Respuesta :
Answer: The required number of ways is 46200.
Step-by-step explanation: Given that a catering service offers 8 appetizers, 11 main courses, and 7 desserts.
A banquet committee is to select 7 appetizers, 8 main courses, and 4 desserts.
We are to find the number of ways in which this can be done.
We know that
From n different things, we can choose r things at a time in [tex]^nC_r[/tex] ways.
So,
the number of ways in which 7 appetizers can be chosen from 8 appetizers is
[tex]n_1=^8C_7=\dfrac{8!}{7!(8-7)!}=\dfrac{8\times7!}{7!\times1}=8,[/tex]
the number of ways in which 8 main courses can be chosen from 11 main courses is
[tex]n_2=^{11}C_8=\dfrac{11!}{8!(11-8)!}=\dfrac{11\times10\times9\times8!}{8!\times3\times2\times1}=165[/tex]
and the number of ways in which 4 desserts can be chosen from 7 desserts is
[tex]n_3=^7C_4=\dfrac{7!}{4!(7-4)!}=\dfrac{7\times6\times5\times4!}{4!\times3\times2\times1}=35.[/tex]
Therefore, the number of ways in which the banquet committee is to select 7 appetizers, 8 main courses, and 4 desserts is given by
[tex]n=n_1\times n_2\times n_3=8\times165\times35=46200.[/tex]
Thus, the required number of ways is 46200.
