Answer:
630 distinct possible collections of letters could be put in the bag.
Step-by-step explanation:
Since on the refrigerator, MATHCOUNTS is spelled out with 10 magnets, one letter per magnet, and two vowels and three consonants fall off and are put away in a bag, if the Ts are indistinguishable, to determine how many distinct possible collections of letters could be put in the bag, the following calculation must be performed:
Vowels: 3
(AO, AU, OU)
Consonants: 7
3 x 7 x 6 x 5 = X
3 x 210 = X
630 = X
Therefore, 630 distinct possible collections of letters could be put in the bag.
Answer: 75 distinct possible collections
Step-by-step explanation:
2 vowels = 3C2 = 3
3 vowels = 25 ways
25 * 3 = 75 total ways
