To address the problem, we need to verify each option based on the given conditions and probability rules:
Given:
1.
P(A∕B)=‌2.
P(B∕A)=‌3.
P(A∩B)=‌We start by recalling that conditional probability is defined as:
‌P(A∕B)=‌‌P(B∕A)=‌=‌Now we'll use the given values to find
P(A) and
P(B).
From
P(A∕B)=‌ ‌‌=‌‌‌=‌‌P(B)=‌=‌ From
P(B∕A)=‌ :
‌‌=‌‌‌=‌‌P(A)=‌=‌ Next, we will use these probabilities to check each option.
Option
A:A and B are not independent
Events
A and
B are independent if:
‌P(A∩B)=P(A)P(B)‌P(A)P(B)=‌⋅‌=‌ Since this equals
P(A∩B), A and B are actually independent, making Option A false. Therefore, Option A is not true.
Option B:
P(A∪B)=‌Using the formula for the union of two events:
Therefore, Option B is true.
Option C:
P(A′∩B)=‌This requires calculating
P(A′∩B) :
‌P(A′∩B)=P(B)−P(A∩B)‌P(A′∩B)=‌−‌=‌−‌=‌So, Option C is true.
Option D:
A and
B are independent
As we established earlier,
A and
B are independent because
P(A∩B)=P(A)P(B). Thus, Option D is also true.
In summary, the option that is not true is:
Option
A:A and B are not independent.