SOLUTION: Given the word ALABAMA, how many distinguishable permutation or orders exist?

Question 361903: Given the word ALABAMA, how many distinguishable permutation or orders exist?
Answer by sudhanshu_kmr(1152) (Show Source): You can put this solution on YOUR website!

Total no. of letters = 7
no. of A = 4 , others are only once

no. of permutations = 7! / 4! = 210

answer = 210

It is possible that some typing mistake in solution of a problem, if any please ignore it. Understand the concept and try to solve the problem yourself. If there is problem related to concept, contact at
sudhanshu.cochin@yahoo.com or sudhanshu.cochin@gmail.com
Best of luck.......

RELATED QUESTIONS
how many distinguishable permutation are possible with all letters of the word ELLIPSES (answered by greenestamps,ikleyn)

How many distinguishable permutations of the word BEIBER are possible? (answered by jorel555)

How many times can the word "DEFENSE" be arranged using permutation or combination? And... (answered by stanbon,Edwin McCravy)

how many distinguishable permutations can be made from the letters in the word... (answered by edjones)

how many distinguishable permutations are there of the letters in the word EFFECTIVE?... (answered by vheroli)

How many distinguishable ways can be written using all the letters in the word ALGEBRA? (answered by Theo)

How many distinguishable ways can the letters of the word STATISTICS be written ? (answered by Fombitz)

In how many distinguishable ways can the letters in the word STATISTICS be arranged?... (answered by ikleyn)

how many distinguishable permutations are possible with all the letter of the word... (answered by ikleyn)