What is the Meaning & Definition of curve line

The curved line is one of the most basic and important mathematics, around which establishing a myriad of structures and relations of great importance. We could describe the curved line as a straight line that takes some kind of deviation in his righteousness in gradual, not sudden or violent way because in that case we would be talking about the union two perpendicular straight curves on a point. The curved line may form, if closed, various forms and structures that vary depending on the angle with which that line go armando on space and on the plane. The curved line is a phenomenon interesting in mathematics since its morphology makes it difficult to describe as compared to many other phenomena more adjustable to logical definitions and formulas. The curved line has been classified in many different ways, and in some cases the traditionally accepted definitions have required updates since the same math has tested them as useless to explain the phenomenon as simple but at the same time as complex curved line. In simple terms, we could say that curved lines can be open or closed. When we speak of curved lines, are making reference to the parable (line projected when cutting a taper for the plane parallel to the generatrix), to the Hyperbola (that is generated when cutting a cone through an oblique plane to its axis of symmetry) and the catenary (curve obtained an element as a string to be exposed to gravity). Closed curved lines may form different surfaces that vary depending on the angle of your space. Thus, we speak of ellipse (a closed symmetric curved line) and circumference (a line that States that all points that leave your radio or Center are equal distance from the line, which makes it a perfect curved line). On the other hand, there is also the curved line flat which is one that exists only in a plane or space, so we are talking about a representation of a curved line.