Final answer:
True, the endpoints of a polygon must conform to snap points, whereas the edges of an area are not confined by snap points.
Step-by-step explanation:
In mathematics, the statement is True. The endpoints of a polygon must conform to snap points, whereas the edges of an area are not confined by snap points. A polygon is a closed figure made up of line segments. The endpoints of these line segments determine the vertices of the polygon. These endpoints need to be located at specific coordinates, called snap points, in order to form a valid polygon.
They can be convex or concave, depending on their internal angles. The number of sides, or vertices, determines the polygon's specific name (e.g., triangle, quadrilateral). Polygons play a fundamental role in geometry, offering a basis for various mathematical principles. The edges of an area, on the other hand, do not need to be confined by snap points because they are not part of a polygon.