Answer with Step-by-step explanation:
The condition that at least 2 women are included is satisfied in the below cases:
Case 1) Exactly 2 women included
Thus the total number of ways to select the committee is
[tex]N_1=\binom{12}{2}\times \binom{10}{2}=2970[/tex]
Case 2) Exactly 3 women included
Thus the total number of ways to select the committee is
[tex]N_2=\binom{12}{3}\times \binom{10}{1}=2200[/tex]
Case 3) Exactly 4 women are included
Thus the total number of ways to select the committee is
[tex]N_3=\binom{12}{4}\times \binom{10}{0}=495[/tex]
Thus the total number of commitees possible are
[tex]N_1+N_2+N_3=2970+2200+495=5665[/tex]
Part 2)
If Mr and Mrs Simith are not to be both included then in that case the number of ways are the sum of
1) All cases of Mr Smith included and Mrs smith excluded
[tex]N_4=\binom{11}{2}\binom{10}{2}+\binom{11}{3}\binom{10}{1}+\binom{11}{4}\binom{10}{0}\\\\N_4=4455[/tex]
2) Mrs smith included and Mr Smith Included
[tex]N_5=\binom{11}{1}\binom{9}{2}+\binom{11}{2}\binom{9}{1}+\binom{11}{3}\binom{9}{0}\\\\N_5=1056[/tex]
Thus the cases are [tex]N_4+N_5=5511[/tex]
