Answer with explanation:
To prove that ,diagonals of square P Q RS are perpendicular bisectors of each other
We need to prove that ,→ Mid point of Diagonal PR and QS are same.
→That is Diagonals of square bisect each other.
→Also, the Product of slopes of two line segments ,that is Diagonal PR and QS ,where the two diagonals intersect is equal to -1.
Option D: The midpoint of both diagonals is Same, the slope of RP is 7, and the slope of SQ is [tex]\frac{-1}{7}[/tex]
because [tex]7 \times \frac{-1}{7}=-1[/tex]
