Before you turn on a nuclear power plant, it is subjected to a first roundstructure of three independent tests. Each test has a probability of failure p. Followingperforming these tests
If all three tests fail, then we refuse its application function;
If one or both tests fail, then again the three tests;
If we get three wins, then a second run is performed three testssecurity.
The three tests of the second round are also independent and each a probabilityfailure (p*M). Following the implementation of the second test round
If we get three wins, then it authorizes the function of the plant;
If one or both tests fail, then we start the second round of tests;
If all three tests fail, then we start the procedure in the first inningtests.
There is N nuclear power plants to be commissioned. What is the maximum valuep so that the probability of accepting at least central L is greater than W?
Im trying to do te combination, but te fact that there is 2 rounds of tests makes it too hard for me to understand
If all three tests fail, then we refuse its application function;
If one or both tests fail, then again the three tests;
If we get three wins, then a second run is performed three testssecurity.
The three tests of the second round are also independent and each a probabilityfailure (p*M). Following the implementation of the second test round
If we get three wins, then it authorizes the function of the plant;
If one or both tests fail, then we start the second round of tests;
If all three tests fail, then we start the procedure in the first inningtests.
There is N nuclear power plants to be commissioned. What is the maximum valuep so that the probability of accepting at least central L is greater than W?
Im trying to do te combination, but te fact that there is 2 rounds of tests makes it too hard for me to understand
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