permutations & combinations: selected exercises
DESCRIPTION
Permutations & Combinations: Selected Exercises. Preliminaries. Denote the # of arrangements of some k elements of a set of n elements as P(n,k) . Use the product rule to derive a formula for P(n,k) . Let C(n,k) be the # of subsets of k elements drawn from a set of n elements. - PowerPoint PPT PresentationTRANSCRIPT
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Permutations & Combinations: Selected Exercises
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Preliminaries
Denote the # of arrangements of some k elements of a set of n elements as P(n,k).
Use the product rule to derive a formula for P(n,k).
Let C(n,k) be the # of subsets of k elements drawn from a set of n elements.
Use the product rule to derive a formula for C(n,k) in terms of P(n,k) & P(k,k).
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10
There are 6 different candidates for governor.
In how many different orders can the names of the candidates be printed on a ballot?
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10 Solution
The # of different orders that the candidate names can be
printed on a ballot is described by the following procedure:
1. Pick the candidate that appears on top (6)
2. Pick the candidate that appears below that (5)
3. Pick the candidate that appears below that (4)
4. Pick the candidate that appears below that (3)
5. Pick the candidate that appears below that (2)
6. Pick the candidate that appears below that (1)
The composite number is 6 . 5 . 4 . 3 . 2 . 1 = 720.
This also is known as P(6,6).
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20 (a)
How many bit strings of length 10 have exactly 3 0s?
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20 (a) Solution
The bit string has 10 positions: 1, 2, …, 10.
A bit string with exactly 3 0s can be described as a 3-
subset of the numbers 1, 2, …, 10.
These are the bit positions where the 0s go.
There are C(10, 3) such 3-subsets.
For each such 3-subset, the other positions take 1s.
There is 1 way to do that.
The answer thus is C(10, 3) = 10 . 9 . 8 / 3 . 2 . 1 = 120.
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20 (b)
How many bit strings of length 10 have more 0s than 1s?
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20 (b) Solution 1
We can decompose this problem into disjoint sub-problems,
and count each sub-problem:
1. 6 0s and 4 1s: C(10, 6) = C(10, 4) = 10.9.8.7 / 4.3.2 = 210
2. 7 0s and 3 1s: C(10, 7) = C(10, 3) = 10 . 9 . 8 / 3 . 2 = 120
3. 8 0s and 2 1s: C(10, 8) = C(10, 2) = 10 . 9 / 2 = 45
4. 9 0s and 1 1: C(10, 9) = C(10, 1) = 10
5. 10 0s and 0 1s : C(10, 10) = C(10, 0) = 1
The answer thus is
C(10, 4) + C(10, 3) + C(10, 2) + C(10, 1) + C(10, 0)
= 210 + 120 + 45 + 10 + 1 = 386.
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20 (b) Solution 1
Is the following analysis right?1. Pick the positions of 6 0s:
C(10, 6) = C(10, 4)
2. Fill in the other 4 positions: 24
C(10, 4) 24 = 3,360 386.
What is wrong?
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20 (b) Solution 2
1. There is a 1-to-1 correspondence between
• strings with more 0s than 1s
• strings with more 1s than 0s
2. Strategy:
1. C(10, 5) = the # of strings with an equal # of 1s & 0s.
2. 210 – C(10, 5) = the # with an unequal # of 1s & 0s.
3. (210 – C(10, 5) ) / 2 = the # with more 0s than 1s.
C(10, 5) = 10.9.8.7.6 / 5.4.3.2.1 = 252
(1024 – 252)/2 = 386.
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20 (c)
How many bit strings of length 10 have ≥ 7 1s?
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20 (c) Solution
We can decompose this problem into disjoint sub-problems,
and count each sub-problem:
1. 7 1s and 3 0s: C(10, 7) = C(10, 3) = 10 . 9 . 8 / 3 . 2 = 120
2. 8 1s and 2 0s : C(10, 8) = C(10, 2) = 10 . 9 / 2 = 45
3. 9 1s and 1 0: C(10, 9) = C(10, 1) = 10
4. 10 1s and 0 0s : C(10, 10) = C(10, 0) = 1
The answer thus is
C(10, 3) + C(10, 2) + C(10, 1) + C(10, 0) = 120 + 45 + 10 + 1 = 176.
