Question:medium

A cab hire firm has two cabs, which it hires out day by day. The number of demands for cabs on each day follows a Poisson distribution with mean of 1.5. The probability of days on which neither cab is used is (Use \( e^{-1.5} = 0.2231 \)):

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The Poisson distribution is frequently used for modeling the number of arrivals or demands in a fixed interval of time.
Updated On: Jun 12, 2026
  • 0.1353
  • 0.2231
  • 0.7231
  • 0.018
Show Solution

The Correct Option is B

Solution and Explanation


Step 1: Understanding the Concept:

The Poisson probability formula is \( P(X=k) = \frac{e^{-\mu} \mu^k}{k!} \), where \( \mu = 1.5 \). "Neither cab is used" means the number of demands \( k = 0 \).

Step 2: Detailed Explanation:

\( P(X=0) = \frac{e^{-1.5} \cdot (1.5)^0}{0!} \).
Since \( (1.5)^0 = 1 \) and \( 0! = 1 \):
\( P(X=0) = e^{-1.5} \).
Given \( e^{-1.5} = 0.2231 \).

Step 3: Final Answer:

The probability is 0.2231.
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