Answer: 0.0578
Step-by-step explanation:
Given : Number of chairs = 20
Number of chairs made for lefties =8
Number of chairs made for righties= 20-8=12
Now, total number of way for selecting 5 chairs from 20 =[tex]^{20}C_5=\dfrac{20!}{5!(20-5)!}[/tex]
[tex]=\dfrac{20\times19\times18\times17\times16\times15!}{(120)15!}=15504[/tex]
[tex][\because\ ^nC_r=\dfrac{n!}{r!(n-r)!}][/tex]
Number of ways to select at least 4 seats for lefies :-
[tex]^8C_4\times^{12}C_1+^8C_5\times ^{12}C_0\\\\=\dfrac{8!}{4!4!}\cdot12+\dfrac{8!}{5!3!}(1)=896[/tex]
Now, the probability that at least 4 of those selected will be seats for lefties :-
[tex]\dfrac{896}{15504}=0.0577915376677\approx0.0578[/tex]
hence, the required probability = 0.0578
