Respuesta :
Answer:
If you test positive, the approximate probability that you will actually develop schizophrenia is 16.10%.
Step-by-step explanation:
We have these following probabilities:
A 1% probability of having Schizophrenia.
A 99% of not having Schizophrenia.
If a person has Schizophrenia, a 95% probability of testing positive.
If a person does not have Schizophrenia, a 5% probability of testing positive.
What is the approximate probability that you will actually develop schizophrenia?
This can be formulated as the following problem:
What is the probability of B happening, knowing that A has happened.
It can be calculated by the following formula
[tex]P = \frac{P(B).P(A/B)}{P(A)}[/tex]
Where P(B) is the probability of B happening, P(A/B) is the probability of A happening knowing that B happened and P(A) is the probability of A happening.
So:
What is the probability of you developing schizophrenia, given that you tested positive?
P(B) is the probability of the person having the disease. So [tex]P(B) = 0.01[/tex]
P(A/B) is the probability of the person being diagnosticated, given that she has the disease. So [tex]P(A/B) = 0.95[/tex].
P(A) is the probability of the person being diagnosticated. That is 95% of 1% and 5% of 99%. So
[tex]P(A) = 0.01(0.95) + 0.99(0.05) = 0.059[/tex]
Finally
[tex]P = \frac{P(B).P(A/B)}{P(A)} = \frac{0.01*0.95}{0.059} = 0.1610[/tex]
If you test positive, the approximate probability that you will actually develop schizophrenia is 16.10%.
Using the Naive Bayes rule ; the probability that a tested person actually develops schizophrenia given that test result comes back positive is 0.161
Naive Bayes rule :
- [tex]P(A|B) = \frac{P(B|A) * P(A)}{P(B)}[/tex]
- P(A|B) = P of A being True given that B is True
- P(A) = probability of A
- P(B|A) = P of B bring true given that A is True
- P(B) = probability of B
Let :
- P(A) = Probability of Schizophrenia = 1% = 0.01
- P(B) = probability of True positive result
- P(A|B) =?
- P(B|A) = P of positive result given person has schizophrenia = 95% = 0.95
The probability of obtaining a positive result :
P(B) = [P(B|A) × P(A)] + [P(B|A)' × P(A)']
P(B) = (0.95 × 0.01) + (0.05 × 0.99)
P(B) = 0.059
Hence,
[tex]P(A|B) = \frac{0.95 \times 0.01}{0.059} = \frac{0.0095}{0.059} = 0.161[/tex]
Therefore, the probability of schizophrenia given a true positive result is 0.161
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