Originally posted by stupid idiot
i do not get this at all. how come i got 42 ways for my answer?
# 3A's = 1
# 2A's = 6C1
# 1A's = 6C2
# 0A's = 6C3
# total ways = 1 + 6C1 + 6C2 + 6C3 = 42
what's wrong with my logics? did i not interpret the question right? fuck i'm stupid.
those are only combos, u have to permutate all the cases too. i'll do it now...
My solution:
This type of question is a typical one u solve by cases.
You have 3 cases, the words could be
3x (ie. all the same)
2x, y (2 the same, 1 different)
x,y,z (all 3 are different)
for each case u work out the combinations and then permutations.
first write out AUSTRALIA this way:
A:3, U:1, S:1, T:1, R:1, L:1, I:1
for the case of 3x:
Combinations:
1C1 (only 1 case where u cna have all 3 letters same)
Permutations:
3!/3!
Total:
1*1=1
2x,y:
Combos:
1C1 * 6C1 (1C1 because again A is only letter that can possibly appear twice, and 6C1 because u have 6 remaining letters and u wanna choose 1)
Perms:
3!/2!
Total:
6*3=18
x,y,z:
Combos:
7C3
Perms:
3!
Total: 210
Adding up all the totals from each case u get 229
(u prolly wanna set out the above in a table wiv columns of cases, combos, perms and totals, and have rows of the 3 cases.)
you obviously cant get the huge answer that previous person got because 9P3 would be the max answer without any restrictions. Look at his reasoning, u did 9P3 and then timed by something...the logic behind that is wrong...
i just could not get his/her logics.
