How many different menus showing 10 main courses can a restaurant make if it has 15 main courses from which to choose? 360,360 3,003 6

The number of differents menus containing 10 main courses that the restaurant can make if it has 15 main courses from which to chose is calculated through the combination: 15C10. The formula of the combination is: nCr = n! / ((r!) x(n - r)!)

Where r=10 and n=15

Substituting the values to the equation: 15C10 = 15! / (10!)x(10 - 5)! = 3003

Then there are 3003 different menus that a restaurant can makeif it has 15 main courses from which to choose.

luisejr77 luisejr77 · Answer 2 · 2019-04-28T03:25:01+02:00

Answer: 3,003 different menus

Step-by-step explanation:

We must calculate the number of ways in which a restaurant can make a menu of 10 main courses by selecting between 15 dishes.

In this case, the order in which the 10 dishes of the menu are found is not relevant. That is, for this case it is the same to have: {Dish 1, Dish 2 ...} that have {Dish 2, Dish 1 ...}

So this is a problem of combinations.

We must calculate:

[tex]nCr = \frac{n!}{r!(n - r)!}[/tex]

Where n is the number of objects you have and select r from them.

In this problem:

[tex]n = 15\\\\r = 10[/tex]

So:

[tex]15C10 = \frac{15!}{10!(15 - 10)!}[/tex]

[tex]15C10 = \frac{15!}{10!(5)!}[/tex]

[tex]15C10 = \frac{15!}{10!(5)!} = 3003[/tex]

Therefore the answer is 3003 different menus