Table of Contents
What is the probability that 4s appear consecutively in the word Mississippi?
It is now given in the question that the probability for four s’s come consecutively in the word ‘MISSISSIPPI’ is $\dfrac{k}{{165}}$….
Total Number of letters | 11 |
---|---|
Number of ‘S’ | 4 |
Number of ‘I’ | 4 |
Number of ‘P’ | 2 |
Number of ‘M’ | 1 |
What is the probability that four?
A and B draw two cards one after other from a pack of 52 cards. The probability that all four cards of same colour is.
How many arrangements of the letters in Mississippi have all four S’s together?
Lastly to account for the 4 S’s divide by another 4!. There we go! There are 34,650 permutations of the word MISSISSIPPI.
What is the probability of rolling a 4 in a dice?
Two (6-sided) dice roll probability table
Roll a… | Probability |
---|---|
4 | 6/36 (16.667\%) |
5 | 10/36 (27.778\%) |
6 | 15/36 (41.667\%) |
7 | 21/36 (58.333\%) |
How many s’s will be counted as 1 in Mississippi problem?
So although MISSISSIPPI problem is a cake walk for majority of the students when simple arrangement is asked but when conditions are imposed like in this question, sometimes question becomes tricky. In this question all the S come together so 4 S’s will be counted as 1.
What is the total number of digits in 4 SS?
Consider 4 s as one unit. Thus total no.of digits = 8, out of which 4 are Is, 2 Ps, 1 M and 1 unit of 4 Ss. Thus, no.of favorable arrangements = 8!/ (4!X2!)
How many different ways can you arrange the words Mississippi?
There are 3 different objects, red, blue, and white, so there are 3! or 3*2*1 ways to arrange them. With the word Mississippi, there are 11 objects, because there are 11 letters. However, some of the letters are duplicates so some of the arrangements will be the same.