Answer:
D. LP ⊥ PN
Explanation:
A rectangle is a four-angle parallelogram, so to demonstrate that LMNP is a rectangle, we must prove that LP is perpendicular to PN.
The vertical coordinates are L(-4,1), P(-3,-1) and N(3,2), then afterwards
PL = (-4 + 3, 1 + 1)
PL = (-1 , 2)
And,
PN = (3 + 3, 2 + 1)
PL = (6,3)
Now, consider the dot product,
PL.PN = (-1) (6) + (2) (3)
PL.PN = 0
As we can see that the two vectors having dot product is equal to zero as these vectors considered to be perpendicular.
Plus, It is mentioned that LMNP is a parallelogram
So,
m∠P = m∠M = 90° and m∠L = m∠N = 180° - 90° = 90°
Therefore all parallelograms angles are equal to each other
Therefore the LMNP is a rectangle