One pipe fills a tank three times as fast as another. Together they fill in 36 minutes. How long will the slower pipe take alone?

Aptitude Pipes and Cistern Difficulty: Easy
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Answer

Correct Answer: 144 minutes

Explanation

Problem restatementTwo pipes have rates in the ratio 1 : 3 (slower : faster). Together they fill in 36 minutes. Find the slower pipe's solo time.

Given data

  • Let slower rate = r tank/min; faster rate = 3r tank/min.
  • Together rate = 1/36 tank/min.

Concept/ApproachAdd rates to match the combined fill rate, then invert to get time.

Step-by-step calculation r + 3r = 4r = 1/36 ⇒ r = 1/144 tank/min Slower's time = 1 ÷ r = 144 minutes

Verification/AlternativeFaster time = 1 ÷ (3r) = 48 min; check: 1/144 + 1/48 = (1 + 3)/144 = 4/144 = 1/36 (ok).

Final Answer144 minutes

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