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Question
Prove that the points (–4, –3), (–3, 2), (2, 3) and (1, –2) are the vertices of a rhombus.
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Solution
Given: The points A(–4, –3), B(–3, 2), C(2, 3) and D(1, –2).
To Prove: A, B, C, D are the vertices of a rhombus.
Proof [Step-wise]:
1. Label the points: A(–4, –3), B(–3, 2), C(2, 3), D(1, –2).
2. Compute the vectors for the four sides:
AB = B – A
= (–3 – (–4), 2 – (–3))
= (1, 5)
BC = C – B
= (2 – (–3), 3 – 2)
= (5, 1)
CD = D – C
= (1 – 2, –2 – 3)
= (–1, –5)
DA = A – D
= (–4 – 1, –3 – (–2))
= (–5, –1)
3. Compute squared lengths of the sides to avoid square roots:
|AB|2 = 12 + 52
= 1 + 25
= 26
|BC|2 = 52 + 12
= 25 + 1
= 26
|CD|2 = (–1)2 + (–5)2
= 1 + 25
= 26
|DA|2 = (–5)2 + (−1)2
= 25 + 1
= 26
Thus, |AB| = |BC| = |CD| = |DA| all sides are equal.
4. Show opposite sides are parallel so the quadrilateral is a parallelogram:
AB = (1, 5) and CD = (–1, –5) = –AB, so AB || CD and AB = CD in length.
BC = (5, 1) and DA = (–5, –1) = –BC, so BC || DA and BC = DA in length.
Hence, opposite sides are equal and parallel, so ABCD is a parallelogram.
5. Combine the facts:
ABCD is a parallelogram with opposite sides parallel.
All four sides are equal from step 3.
A parallelogram with all sides equal is, by definition, a rhombus.
Diagonals are perpendicular:
AC = C – A
= (6, 6)
BD = D – B
= (4, –4)
AC · BD = 6·4 + 6·(–4)
= 0
So, diagonals are perpendicular, a property consistent with a rhombus.
Since all four sides are equal and opposite sides are parallel, ABCD is a rhombus.
