Answer:
(a)262144
(b)68719476736
(c)[tex]4.72*10^{21}[/tex]
(d)4096
(e)343
Step-by-step explanation:
Since there are 8 kinds of bagels, at each bagels we have 8 different ways to pick a bagels. With n bagels there would be [tex]8^n[/tex] ways to choose bagels.
(a) there are [tex]8^6 = 262144[/tex] ways
(b) there are [tex]8^{12} = 68719476736[/tex] ways
(c) there are [tex]8^{24} \approx 4.72*10^{21}[/tex]ways
(d) A dozen bagels with at least 1 of each kind would lock down the first 8 bagels to exactly be one of each kind, the rest (12 - 8 = 4 bagels) you can freely choose any of the 8
So there are [tex]8^4 = 4096[/tex] ways
(e) A dozen with at least 3 egg bagels and at most 2 salty bagels would lock down the first 5 bagels to be that. Furthermore, of the rest (8 - 5 = 3 bagels) you can only have 7 option each.
So there are[tex]7^3 = 343[/tex] ways
