Chapter 3 3.2 Independent and Mutually Exclusive Events 40. E and Fare mutually exclusive events. P(E)-0.4;...
3.2 Independent and Mutually Exclusive Events 40. E and Fare mutually exclusive events. P(E) = 0.4; P(F) = 0.5. Find P(E|F)41. J and K are independent events. P(J|K) = 0.3. Find P(J) 42. U and V are mutually exclusive events. P(U) = 0.26: P(V) = 0.37. Find:a. P(U AND V) =a. P(U|V) =a. P(U OR V) =43. Q and Rare independent events P(Q) = 0.4 and P(Q AND R) = 0.1. Find P(R)
For mutually exclusive events Ry, Ry, and Rz, we have P(R1) = 0.05, P(R2) = 0.6, and P(R3) = 0.35. Also, P(Q|R4) = 0.4, P(Q|R2) = 0.5, and P(Q|R3) = 0.8. Find P(R4 IQ). P(R4 | Q)= (Simplify your answer. Type an integer or a fraction.)
+ -/1.81 points IllowskylntroStat1 3.PR.043. Q and R are independent events. P(Q) = 0.4; P(Q AND R) = 0.12. Find P(R). P(R) - Submit Answer View Previous Qu
6. -11.81 points IllowskylntroStat1 3.PR.043. Q and R are independent events. P(Q) = 0.4; P(Q AND R) = 0.12. Find PCR P(R) = Submit Answer View Previou Home
tnis p your answer sheets 1. A single card is drawn from 52-card deck (10) Let A denotes the event that the card is red and B denotes the e is spade. Are the events being? a) Mutually exclusive? b) Dependent? What is your conclusion and B? Any exception? 2. Two team (A and B) play a series of baseball games. The team who v five-game-series wins the series. Consider A has home-field advantag probability of winning 0.7 if it...