Answer:
- it is trapezium in case of a) S(0, 0)
- it is parallelogram in case of b) S(3, -2)
And vertex of part c), d) and e) are neither trapezium nor parallelogram.
Step-by-step explanation:
The given Quadrilateral PQRS has vertices P(−3, 2), Q(−1, 4), and R(5, 0).
If we take fourth vertex S as (0, 0) ( as shown in figure-1 )
we can see that distance between PQ and ST are same 2√2 .
so, line PS and RQ are parallel.
Therefore it is trapezium in case of a) S(0, 0)
If we take fourth vertex S as (3, -2) ( as shown in figure-2 )
we can see that distance between PQ and SR are same 2√2
and distance between PS and RQ are same √52
Therefore it is parallelogram in case of b) S(3, -2)
And vertex of part c), d) and e) are neither trapezium nor parallelogram.
