Step 1. The string contains 11 letters, of which 1 M, 4 I’s, 4 S’s, and 2 P’s. Thus 34,650 different strings can be made from the letters in MISSISSIPPI when using all the letters.
How many different strings can be made from the letters in Mississippi using all the letters show your calculations?
There we go! There are 34,650 permutations of the word MISSISSIPPI.
How many different strings can be made from the letters in Tennessee using all the letters?
3780 distinct
There are 3780 distinct arrangements of the letters in the word TENNESSEE.
How many different strings can be made using all the letters in the word googol?
13. (1 pt) How many different strings can be made using all the letters in the word GOOGOL? Ans: There are three O’s, two G’s, and one L in GOOGOL. The number of different strings that can be made is (6!)/(3!
How many different strings can be made from the letters in Aardvark using all the letters if all three as must be consecutive?
So, in total, there are 6!/2! = 360 ways to arrange the letters in AARDVARK if all three A’s must be consecutive.
How many different strings can we make out of the 9 letters in the word sassafras?
9! (4!) (3!) There are 2520 distinguishable ways of arranging the letters.
How many permutations are possible using the 9 letters in the word Tennessee?
362880 ways
For the word TENNESSEE, it is slightly more difficult, and there are (at least) two different ways to think about it, although the two ways I present depend on the same basic principle. 1) If there were 9 distinct letters, there would be 9! = 362880 ways to arrange them.
How many words can be made out of the letters in the word Tennessee?
16 words made by unscrambling the letters from tennessee (eeeennsst).
How many different words are possible using all the letters of possible?
So the letters are B, T, T, R, (UE). Number of ways in which the letters above can be arranged = 5!/2! = 60 (since the letter ‘T’ is repeated twice). Therefore, total number of permutations possible = 60*2 = 120 ways.
How many strings with seven or more characters can be formed from the letters in Evergreen?
Question: How many strings with seven or more characters can be formed from the letters of EVERGREEN. I’m lost on this one, the answer is supposed to be 19, 635.
How many distinguishable ways are there to arrange the letters in the word bubble?
There are 120 unique arrangements of the letters in the word bubble.
How many permutations of the letters can be made from the word statistics?
In 50400 distinct ways, the letters of word “STATISTICS” can be arranged.
How many unique ways are there to arrange the letters in the word schools?
120 total arrangements. The number of ways that the letters of “school” can be arranged s.t. the o’s are not adjacent then is the total number of arrangements minus the arrangements where the o’s are adjacent: 360–120=240.
How many ways can the letters of Indiana be arranged?
Among the 12 letters in INDIANAPOLIS, there are 3 I’s, 2 N’s,, 2 A’s, and 1 each of D, P, O, L, S. There are 12! = 479,001,600 arrangements (permutations) of the 12 letters, most of which are identical because of repeated letters. In order that each permutation be distinct, repeat letters have to be accounted for.
