Question
88% of the couples, at least one is working. In 20% of the couples with the woman not working, the man is also does not work. In 40% of the couple the man is not working, the women also doesn’t work, what’s the probability that both the man and women aren’t working? 88% of the couples, at least one is working. In 20% of the couples with the woman not working, the man is also does not work. In 40% of the couple the man is not working, the women also doesn’t work, what’s the probability that both the man and women aren’t working?
Explanation / Answer
88% of the couples, at least one is working. In 20% of the couples with the woman not working, the man is also does not work. In 40% of the couple the man is not working, the women also doesn’t work, what’s the probability that both the man and women aren’t working? 88% of the couples, at least one is working. In 20% of the couples with the woman not working, the man is also does not work. In 40% of the couple the man is not working, the women also doesn’t work, what’s the probability that both the man and women aren’t working?