Permutation and Combination Questions Quiz – 1
Q1. Out of 7 consonants and 4 vowels, how many words of 3 consonants and 2 vowels can be formed?
A. 24400
B. 21300
C. 210
D. 25200
Explanation :
Number of ways of selecting 3 consonants out of 7 = 7C3
Number of ways of selecting 2 vowels out of 4 = 4C2
Number of ways of selecting 3 consonants out of 7 and 2 vowels out of 4 = 7C3 x 4C2
=(7×6×53×2×1)×(4×32×1)=210
It means that we can have 210 groups where each group contains total 5 letters(3 consonants and 2 vowels).
Number of ways of arranging 5 letters among themselves = 5!
= 5 x 4 x 3 x 2 x 1 = 120
Hence, Required number of ways = 210 x 120 = 25200
Q2. In a group of 6 boys and 4 girls, four children are to be selected. In how many different ways can they be selected such that at least one boy should be there?
A. 159
B. 209
C. 201
D. 212
Explanation :
In a group of 6 boys and 4 girls, four children are to be selected such that
at least one boy should be there.
Hence we have 4 choices as given below
We can select 4 boys ——(Option 1).
Number of ways to this = 6C4
We can select 3 boys and 1 girl ——(Option 2)
Number of ways to this = 6C3 x 4C1
We can select 2 boys and 2 girls ——(Option 3)
Number of ways to this = 6C2 x 4C2
We can select 1 boy and 3 girls ——(Option 4)
Number of ways to this = 6C1 x 4C3
Total number of ways
= (6C4) + (6C3 x 4C1) + (6C2 x 4C2) + (6C1 x 4C3)
= (6C2) + (6C3 x 4C1) + (6C2 x 4C2) + (6C1 x 4C1) [Applied the formula nCr = nC(n – r) ] =[6×52×1]+[(6×5×43×2×1)×4]+[(6×52×1)(4×32×1)]+[6×4] = 15 + 80 + 90 + 24
= 209
Q3. From a group of 7 men and 6 women, five persons are to be selected to form a committee so that at least 3 men are there on the committee. In how many ways can it be done?
A. 624
B. 702
C. 756
D. 812
Explanation :
From a group of 7 men and 6 women, five persons are to be selected with at least 3 men.
Hence we have the following 3 choices
We can select 5 men ——(Option 1)
Number of ways to do this = 7C5
We can select 4 men and 1 woman ——(Option 2)
Number of ways to do this = 7C4 x 6C1
We can select 3 men and 2 women ——(Option 3)
Number of ways to do this = 7C3 x 6C2
Total number of ways
= 7C5 + [7C4 x 6C1] + [7C3 x 6C2] = 7C2 + [7C3 x 6C1] + [7C3 x 6C2] [Applied the formula nCr = nC(n – r) ] =[7×62×1]+[(7×6×53×2×1)×6]+[(7×6×53×2×1)×(6×52×1)] = 21 + 210 + 525 = 756
Q4. In how many different ways can the letters of the word ‘OPTICAL’ be arranged so that the vowels always come together?
A. 610
B. 720
C. 825
D. 920
Explanation :
The word ‘OPTICAL’ has 7 letters. It has the vowels ‘O’,’I’,’A’ in it and these 3 vowels
should always come together. Hence these three vowels can be grouped and considered as a
single letter. That is, PTCL(OIA).
Hence we can assume total letters as 5. and all these letters are different.
Number of ways to arrange these letters = 5! = [5 x 4 x 3 x 2 x 1] = 120
All The 3 vowels (OIA) are different
Number of ways to arrange these vowels among themselves = 3! = [3 x 2 x 1] = 6
Hence, required number of ways = 120 x 6 = 720
Q5. In how many different ways can the letters of the word ‘CORPORATION’ be arranged so that the vowels always come together?
A. 47200
B. 48000
C. 42000
D. 50400
Explanation :
The word ‘CORPORATION’ has 11 letters. It has the vowels ‘O’,’O’,’A’,’I’,’O’ in it and
these 5 vowels should always come together. Hence these 5 vowels can be grouped
and considered as a single letter. that is, CRPRTN(OOAIO).
Hence we can assume total letters as 7. But in these 7 letters, ‘R’ occurs 2 times and
rest of the letters are different.
Number of ways to arrange these letters = 7!2!=7×6×5×4×3×2×12×1=2520
In the 5 vowels (OOAIO), ‘O’ occurs 3 and rest of the vowels are different.
Number of ways to arrange these vowels among themselves = 5!3!=5×4×3×2×13×2×1=20
Hence, required number of ways = 2520 x 20 = 50400
Q6. In how many ways can a group of 5 men and 2 women be made out of a total of 7 men and 3 women?
A. 1
B. 126
C. 63
D. 64
We need to select 5 men from 7 men and 2 women from 3 women
Number of ways to do this
= 7C5 x 3C2
= 7C2 x 3C1 [Applied the formula nCr = nC(n – r) ] =(7×62×1)×3
= 21 x 3 = 63
Q7. In how many different ways can the letters of the word ‘MATHEMATICS’ be arranged such that the vowels must always come together?
A. 9800
B. 100020
C. 120960
D. 140020
The word ‘MATHEMATICS’ has 11 letters. It has the vowels ‘A’,’E’,’A’,’I’ in it and
these 4 vowels must always come together. Hence these 4 vowels can be grouped and
considered as a single letter. That is, MTHMTCS(AEAI).
Hence we can assume total letters as 8. But in these 8 letters, ‘M’ occurs 2 times,
‘T’ occurs 2 times but rest of the letters are different.
Hence,number of ways to arrange these letters = 8!(2!)(2!)=8×7×6×5×4×3×2×1(2×1)(2×1)=10080
In the 4 vowels (AEAI), ‘A’ occurs 2 times and rest of the vowels are different.
Number of ways to arrange these vowels among themselves = 4!2!=4×3×2×12×1=12
Hence, required number of ways = 10080 x 12 = 120960
Q8. There are 8 men and 10 women and you need to form a committee of 5 men and 6 women. In how many ways can the committee be formed?
A. 10420
B. 11
C. 11760
D. None of these
We need to select 5 men from 8 men and 6 women from 10 women
Number of ways to do this
= 8C5 x 10C6
= 8C3 x 10C4 [Applied the formula nCr = nC(n – r) ] =(8×7×63×2×1)(10×9×8×74×3×2×1)
= 56 x 210
= 11760
Q9. How many 3-letter words with or without meaning, can be formed out of the letters of the word, ‘LOGARITHMS’, if repetition of letters is not allowed?
A. 720
B. 420
C. None of these
D. 5040
Explanation :
The word ‘LOGARITHMS’ has 10 different letters.
Hence, the number of 3-letter words(with or without meaning) formed by using these letters
= 10P3
= 10 x 9 x 8
= 720
Q10. In how many different ways can the letters of the word ‘LEADING’ be arranged such that the vowels should always come together?
A. None of these
B. 720
C. 420
D. 122
The word ‘LEADING’ has 7 letters. It has the vowels ‘E’,’A’,’I’ in it and
these 3 vowels should always come together. Hence these 3 vowels can be grouped
and considered as a single letter. that is, LDNG(EAI).
Hence we can assume total letters as 5 and all these letters are different.
Number of ways to arrange these letters = 5! = 5 x 4 x 3 x 2 x 1 = 120
In the 3 vowels (EAI), all the vowels are different.
Number of ways to arrange these vowels among themselves = 3! = 3 x 2 x 1= 6
Hence, required number of ways = 120 x 6= 720