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45 votes
45 votes
LMNP is a parallelogram.

On a coordinate plane, parallelogram L M N P is shown. Point L is at (negative 4, 1), point M is at (2, 4), point N is at (3, 2), and point P is at (negative 3, negative 1).

What additional information would prove that LMNP is a rectangle?

The length of LM is StartRoot 45 EndRoot and the length of MN is StartRoot 5 EndRoot.
The slope of LP and MN is –2.
LM ∥ PN
LP ⊥ PN

User Andrious Solutions
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2.3k points

2 Answers

13 votes
13 votes

Answer:

d

Explanation:

User Dike
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2.6k points
19 votes
19 votes

Answer:

LP ⊥ PN

Explanation:

Given


L = (-4, 1)


M = (2, 4)


N = (3, 2)


P = (-3, -1)

See attachment

Required

What proves LMNP is a rectangle

The additional information needed is LP ⊥ PN

Because:


(a)\ LM= √(45); MN = √(5)

This can be true for other shapes, such as trapezoid, etc.


(b)\ m(LP) = m(MN) = -2

The slopes of LP and MN will be the same because both sides are parallel; However, this is not peculiar to rectangles alone. Same as option (c)

(d) LP ⊥ PN

This must be true i.e. LP must be perpendicular to PN

LMNP is a parallelogram. On a coordinate plane, parallelogram L M N P is shown. Point-example-1
User Xorspark
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