Chapter 1: Q. 1.17 (page 20)

Give an analytic verification of
$(\begin{matrix} n \\ 2 \end{matrix}) = (\begin{matrix} k \\ 2 \end{matrix}) + k (n - k) + (\begin{matrix} n - k \\ 2 \end{matrix}), 1 \leq k \leq n$
Now, give a combinatorial argument for this identity.

Short Answer

Expert verified

It is proved that $(\begin{matrix} n \\ 2 \end{matrix}) = (\begin{matrix} k \\ 2 \end{matrix}) + k (n - k) + (\begin{matrix} n - k \\ 2 \end{matrix})$

Step by step solution

Step 1. Given information.

We have to verify that

$(\begin{matrix} n \\ 2 \end{matrix}) = (\begin{matrix} k \\ 2 \end{matrix}) + k (n - k) + (\begin{matrix} n - k \\ 2 \end{matrix})$

where

$1 \leq k \leq n$

Step 2. Verify the given equation.

The given equation is $(\begin{matrix} n \\ 2 \end{matrix}) = (\begin{matrix} k \\ 2 \end{matrix}) + k (n - k) + (\begin{matrix} n - k \\ 2 \end{matrix})$ .

On expanding the L.H.S we get,

$(\begin{matrix} n \\ 2 \end{matrix}) = \frac{n}{2} \times \frac{n - 1}{2 - 1} \times (\begin{matrix} n - 2 \\ 2 - 2 \end{matrix}) \Rightarrow (\begin{matrix} n \\ 2 \end{matrix}) = \frac{n (n - 1)}{2} ∴ L . H . S = \frac{n (n - 1)}{2}$

On expanding R.H.S we get,

$(\begin{matrix} k \\ 2 \end{matrix}) + k (n - k) + (\begin{matrix} n - k \\ 2 \end{matrix}) = \frac{k}{2} \times \frac{k - 1}{2 - 1} \times (\begin{matrix} k - 2 \\ 2 - 2 \end{matrix}) + k (n - k) + \frac{n - k}{2} \times \frac{n - k - 1}{2 - 1} \times (\begin{matrix} n - k - 2 \\ 2 - 2 \end{matrix})$

$= \frac{k (k - 1)}{2} + k (n - k) + \frac{n - k (n - k - 1)}{2} = \frac{k (k - 1)}{2} + \frac{2 k (n - k)}{2} + \frac{n - k (n - k - 1)}{2} = \frac{k^{2} - k + 2 k n - 2 k^{2} + n^{2} - k n - n - k n + k^{2} + k}{2} = \frac{n^{2} - n}{2} = \frac{n (n - 1)}{2}$

$∴ R . H . S = \frac{n (n - 1)}{2}$

Therefore, L.H.S = R.H.S

Hence, it is proved thatlocalid="1649216494198" $(\begin{matrix} n \\ 2 \end{matrix}) = (\begin{matrix} k \\ 2 \end{matrix}) + k (n - k) + (\begin{matrix} n - k \\ 2 \end{matrix})$

Step 3. Give argument.

The given identity $(\begin{matrix} n \\ 2 \end{matrix}) = (\begin{matrix} k \\ 2 \end{matrix}) + k (n - k) + (\begin{matrix} n - k \\ 2 \end{matrix})$ is a combinatorial argument for a group of $n$ objects and a subgroup of $k$ of the $n$ objects.

$(\begin{matrix} k \\ 2 \end{matrix})$ is the number of subsets of size $2$ that contains $2$ objects from the subgroup of size $k$ ,

k (n - k)

is the number that contain

1

item from the subgroup and

(\begin{matrix} n - k \\ 2 \end{matrix})

is the number that contain

0

objects from the subgroup.

$(\begin{matrix} n \\ 2 \end{matrix})$ is the total number of subgroups of size $2$ that we get by adding $(\begin{matrix} k \\ 2 \end{matrix}), k (n - k), and (\begin{matrix} n - k \\ 2 \end{matrix})$ .

Therefore, it is proved that $(\begin{matrix} n \\ 2 \end{matrix}) = (\begin{matrix} k \\ 2 \end{matrix}) + k (n - k) + (\begin{matrix} n - k \\ 2 \end{matrix})$ .

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Give an analytic verification of
$(\begin{matrix} n \\ 2 \end{matrix}) = (\begin{matrix} k \\ 2 \end{matrix}) + k (n - k) + (\begin{matrix} n - k \\ 2 \end{matrix}), 1 \leq k \leq n$
Now, give a combinatorial argument for this identity.

Short Answer

Step by step solution

Step 1. Given information.

Step 2. Verify the given equation.

Step 3. Give argument.

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Give an analytic verification ofn2=k2+k(n-k)+n-k2,1≤k≤nNow, give a combinatorial argument for this identity.

Short Answer

Step by step solution

Step 1. Given information.

Step 2. Verify the given equation.

Step 3. Give argument.

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Math Textbooks

Calculus

Statistics

Applied Mathematics

Pure Maths

Mechanics Maths

Probability and Statistics

Study anywhere. Anytime. Across all devices.

Give an analytic verification of
$(\begin{matrix} n \\ 2 \end{matrix}) = (\begin{matrix} k \\ 2 \end{matrix}) + k (n - k) + (\begin{matrix} n - k \\ 2 \end{matrix}), 1 \leq k \leq n$
Now, give a combinatorial argument for this identity.