If you have six sopranos and eight baritones, you have fourteen musicians in total.
The number of possible quartets that you can get with 14 musician is:
[tex]14C4= \frac{14!}{4!(14-4)!} [/tex]
[tex]14C4= \frac{14!}{(4!)(10!)} [/tex]
[tex]14C4=1001[/tex]
Now, the number of possible quartets without a soprano that you can have is:
[tex]8C4= \frac{8!}{4!(8-4)!} [/tex]
[tex]8C4= \frac{8!}{(4!)(4!)} [/tex]
[tex]8C4=70[/tex]
Therefore, the number of quarters that contains at list one soprano will be the number of possible quarters minus the number of quarters without a soprano:
[tex]1001-70=931[/tex]
We can conclude that the director can choose a quarter which contains at least one soprano in 931 ways.
