QUESTION IMAGE
Question
which statement proves that parallelogram klmn is a rhombus?
- the midpoint of both diagonals is \\((4, 4)\\).
- the length of \\(\overline{km}\\) is \\(\sqrt{72}\\) and the length of \\(\overline{nl}\\) is \\(\sqrt{8}\\).
- the slopes of \\(\overline{lm}\\) and \\(\overline{kn}\\) are both \\(\frac{1}{2}\\) and \\(nk = ml = \sqrt{20}\\).
- the slope of \\(\overline{km}\\) is \\(1\\) and the slope of \\(\overline{nl}\\) is \\(-1\\).
<pre_analysis>
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<reasoning>
Identify the properties of a rhombus
Using the Rhombus Properties knowledge point
A rhombus is a special type of parallelogram. To prove that a given parallelogram is a rhombus, we must show that it has additional properties unique to a rhombus, such as:
- All four sides are congruent (or adjacent sides are congruent).
- The diagonals are perpendicular to each other.
Analyze the first option
Using the Midpoint Formula in Coordinate Plane knowledge point
The first option states: "The midpoint of both diagonals is \((4, 4)\)."
In any parallelogram, the diagonals bisect each other, meaning they share the same midpoint. Finding that the diagonals share a midpoint only proves that the quadrilateral is a parallelogram. It does not prove that it is a rhombus.
Analyze the second and third options
The second option states: "The length of \(\overline{KM}\) is \(\sqrt{72}\) and the length of \(\overline{NL}\) is \(\sqrt{8}\)."
Unequal diagonal lengths are true for most rhombuses, but having these specific lengths does not prove the figure is a rhombus (it could be a general parallelogram).
The third option states: "The slopes of \(\overline{LM}\) and \(\overline{KN}\) are both \(\frac{1}{2}\) and \(NK = ML = \sqrt{20}\)."
This statement shows that one pair of opposite sides is parallel and congruent, which is a property of any parallelogram, not specifically a rhombus.
Analyze the fourth option
The fourth option states: "The slope of \(\overline{KM}\) is \(1\) and the slope of \(\overline{NL}\) is \(-1\)."
The diagonals of the parallelogram are \(\overline{KM}\) and \(\overline{NL}\).
The product of their slopes is:
\[
(1) \cdot (-1) = -1
\]
Since the product of their slopes is \(-1\), the diagonals are perpendicular. A parallelogram with perpendicular diagonals is guaranteed to be a rhombus. Thus, this statement successfully proves that parallelogram \(KLMN\) is a rhombus.
</reasoning>
<answer>
<mcq-option>The midpoint of both diagonals is (4, 4).</mcq-option>
<mcq-option>The length of \(\overline{KM}\) is \(\sqrt{72}\) and the length of \(\overline{NL}\) is \(\sqrt{8}\).</mcq-option>
<mcq-option>The slopes of \(\overline{LM}\) and \(\overline{KN}\) are both \(\frac{1}{2}\) and \(NK = ML = \sqrt{20}\).</mcq-option>
<mcq-correct>The slope of \(\overline{KM}\) is 1 and the slope of \(\overline{NL}\) is -1.</mcq-correct>
</answer>
<post_analysis>
{
"subject": "Mathematics",
"question_type": "Multiple Choice",
"knowledge_point": [
"Mathematics",
"Geometry",
"Rhombus Properties"
]
}
</post_analysis>
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"concepts_used": [
"Rhombus Properties",
"Midpoint Formula in Coordinate Plane"
],
"new_concepts": [
"Rhombus Diagonal Properties",
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"Rhombus Properties",
"Midpoint Formula in Coordinate Plane",
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<reasoning>
Identify the properties of a rhombus
Using the Rhombus Properties knowledge point
A rhombus is a special type of parallelogram. To prove that a given parallelogram is a rhombus, we must show that it has additional properties unique to a rhombus, such as:
- All four sides are congruent (or adjacent sides are congruent).
- The diagonals are perpendicular to each other.
Analyze the first option
Using the Midpoint Formula in Coordinate Plane knowledge point
The first option states: "The midpoint of both diagonals is \((4, 4)\)."
In any parallelogram, the diagonals bisect each other, meaning they share the same midpoint. Finding that the diagonals share a midpoint only proves that the quadrilateral is a parallelogram. It does not prove that it is a rhombus.
Analyze the second and third options
The second option states: "The length of \(\overline{KM}\) is \(\sqrt{72}\) and the length of \(\overline{NL}\) is \(\sqrt{8}\)."
Unequal diagonal lengths are true for most rhombuses, but having these specific lengths does not prove the figure is a rhombus (it could be a general parallelogram).
The third option states: "The slopes of \(\overline{LM}\) and \(\overline{KN}\) are both \(\frac{1}{2}\) and \(NK = ML = \sqrt{20}\)."
This statement shows that one pair of opposite sides is parallel and congruent, which is a property of any parallelogram, not specifically a rhombus.
Analyze the fourth option
The fourth option states: "The slope of \(\overline{KM}\) is \(1\) and the slope of \(\overline{NL}\) is \(-1\)."
The diagonals of the parallelogram are \(\overline{KM}\) and \(\overline{NL}\).
The product of their slopes is:
\[
(1) \cdot (-1) = -1
\]
Since the product of their slopes is \(-1\), the diagonals are perpendicular. A parallelogram with perpendicular diagonals is guaranteed to be a rhombus. Thus, this statement successfully proves that parallelogram \(KLMN\) is a rhombus.
</reasoning>
<answer>
<mcq-option>The midpoint of both diagonals is (4, 4).</mcq-option>
<mcq-option>The length of \(\overline{KM}\) is \(\sqrt{72}\) and the length of \(\overline{NL}\) is \(\sqrt{8}\).</mcq-option>
<mcq-option>The slopes of \(\overline{LM}\) and \(\overline{KN}\) are both \(\frac{1}{2}\) and \(NK = ML = \sqrt{20}\).</mcq-option>
<mcq-correct>The slope of \(\overline{KM}\) is 1 and the slope of \(\overline{NL}\) is -1.</mcq-correct>
</answer>
<post_analysis>
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"question_type": "Multiple Choice",
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"Mathematics",
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