The probability that Roger wins a tennis tournament (event A) is 0.45, and the probability that Stephan wins the tournament (event B) is 0.40. The probability of Roger winning the tournament, given that Stephan wins, is 0. The probability of Stephan winning the tournament, given that Roger wins, is 0. Given this information, which statement is true?

1. Events A and B are independent because P (A|B) = P (A).

2. Events A and B are independent because P (A|B) ≠ P (A).

3. Events A and B are not independent because P (A|B) ≠ P (A).

4. Events A and B are not independent because P (A|B) = P (A).

Question

Lilyana Colon

Mathematics

11 February, 21:02

The probability that Roger wins a tennis tournament (event A) is 0.45, and the probability that Stephan wins the tournament (event B) is 0.40. The probability of Roger winning the tournament, given that Stephan wins, is 0. The probability of Stephan winning the tournament, given that Roger wins, is 0. Given this information, which statement is true?

1. Events A and B are independent because P (A|B) = P (A).

2. Events A and B are independent because P (A|B) ≠ P (A).

3. Events A and B are not independent because P (A|B) ≠ P (A).

4. Events A and B are not independent because P (A|B) = P (A).

+4

Answers (1)

Know the Answer?

Haiden Davis · Answer 1

So assuming that this is the same turnament

the results are dependent of each other

I'm not sure about the P (A|B) not equal to P (A) part

but the answer is either 3 or 4