Answer:
From both approaches P(F or G)=0.667
Step-by-step explanation:
P(F or G)=?
F={9, 10, 11, 12, 13}
G={13,14,15,16}
Finding P(F or G) by counting outcomes in F or G
F or G={9, 10, 11, 12, 13}or {13,14,15,16}
F or G={9, 10, 11, 12,13,14,15,16}
number of outcomes in F or G=n(F or G)=8
S={9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19, 20}
number of outcomes in S=n(S)=12
P(F or G)=n(F or G)/n(S)
P(F or G)=8/12
P(F or G)=0.667
Finding P(F or G) by addition rule
P(F or G)=P(F)+P(G)-P(F and G)
F={9, 10, 11, 12, 13}
number of outcomes in F=n(F)=5
P(F)=n(F)/n(S)
P(F)=5/12
P(F)=0.417
G={13,14,15,16}
number of outcomes in G=n(G)=4
P(G)=n(G)/n(S)
P(G)=4/12
P(G)=0.333
F and G={9, 10, 11, 12, 13}and {13,14,15,16}
F and G={13}
number of outcomes in F and G=n(F and G)=1
P(F and G)=n(F and G)/n(S)
P(F and G)=1/12
P(F and G)=0.083
P(F or G)=P(F)+P(G)-P(F and G)
P(F or G)=0.417+0.333-0.083
P(F or G)=0.667
Answer:
8/12
Step by step explanation:
The outcomes are the elements in the sample space S={9,10,11,12,13,14,15,16,17,18,19,20}
There are 12 outcomes in this sample space. Since each outcome is equally likely (has equal chance of occurring) then each outcome's probability is 1/12.
(A) the list of outcomes in (F or G) are: (F or G) ={9,10,11,12,13,14,15,16}
(B) P(F or G) = P{9,10,11,...,16}
By counting the number of outcomes in (F or G), P(F or G)=8/12
as there are 8 outcomes in (F or G) and 12 total outcomes in the sample space.
(C) Using addition rule,
P(F or G) = P(F) + P(G) - P(F and G)
P(F) = (1/12 for the outcome 9) + (1/12 for the outcome 10) + (1/12 for the outcome 11) + (1/12 for the outcome 12) + (1/12 for the outcome 13)
P(F) = 5/12
P(G) = 4/12
P(F and G) = probability of having the outcome '13' = 1/12
P(F or G) = 5/12 + 4/12 - 1/12 = 8/12.
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