How many different groups if 35 cars can be formed from 40 cars?

Answer:[tex]C(40,35)=40C_3_5=658008[/tex]Step-by-step explanation:We can use Combinatorics in order to solve this problem. Combinatorics is the part of Mathematics that studies the various ways of grouping with the elements of a set, forming them and calculating their number. There are different ways of making these groupings. Depending on whether the elements are repeated or not, we can use a permutation or a combination. A permutation of a set of elements is an arrangement of said elements taking into account the order. A combination of a set of elements is a selection of those elements regardless of order. In this case, the order doesn't matter, hence, this is a combination. The number of k-permutations of n elements is given by:[tex]C(n,k)=nC_k=\frac{n!}{k!(n-k)!}[/tex]Where:[tex]n=40\\k=35[/tex]Therefore, the different groups that can be formed are:[tex]C(40,35)=\frac{40!}{35!(40-35)!} =658008[/tex]