How many different word can be formed by jumbling the letter of the word Mississippi in which no three S occur together?

How many different word can be formed by jumbling the letter of the word Mississippi in which no three S occur together?

No. of arrangement of the words MISSISSIPPI is =11!

How many 4 letter words can be formed out of the letters of the word pineapples?

314 words can be made from the letters in the word pineapples.

How many words are in actually?

43 words can be made from the letters in the word actually.

How many ways can the letters of Mississippi be arranged?

34650
∴ Hence the number of ways can the letters in ‘MISSISSIPPI’ be arranged is 34650.

How many different strings can be made from the letters in Mississippi using all the letters?

Thus 34,650 different strings can be made from the letters in MISSISSIPPI when using all the letters.

What is the probability of four S in the word Mississippi?

k165
The probability that four S’s come consecutively in the word ‘MISSISSIPPI’ is k165.

How many small words can pineapple make?

Words that can be made with pineapple 114 words can be made from the letters in the word pineapple.

How many words can you make out of immediately?

310 words can be made from the letters in the word immediately.

How many words can you make out of motivation?

Words that can be made with motivation 124 words can be made from the letters in the word motivation.

How many letters are there in the word Mississippi?

The word “Mississippi” contains 11 total letters. If you want to figure out the number of ways to arrange n objects, substances, etc., the answer will be n!, read out as ” n factorial”. Know that n!=n (n-1) (n-2)…*5*4*3*2*1,ninNN.

Which is no arrangement of the word Mississippi?

No. of arrangement of the words MISSISSIPPI is = 11! 4! ⋅ 4! ⋅ 2! now arrangement of the words in which all ” S ” are together is = 8! 4! ⋅ 2!

How many words can be formed from four letters?

The four letter word can be formed in the following ways. (all distinct letters), (two letters same of one kind and other two distinct) , (four letters same of two different kind) We have 8 distinct letters ( M,A,T,H,E,I,C,S). We choose any 4 from this and then arrange it in 8 P 4 ways=1680 ways.

How many permutations are there in the word Mississippi?

There are 34,650 permutations of the word MISSISSIPPI. This process of dividing out repeated permutations is exactly what the Multinomial Theorem is!