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NO.PZ2021062201000001 问题如下 ElorenHixon is screening a set of 100 stocks baseon two criteria (Criterion1 anCriterion 2). She set the passing level suth50% of the stocks passeeascreen. For these stocks, the values for Criterion 1 anCriterion 2 are not inpennt but are positively relate How many stocks shoulpass Hixon's two screens? A.Less th25 B.25 C.More th25 C is correct. Let event A a stopassing the first screen (Criterion 1) anevent B a stopassing the seconscreen (Criterion 2). The probability of passing eascreen is P(= 0.50 anP(= 0.50. If the two criteria are inpennt, the joint probability of passing both screens is P(A=P(A)P(B)=0.50 × 0.50 = 0.25, so 25 out of 100 stocks woulpass both screens. However the two criteria are positively relate anP(A≠ 0.25. Using the multiplication rule for probabilities, the joint probability of A anB is P(A= P(A I P(B). If the two criteria are not inpennt, anif P(= 0.50, then the contingent probability of P(A | is greater th0.50. So the joint probability of P(AB)=P(A | P(is greater th0.25. More th25 stocks shoulpass the two screens.知识点Probability Concepts 独立事件不是互斥事件，所以P(AorB)=P(A)+P(B)-P(AB),P(AB)是＞0，那么这个数算出来不是应该小于25%？

NO.PZ2021062201000001问题如下 ElorenHixon is screening a set of 100 stocks baseon two criteria (Criterion1 anCriterion 2). She set the passing level suth50% of the stocks passeeascreen. For these stocks, the values for Criterion 1 anCriterion 2 are not inpennt but are positively relate How many stocks shoulpass Hixon's two screens? A.Less th25B.25C.More th25 C is correct. Let event A a stopassing the first screen (Criterion 1) anevent B a stopassing the seconscreen (Criterion 2). The probability of passing eascreen is P(= 0.50 anP(= 0.50. If the two criteria are inpennt, the joint probability of passing both screens is P(A=P(A)P(B)=0.50 × 0.50 = 0.25, so 25 out of 100 stocks woulpass both screens. However the two criteria are positively relate anP(A≠ 0.25. Using the multiplication rule for probabilities, the joint probability of A anB is P(A= P(A I P(B). If the two criteria are not inpennt, anif P(= 0.50, then the contingent probability of P(A | is greater th0.50. So the joint probability of P(AB)=P(A | P(is greater th0.25. More th25 stocks shoulpass the two screens.知识点Probability Concepts 看不懂题，能翻译一下问题和答案吗？谢谢

NO.PZ2021062201000001 问题如下 ElorenHixon is screening a set of 100 stocks baseon two criteria (Criterion1 anCriterion 2). She set the passing level suth50% of the stocks passeeascreen. For these stocks, the values for Criterion 1 anCriterion 2 are not inpennt but are positively relate How many stocks shoulpass Hixon's two screens? A.Less th25 B.25 C.More th25 C is correct. Let event A a stopassing the first screen (Criterion 1) anevent B a stopassing the seconscreen (Criterion 2). The probability of passing eascreen is P(= 0.50 anP(= 0.50. If the two criteria are inpennt, the joint probability of passing both screens is P(A=P(A)P(B)=0.50 × 0.50 = 0.25, so 25 out of 100 stocks woulpass both screens. However the two criteria are positively relate anP(A≠ 0.25. Using the multiplication rule for probabilities, the joint probability of A anB is P(A= P(A I P(B). If the two criteria are not inpennt, anif P(= 0.50, then the contingent probability of P(A | is greater th0.50. So the joint probability of P(AB)=P(A | P(is greater th0.25. More th25 stocks shoulpass the two screens.知识点Probability Concepts 老师，我想请问下，正相关的情况下，是不是这样的情况都是大于，可以记个结论？谢谢

NO.PZ2021062201000001 问题如下 ElorenHixon is screening a set of 100 stocks baseon two criteria (Criterion1 anCriterion 2). She set the passing level suth50% of the stocks passeeascreen. For these stocks, the values for Criterion 1 anCriterion 2 are not inpennt but are positively relate How many stocks shoulpass Hixon's two screens? A.Less th25 B.25 C.More th25 C is correct. Let event A a stopassing the first screen (Criterion 1) anevent B a stopassing the seconscreen (Criterion 2). The probability of passing eascreen is P(= 0.50 anP(= 0.50. If the two criteria are inpennt, the joint probability of passing both screens is P(A=P(A)P(B)=0.50 × 0.50 = 0.25, so 25 out of 100 stocks woulpass both screens. However the two criteria are positively relate anP(A≠ 0.25. Using the multiplication rule for probabilities, the joint probability of A anB is P(A= P(A I P(B). If the two criteria are not inpennt, anif P(= 0.50, then the contingent probability of P(A | is greater th0.50. So the joint probability of P(AB)=P(A | P(is greater th0.25. More th25 stocks shoulpass the two screens.知识点Probability Concepts 问题如下ElorenHixon is screening a set of 100 stocks baseon two criteria (Criterion1 anCriterion 2). She set the passing level suth50% of the stocks passeeascreen. For these stocks, the values for Criterion 1 anCriterion 2 are not inpennt but are positively relate How many stocks shoulpass Hixon's two screens?A.Less th25B.25C.More th25C is correct.Let event A a stopassing the first screen (Criterion 1) anevent B a stopassing the seconscreen (Criterion 2). The probability of passing eascreen is P(= 0.50 anP(= 0.50. If the two criteria are inpennt, the joint probability of passing both screens is P(A=P(A)P(B)=0.50 × 0.50 = 0.25, so 25 out of 100 stocks woulpass both screens. However the two criteria are positively relate anP(A≠ 0.25. Using the multiplication rule for probabilities, the joint probability of A anB is P(A= P(A I P(B).If the two criteria are not inpennt, anif P(= 0.50, then the contingent probability of P(A | is greater th0.50. So the joint probability of P(AB)=P(A | P(is greater th0.25. More th25 stocks shoulpass the two screens.知识点Probability Concepts