juantheron
Active Member
- Joined
- Feb 9, 2012
- Messages
- 259
- Gender
- Male
- HSC
- N/A
-
Looking for HSC notes and resources? Check out our Notes & Resources page
Probability Question (1 Viewer)
- Thread starter juantheron
- Start date
pikachu975
Premium Member
Re: Probability
The desired event can be achieved through getting 1 machine in each test, or 0 machines first test and 2 machines in second test.
P(only 2 tests) = P(1 machine then 1 machine) + P(0 machines then 2 machines)
= 1/4 x 1/3 + 2/4 x 2/4
= 1/3
The desired event can be achieved through getting 1 machine in each test, or 0 machines first test and 2 machines in second test.
P(only 2 tests) = P(1 machine then 1 machine) + P(0 machines then 2 machines)
= 1/4 x 1/3 + 2/4 x 2/4
= 1/3
Re: Probability
The event "0 machines then 2 machines" is 3 tests.
P(1 machine then 1 machine) = 2/4 x 1/3, because there is a 2/4 chance of identifying the faulty machine with 1 test.
The event "0 machines then 2 machines" is 3 tests.
pikachu975
Premium Member
Re: Probability
Nevermind misinterpreted the question, 1/6 seems right after re-reading.
Re: Probability
The answer should be 1/3 for the version with 4 machines. P (both first two tests reveal faulty machines) = 1/6 as established by earlier posts. Note that we can also identify which two machines are faulty by also having the two tests reveal non faulty machines, meaning that the untested machines must both be faulty. The probability of this occurring is, by symmetry, 1/6. So the total probability that only 2 tests are needed is 1/6 + 1/6 = 1/3.
The answer should be 1/3 for the version with 4 machines. P (both first two tests reveal faulty machines) = 1/6 as established by earlier posts. Note that we can also identify which two machines are faulty by also having the two tests reveal non faulty machines, meaning that the untested machines must both be faulty. The probability of this occurring is, by symmetry, 1/6. So the total probability that only 2 tests are needed is 1/6 + 1/6 = 1/3.