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Let the family members be M (Mother), F (Father), and S (Son). The total number of ways to arrange 3 people in a line is $3! = 6$. The sample space $S$ is: {MFS, MSF, FMS, FSM, SMF, SFM}. Thus, $n(S) = 6$.
Event F is defined as 'Father in the middle'. The arrangements satisfying this are {MFS, SFM}. Thus, $n(F) = 2$. The probability $P(F) = \frac{2}{6} = \frac{1}{3}$.
Event E is 'Son on one end'. The intersection $E \cap F$ represents 'Father in the middle AND Son on one end'. Looking at the set F = {MFS, SFM}, both outcomes satisfy the condition of the Son being at one end. Thus, $E \cap F = \{MFS, SFM\}$, and $n(E \cap F) = 2$.
Using the formula $P(E/F) = \frac{P(E \cap F)}{P(F)}$, we substitute the values: $$P(E/F) = \frac{2/6}{2/6} = 1$$
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