A rectangle has diagonal √41 cm and area 20 cm². What is its perimeter?
Aptitude
Area
Difficulty: Medium
Choose an option
-
A18 cm
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B16 cm
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C20 cm
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D22 cm
Answer
Correct Answer: 18 cm
Explanation
Problem restatementGiven diagonal d and area A of a rectangle with sides a and b, find the perimeter 2(a + b).
Given data
- a2 + b2 = d2 = 41
- ab = 20
Concept/ApproachUse (a + b)2 = a2 + b2 + 2ab to find a + b directly without solving for a and b separately.
Step-by-Step calculation(a + b)2 = 41 + 2(20) = 81a + b = 9Perimeter = 2(a + b) = 18 cm
Verification/AlternativeIf a and b are roots of t2 − 9t + 20 = 0 ⇒ (t − 4)(t − 5) = 0 ⇒ sides 4 and 5 cm. Perimeter = 2(4 + 5) = 18 cm.
Common pitfallsAttempting to use Pythagoras directly to find one side without leveraging the area; the symmetric identity is faster.
Final Answer18 cm