Table of Contents
- 1 What is the probability that 4 S come consecutively in the word Mississippi?
- 2 What is the ratio of S in the word Mississippi to the total letters in the world?
- 3 What is the probability of that 4s appear consecutively in the word Mississippi assuming the letters are arranged in random?
- 4 What is the probability of getting a total of less than 12 in the throw of two dice?
- 5 How many s’s will be counted as 1 in Mississippi problem?
- 6 What is the total number of digits in 4 SS?
What is the probability that 4 S come consecutively in the word Mississippi?
The probability that four S’s come consecutively in the word ‘MISSISSIPPI’ is k/165.
What is the ratio of S in the word Mississippi to the total letters in the world?
So since MISSISSIPPI has 11 total letters with 2 P’s, 4 I’s, and 4 S’s our calculation is: 11!/(2!
What is the probability of that 4s appear consecutively in the word Mississippi assuming the letters are arranged in random?
What is the probability that a leap year selected at random contains 53 Sundays?
7/366
The probability that a leap year selected at random contains 53 Sunday is (1)7/366 (2)28/183 (3) 1/7 (4) 2/7. We know that a leap year has 366 days. So, we have 52 weeks and 2 days. Hence, a leap year has 52 Sundays.
How do you find the fourth proportional?
We can write it as w:x = y:z. The quantity z is known as fourth proportional to the quantities w, x, and y. For example, if we write the quantities 7,8,9, and 10 in the proportional form 7:8 :: 9:10, then 10 is the fourth proportional to 7, 8, and 9.
What is the probability of getting a total of less than 12 in the throw of two dice?
according to the question, probability of getting a total of less than 12 = favorable no of outcomes /total no of outcomes.. Favorable no of outcomes = (1,1) (1,2) (1,3) …………. (6,5) = 35…
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.
How many objects are there in the word Mississippi?
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. The way to deal The basic idea needed to solve this type of problem in the permutation rule. This means that with n different objects there are n! different ways to arrange them.