many but some have dodecagons.
answer
There are eight different types of semiregular tessellations. Also called Archimedean tessellations, they occur when two or more convex regular polygons form tessellations of the plane in a way each polygon vertex is surrounded by the same polygons and in the same order.
By the use of wording "uniform" you are in fact stating that the tesselations are "regular"
Just look around you...On your house, there are brick walls. These are examples of non-regular tessellations...Look at pictures of honeycombs that bees live in. Those are examples of regular tessellations...Go on google or whatever you use and look up the artwork of M.C. Escher.
Tessellations
All sorts of polygons can create tessellations. See attached link for some examples: http://http://en.wikipedia.org/wiki/Tessellation
A dot in a problem can mean multiply. For example: 7.8=56 It also can mean the arrangement of angles about each vertex point. (Look up semiregular tessellations) It is typed like this: 3.3.4.3.4
A tessellation or tiling of the plane is a collection of plane figures that fills the plane with no overlaps and no gaps.
Well here are some of the ones I remember * leaves on plants *snake skin *a pineapple *scales on a fish
floors doors floors doors electronics and houses.
Flower petals, tiling, art
Some facts on tessellations are that there are different types of tessellations such as regular and semi-regular. In tessellations, each vertex will have a sum of 360º which is what all of the angles should come out to.