Respuesta :
Answer:
The probability that no one sits in the same seat on both days of that week is given by, [tex]P(\cap^{20}_{i=1}A_i^c)=\frac{1}{e}[/tex]
Step-by-step explanation:
Given : A certain class has 20 students, and meets on Mondays and Wednesdays in a classroom with exactly 20 seats. In a certain week, everyone in the class attend both days. On both days, the students choose their seats completely randomly (with one student per seat).
To find : The probability that no one sits in the same seat on both days of that week ?
Solution :
Let [tex]A_i[/tex] be the i-th student sits on seat which he has been sitting on Monday.
According to question,
We have to calculate [tex]P(\cap^{20}_{i=1}A_i^c)[/tex]
Applying inclusion exclusion formula,
[tex]P(\cap^{20}_{i=1}A_i^c)=1-P(\cap^{4}_{i=1}A_i)[/tex]
[tex]P(\cap^{20}_{i=1}A_i^c)=1-P(A_1)+...+P(A_{20})-P(A_1\cap A_2)+...+P(A_{19}\cap A_{20})+P(A_1\cap A_2\cap A_3)+...+P(A_{18}\cap A_{19}\cap A_{20})....-P(A_1\cap A_2...\cap A_{20})[/tex]
Using symmetry,
[tex]P(\cap^{20}_{i=1}A_i^c)=1-\sum^{20}_{k=1}(-1)^{k+1}\binom{20}{k}P(A_1\cap ...\cap A_k)[/tex]
[tex]P(\cap^{20}_{i=1}A_i^c)=1-\sum^{20}_{k=1}(-1)^{k+1}\binom{20}{k}\frac{(20-k)!}{20!}[/tex]
[tex]P(\cap^{20}_{i=1}A_i^c)=1+\sum^{20}_{k=1}(-1)^{k}\frac{1}{k!}[/tex]
[tex]P(\cap^{20}_{i=1}A_i^c)=\sum^{20}_{k=0}(-1)^{k}\frac{1}{k!}[/tex]
[tex]P(\cap^{20}_{i=1}A_i^c)=\frac{1}{e}[/tex]
Therefore, The probability that no one sits in the same seat on both days of that week is given by, [tex]P(\cap^{20}_{i=1}A_i^c)=\frac{1}{e}[/tex]
