246,213 views
21 votes
21 votes
how many ways are there to stack an ice cream cone with 4 scoops if the choices are:a. cherry, chocolate mint, lemon, black walnut, vanilla and salted caramel and EACH SCOOP MUST BE DIFFERENT?b. cherry, chocolate mint, lemon, black walnut, vanilla and salted caramel and NO RESTRICTIONS ON DIFFERENT FLAVORS?

User Amesha
by
3.1k points

1 Answer

17 votes
17 votes

different flavorsThe problem involves the use of permutation and combination equations to solve the number of ways to stack an ice cream cone with 4 scoops.

a. For the first case, we have six scoops available. The problem wants that each scoop must be different. Hence, we will use the permutation equation here to solve the problem.


P(n,r)=(n!)/((n-r)!)

There are six available scoops, which means n = 6. The ice cream cone can only take 4 scoops, hence, r = 4. Substitute these in the equation above and solve, we get


P(n,r)=(6!)/((6-4)!)=360

Hence, there can be 360 ways to stack an ice cream cone if each scoop is different.

b. For the second case, no restrictions are made on different flavors. This means that the flavor can be repeated in this scenario. If the limit of the scope in this problem is 4, and we have 6 different flavors. We have


C=6^4^{}=1296

There are 1296 possible combinations that can be done if we don't have any restrictions on a different flavors.

User Buzali
by
2.4k points