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Mathematical Induction

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Title: Mathematical Induction


1
Section 2.3
  • Mathematical Induction

2
First Example
  • Investigate the sum of the first n positive odd
    integers.
  • 1 ____
  • 1 3 ____
  • 1 3 5 ____
  • 1 3 5 7 ____
  • 1 3 5 7 9 ____

3
First Example
  • Suppose that some diligent person has carefully
    determined that
  • 1 3 5 7 29 31 256
  • What is the value of 1 3 5 7 31 33?
  • What is the value of 1 3 5 7 33 35?

4
A different setting
  • Compare this to the sequence an with recursive
    description an an-1 (2n 1) for n 2 and a1
    1.
  • a1 ____
  • a2 ____ ____ ____
  • a3 ____ ____ ____
  • a4 ____ ____ ____
  • a5 ____ ____ ____

5
A different setting
  • If you are told that a23 529, can you find a24
    using only the recursive pattern?
  • Does this agree with the proposed closed formula?

6
The recursive sequence
  • We wish to prove that the sequence an with
    recursive description an an-1 (2n 1) for n
    2 and a1 1
  • has the closed formula an n2 for all n 1.

7
Picturing mathematical induction
  • We are given the sequence an with recursive
    description an an-1 (2n 1) for n 2 and
    a1 1,
  • and we will verify the following sequence of
    statements in order
  • a1 12
  • a2 22
  • a3 32
  • a4 42
  • a5 52
  • etc

8
Picturing mathematical induction
  • The following table form is handy for keeping the
    correct mental image

n an (rec. def.) n2 Equal?
1 a1
2 a2
3 a3
4 a4

m-1 am-1
m
9
Reader vs. Author Proof.
  • The Author tries to convince the reader the
    result holds by showing that it holds for
    successive values of n, beginning with n1.
  • Lets all agree to call the last row that you
    verified the m-1th row. Therefore the Author
    must convince the Reader that the result holds
    for the next row, which is, the mth row.

10
The formal proof
  • Claim. The sequence an with recursive description
    an an-1 (2n 1) for n 2 and a1 1 has the
    closed formula an n2 for all n 1.
  • Proof by induction. The statement a1 12 is
    true because a1 1 by its definition.
  • Now suppose that statements a1 12, a2
    22, a3 32, , am-1 (m-1)2 have all been
    checked to be true for some integer m 2, and
    lets consider the next statement am
    am-1 (2m-1) by definition
  • (m-1)2 (2m-1) by previously checked
  • (m2 - 2m 1) (2m-1) by algebra
  • m2 by more algebra
  • This establishes that the next statement, am
    m2, is true, completing the induction argument.

11
Formulas for sums
  • Investigate the sum of the first n powers of 2
  • 2 ____
  • 2 4 ____
  • 2 4 8 ____
  • 2 4 8 16 ____
  • In general,

12
Closed formula for a sum
  • We wish to prove that for all n 1,

13
Picturing mathematical induction
  • The following table form is handy for keeping the
    correct mental image

n Sum n terms 2n1 2 Equal?
1 21 22 2 Yes
2 21 22 23 2 Yes
3 21 22 23 24 2 Yes
4 21 22 23 24 25 2 Yes

m-1 21 22 23 2m-1 2m 2 Yes
m
14
The formal proof
  • Claim. For all n 1,
  • Proof by induction. The statement
    is true.
  • Now let m 2 be the first summation not yet
    checked. This means
  • that the statement has been checked
  • So
  • This establishes that the next statement,
    is true.
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