If A and B are any two events associated with random experiment, then by the definition of probability, which of following is true? (i) P(A ∪ B)= Sigma P(ωi) ∀ ωi ∈ A ∪ B (ii) P(A)+P(B)=P(A ∪ B)+P(A ∩ B)

Question

If A and B are any two events associated with random experiment, then by the definition of probability, which of following is true? (i) P(A ∪ B)= Sigma P(ωi) ∀ ωi ∈ A ∪ B (ii) P(A)+P(B)=P(A ∪ B)+P(A ∩ B) (A) Only (i) (B) Only (ii) (C) Both (i) and (ii) (D) None of these

Tardigrade Admin · Accepted Answer

In general, if A and B are any two events associated with a random experiment, then by the definition of probability of an event, we have P(A ∪ B)= Sigma P(ωi), ∀ ωi ∈ A ∪ B Since, A ∪ B=(A-B) ∪(A ∩ B) ∪(B-A), We have P(A ∪ B) =[ Sigma P(ωi) ∀ ωi ∈(A-B)]+[ Sigma P(ωi)∀ ωi ∈ A ∩ B] +[ Sigma P(ωi) ∀ ωi ∈ B-A] (because A-B, A ∩ B and B-A are mutually exclusive) .....(i) Also, P(A)+P(B)=[ Sigma p(ωi) ∀ ωi ∈ A]+[ Sigma P(ωi) ∀ ωi ∈ B] =[ Sigma P(ωi) ∀ ωi ∈(A-B) ∪(A ∩ B)]+ [ Sigma P(ωi) ∀ ωi ∈(B-A) ∪(A ∩ B)] =[ Sigma P(ωi) ∀ ωi ∈(A-B)]+[ Sigma P(ωi) ∀ ωi ∈(A ∩ B)]+ [ Sigma P(ωt) ∀ ωl ∈(B-A)]+[ Sigma P(ωl) ∀ ωl ∈(A ∩ B)] =P(A ∪ B)+[ Sigma P(ωi) ∀ ωi ∈ A ∩ B] [using Eq. (i) ] =P(A ∪ B)+P(A ∩ B) Hence, P(A)+P(B)=P(A ∪ B)+P(A ∩ B)

Q. If A and B are any two events associated with random experiment, then by the definition of probability, which of following is true? (i) P(A∪B)=ΣP(ωi​)∀ωi​∈A∪B (ii) P(A)+P(B)=P(A∪B)+P(A∩B)

Only (i)

Only (ii)

Both (i) and (ii)

None of these

Q. If $A$ and $B$ are any two events associated with random experiment, then by the definition of probability, which of following is true?
(i) $P (A \cup B) = Σ P (ω_{i}) \forall ω_{i} \in A \cup B$
(ii) $P (A) + P (B) = P (A \cup B) + P (A \cap B)$