These forms provide samples of comment letters and responses. The documents included are: Letter from the Maryland Securities Division, Office of Attorney General; Letter from the Attorney General, State of Illinois; Certificate of Mailing; and a Letter from State of New York, Department of Law.
Mississippi Comment Letters
State:
Multi-State
Control #:
US-5-01-STP
Format:
Word;
Rich Text
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FAQ
Originally Answered: In how many ways 5 letters can be taken from the word "MISSISSIPPI"? to be different ways? If you only consider them different if the sequence of remaining letters are different, then there are 103 different possibilities.
$\therefore $ Hence the number of ways can the letters in 'MISSISSIPPI' be arranged is 34650. Note: Permutations and Combinations is a very tricky chapter and one needs a lot of practice for it.
=34650. Was this answer helpful? How many different words can be formed by jumbling the letters in the word MISSISSIPPI in which no two S are adjacent? How many different words can be made out of the letters of the word 'Mississippi'=(11)!
Answer and Explanation: There are 11 letters in Mississippi, so we want to know the number of permutations there are of 11 objects, so we can use our formula, n!, with n = 11. We get that there are 39,916,800 different strings that we can make from the letters in Mississippi, using all the letters.
To adjust for the repeated I's, divide by the number of ways we can arrange 4 I's, which is 4!. Lastly to account for the 4 S's divide by another 4!. There we go! There are 34,650 permutations of the word MISSISSIPPI.
Ways of arranging the letters of Mississippi, making the probability 1/34650 that a random permuatation spells Mississippi.
Therefore the number of permutations with repetitions is: 11!/[(2!) *(4!) *(4!)] = 39,916,800/(2*24*24)=39,916,800/1152=311,850/9=34,650.
1! (411)4(411)4(211)2(111)1=0.031837 chance.
