they all have more than one side
they have more than one sides
square
hexagon
heptagon
octagon
nonagon
decagon
No. A polygon can be symmetric but need not be. In fact, the majority of polygons are not symmetrical.
Polygons are plane closed figures bounded by straight lines. There cannot be polygons with fewer than 3 sides.
They are regular polygons because you just multiply number of sides by the length of 1 side
regular polygons are the ones that all sides are equal
polygons are classified according to?
Yes they are polygons as they have more than 1 side.
point
No. A polygon can be symmetric but need not be. In fact, the majority of polygons are not symmetrical.
Polygons are plane closed figures bounded by straight lines. There cannot be polygons with fewer than 3 sides.
Most regular polygons will not - by themselves. In fact, of the regular polygons, only a triangle, square and hexagon will. No other regular polygon will create a regular tessellation. However, for polygons with any number of sides, there are irregular versions that can tessellate.
Most regular polygons will not - by themselves. In fact, of the regular polygons, only a triangle, square and hexagon will. No other regular polygon will create a regular tessellation.
1 face at a time
Polygons have 3 or more sides, so there are no one sided polygons idiot.
There are lots of polygons like that. If by 1 right angle, you mean exactly 1 right angle, there are no such quadrilaterals, but there are pentagons (in fact n-gons for all n>=5.)
There are lots of different types of polygons Polygons are classified into various types based on the number of sides and measures of the angles.: Regular Polygons Irregular Polygons Concave Polygons Convex Polygons Trigons Quadrilateral Polygons Pentagon Polygons Hexagon Polygons Equilateral Polygons Equiangular Polygons
1000000000 is a RIDICUOLOSYON
To determine which polygons in the diagram are images of polygon 1 under similarity transformations, look for polygons that maintain the same shape but may differ in size or orientation. Similarity transformations include scaling, rotation, and translation. Identify polygons that have corresponding angles equal and side lengths that are proportional to those of polygon 1. Without the diagram, it's not possible to specify which polygons meet these criteria.