Discrete Probability Distributions/Binomial Distributions Question 16 Surgery Success

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A sergical technique is performed on seven patients.  You are told there is a 70% chance of success.  To three significant digits, find the probability that the surgery is successful for:

  1. exactly five patients.
    {#1}

  2. at least five patients.
    {#2}

  3. less than five patients.
    {#3}
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