Since the quadrilateral in question is a square, all four sides are of equal length. Let’s denote the length of each side of the square as ‘s’. In a square, the relationships between the vertices can be defined as follows:
- Vu represents one side of the square.
- Su represents the adjacent side to Vu.
- Tv is the side opposite to Su.
- Sw is the adjacent side to Tv.
Given that all sides of a square are equal, we can conclude that:
- Vu = s
- Su = s
- Tv = s
- Sw = s
Thus, if you know the length of one side of the square, you can easily find the lengths of Vu, Su, Tv, and Sw, as they are all equal to that side length.