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20 (d)
How many bit strings of length 10 have ≥ 3 1s?
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20 (d) Solution
We can decompose this problem into disjoint sub-problems,
and count each sub-problem.
In this case, it is easier to count the number of 10-bit strings
w/o the property & subtract from the # of 10-bit strings
(210):
1. 0 1s and 10 0s: C(10, 0) = 1
2. 1 1 and 9 0s: C(10, 1) = 10
3. 2 1s and 8 0s: C(10, 2) = 45
The answer thus is
210 – (1 + 10 + 45) = 1024 – 56 = 968.
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30 (a)
There are 7 women & 9 men.
How many ways are there to select a committee of 5
members, with at least 1 woman?
Note: In such problems, it is customary and implicit to take
individuals as distinct.
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30 (a)
Consider using the product rule:
1. Pick 1 woman: C(7,1).
2. Pick 4 people from the remaining 6
women & 9 men: C(15,4).
Is the answer: C(7,1) C(15,4)?
Given a committee of men & women, can you identify
the stage at which each woman was chosen?
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30 (a) Solution
Decompose the problem into disjoint sub-problems:1. The committee has 1 woman:
1. Pick the woman: C(7, 1) = 72. Pick the men: C(9, 4) = 9 . 8 . 7 . 6 / 4 . 3 . 2 = 126
2. The committee has 2 women:1. Pick the women: C(7, 2) = 7 . 6 / 2 = 212. Pick the men: C(9, 3) = 9 . 8 . 7 / 3 . 2 = 84
– The committee has 3 women: C(7, 3) . C(9, 2) = 35 . 36– The committee has 4 women: C(7, 4) . C(9, 1) = 35 . 9– The committee has 5 women: C(7, 5) . C(9, 0) = 21 . 1
The answer is C(7, 1)C(9, 4) + C(7, 2)C(9, 3) + C(7, 3)C(9, 2) + C(7, 4)C(9, 1) +
C(7,5)C(9, 0) = 7 . 126 + 21 . 84 + 35 . 36 + 35 . 9 + 21 . 1 = 4,242.
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30 (a) More Elegant Solution
The set of all committees with 5 members is the
universe. Its size is C(7 + 9, 5).
Subtract all committees w/o women: C(9, 5).
The answer is C(16, 5) – C(9, 5) = 4,368 – 126 = 4,242.
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30 (b)
There are 7 women & 9 men.
How many ways are there to select a committee of 5
members, with ≥ 1 woman and ≥ 1 man?
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30 (b) Solution
Subtract “bad” committees from all 5-committees:
1. The # of all 5-committees: C(16, 5)
2. The # of 5-committees w/o women: C(9, 5)
3. The # of 5-committees w/o men: C(7, 5)
The answer: C(16, 5) – C(9, 5) – C(7, 5)
= 4,368 – 126 – 21 = 4,221.
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40
How many ways are there to seat 6 people around a
circular table, where 2 seatings, A & B, are
equivalent if A is a rotation of B?
A
1
5
6 2
3
4
B
6
4
5 1
23
equivalent
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40 Solution
If the people sat in a line the answer is 6!
If we drag the line seating into a circle, 6 rotations
(permutations) of that “line seating” are equivalent.
The answer is 6!/6 = 5!
The equivalence relation has 5! equivalence classes, each with 6
elements.
Alternatively:
1. Fix person1 at the head of the table: 1
2. Arrange the other 5 people at the table: 5!
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Computing C(n,k)
How many ways are there to select a team of k players from a set of n players, with a particular player named as captain?
1. Pick the k players: C(n,k)
2. Pick the captain: C(k,1) = k
Equivalently,1. Pick the captain: C(n,1) = n
2. Pick the remainder of the team: C(n-1,k-1)
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Computing C(n,k)
C(n,k)k = n C(n-1,k-1)
C(n,k) = n/k C(n-1,k-1).
Apply the above recursively, with a base case of C(n,1) = n:C(n,k) = n(n-1) . . . (n - k +1) /k!
For example,C(1000, 4) = 1000 . 999 . 998 . 997 / 4 . 3 . 2 . 1
Give an argument why, in general, each factor in the denominator divides some factor in the numerator.
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Characters
. ≥ ≡ ~
≈
Ω Θ
Σ ¢