Let P(E) = 0.28, P(E∩F) = 0.17, and P(E U Fc) = 0.88. Find P(F|Ec).
Let P(E) = 0.28, P(EF) = 0.17, and P(EFc) = 0.88. Find P(F|Ec). ) 0.6071 b) 0.1667 c) 0.2361 d) 0.5862 e) 0.4286 f) None of the above.
Let P(E) = 0.28, P(EF) = 0.13, and P(EFc) = 0.82. Find P(F|Ec)
FInd the probability P(Ec) if P(E)=0.28
Given P(Ec ) = 0.43, P(F) = 0.52, and P(EF) = 0.18. Find P( E | Fc ). a) 0.8125 b) 0.7500 c) 0.5342 d) 0.9069 e) 0.3461 f) None of the above.
if E and F are independent events, find P(F) if P(E)=0.2 and P(E U F)= 0.3
FC 1. Determine the algebra generated by {E, F). Let EFC 22. De Let N = 0 – 0,1 n Q, and suppose D consists of all subsets of 12 of 0, a form (a, b) n Q. Show that AD) = P(92).
Let P(F) = 0.29, P(E intersection F) = 0.12, & P(F Union E^c)=.82, Find PE|F^c).
Let E and F be events for which P(E) = .5, P(F)= .4, and P(E F) = .2 a) are E and F mutually exclusive or independent? (justify mathematically) b) Find P(E F) c) Find P(F') d) Find P(F l E) e) Find P(E' F) We were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this image
5. Suppose E, F, and G are three disjoint events where P(E)- .15, P(F)- .25, and P(G).60. Find the following: (a) P(F or G) (b) P(Ec) (c) P((E or F)c) (d) P(FnG) 6. A new diagnostic test for a disease is studied. It is known whether or not these 100 individuals have the disease and the diagnostic test is administered. The results are as follows infectedhealthy tested positive tested negative 40 10 45 Let E-randomly selected person is infected and...
If A and B are mutually exclusive, with P(A) = 0.33, and P(B) = 0.28, find (a)P(Ac), (b)P(Bc), (c)P(A∪B), (d)P(A∩B), (e)P(Ac∩B), (f)P(Ac|Bc).