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Probability in Binomial Distribution: Calculating $P(X=0)$

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Binomial Distribution & Discrete Random Variables

Calculating the Probability of Zero Successes

The binomial distribution is a discrete probability distribution that models the number of successes in a fixed number of independent trials, each with the same probability of success. The probability of observing exactly k successes in n trials is given by the binomial probability formula:

  • Formula:

  • Where:

    • n = number of trials

    • k = number of successes

    • p = probability of success on a single trial

    • 1-p = probability of failure on a single trial

Example: Probability of Zero Successes

Suppose the probability of failure on a single trial is 0.85, and there are 10 independent trials. The probability of observing zero successes (i.e., all trials are failures) is:

Binomial probability calculation for P(X=0)

  • Interpretation: There is approximately a 19.69% chance that all 10 trials result in failure (zero successes), given the probability of failure per trial is 0.85.

Additional info: This calculation is a special case of the binomial distribution where k = 0. The binomial coefficient , so the formula simplifies to .

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