Answer:
Step-by-step explanation:
To find the probability of a certain set, we must add the probability of the points that are contained in the specific set.
a) P(A): Add the probability of 1,3,5. That is P(1)+P(3)+P(5) = 0.5
b) [tex]P(A\cap B)[/tex]. This set has no points in it, so its probability is 0.
c) P(A\cup B \cup C): Add the probability of 1,2,3,4,5,6. So, it is 1.
d) [tex]P(C^c) = 1- P(C) [/tex]. P(C) is the probability by summing 5,6,2 so P(C) = 0.5. So [tex] P(C^c)=0.5[/tex]
e) [tex]P(A\cap C^c)[/tex] That is, all the points that are in A but not in C. So add 1,3. Then the probability is 0.4
e')[tex] P(B|A) = \frac{P(A\cap B )}{P(A)}=\frac{0}{0.5}=0[/tex], using the definition of conditional probabily and results a,b.
f) Two events are mutually exlusive if the probability of their intersection is 0. In this case A and C are not mutually exclusive, since [tex] P(A\cap C)[/tex] is the probability of 5, that is 0.1. Since 0.1>0, they are not mutually exclusive.
