Uppose you have 6 different math books and 5 different english books.
a.in how many different ways, 4 math books and 3 english books can be arranged on a bookshelf?clearly describe how you arrived at your answer.

Respuesta :

a) 4 different math books and 3 different English books can be arranged in

[tex] (4+3)!=7!=5040 [/tex] ways. This is because all the books are different.

But if you choose 4 math books from 6 different math books and 3 English books from 5 different English books, the number ways of arranging on the shelf is

[tex] C(6,4)*C(5,3)*(4+3)!=\frac{6!}{4!2!} \frac{5!}{3!2!} 7!=756,000 [/tex]

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