A convex polygon.I suspect that what you mean is a convex polygon.
Do you mean a polygon? A polygon is a two-dimensional figure.
A polygon is a shape with multiple sides. For example, a triangle is a polygon with 3 sides.
An equilangular polygon is a polygon who's angles are equal.
The Greek word polygon means 'many sides'
A regular polygon has all its angles equal AND all its sides equal. A nonregular polygon has at least one angle or one side that is different from the others.
nonregular hexagon. a regular polygon has equal side lengths and equal angle measures.
No, the set of nonregular languages is not closed under intersection.
A polygon is an enclosed plane area whose boundaries comprise straight lines.A regular polygon is one in which all the sides are of the same length and all the angles are of the same measure.An irregular polygon is one which is not regular. It may have one or more sides that are not the same length as other sides, or one or more angles that are not the same measure as other angles (or both).
A convex polygon.I suspect that what you mean is a convex polygon.
Do you mean a polygon? A polygon is a two-dimensional figure.
A polygon that has 5 sides is a pentagon
A polygon is a shape with multiple sides. For example, a triangle is a polygon with 3 sides.
An equilangular polygon is a polygon who's angles are equal.
the circle is tangent to each side of the polygon And it's located within the polygon
The union of regular and nonregular languages is significant in theoretical computer science because it allows for the creation of more complex and powerful computational models. By combining the simplicity of regular languages with the complexity of nonregular languages, researchers can develop more sophisticated algorithms and solve a wider range of computational problems. This union helps in advancing the understanding of the limits and capabilities of computational systems.
If you mean an irregular polygon, it is a polygon with sides of different length or angles of different measure (or both).