Exponential Series - PowerPoint PPT Presentation

1 / 41
About This Presentation
Title:

Exponential Series

Description:

Title: PowerPoint Presentation Author: mathu Last modified by: ADMIN Created Date: 9/16/2003 4:28:19 AM Document presentation format: On-screen Show (4:3) – PowerPoint PPT presentation

Number of Views:424
Avg rating:3.0/5.0
Slides: 42
Provided by: mathu150
Category:

less

Transcript and Presenter's Notes

Title: Exponential Series


1
(No Transcript)
2
Session 1
Exponential Series Logarithmic Series
3
(No Transcript)
4
Session Objectives
  • The number e
  • Exponential Series
  • Logarithmic Series

5
The number e
Let us consider the series
The sum of this series is denoted by e.
To prove that
Using binomial theorem
6
The number e
The number e is an irrational number and its
value lies between 2 and 3.
7
Exponential Series
We have
8
Exponential Series
9
Some Results
10
Some Results
11
Some Results
12
Some Important Deductions
13
Exponential Theorem
General term of eax
14
Logarithmic Series
If x lt 1, then
Replacing x by x,
15
Logarithmic Series
(i) (ii)
16
Logarithmic Series
Putting x 1 in (i), we get
17
(No Transcript)
18
Class Exercise - 1
Solution
Comparing the coefficients of like powers of n
fromboth sides, we get
A 0, B C 2D 0, C 3D 0, D 1
19
Solution contd..
e 3e e 5e
20
Class Exercise - 2
Solution
The given series can be written as
21
Solution contd..
22
Class Exercise - 3
Find the coefficient of Xn in theexpansion of
eex.
Solution
23
Solution contd..
24
Class Exercise - 4
Solution
25
Solution contd..
26
Class Exercise - 5
Solution
Now we will find the nth term of the numerator
Sn 4 11 22 37 ... tn 1 tn


_____________________________________
Subtracting, 0 4 7 11 15 19 ... (tn
tn 1) tn
27
Solution contd..
2n2 n 1
28
Solution contd..
2e 3e (e 1)
6e 1
29
Class Exercise - 6
Solution
Let Tr be the nth term of the infinite series.
30
Solution contd..
Comparing the coefficients of n2, n andconstant
term from both sides of theequation (ii), we
get4A 4B 4C 0, 2A 2C 2 and B
3Solving the above equations, we get A 2, B
3, C 1
31
Solution contd..
32
Solution contd..
33
Class Exercise - 7
Solution
34
Solution contd..
35
Class Exercise - 8
Solution
36
Solution contd..
37
Class Exercise - 9
Solution
38
Solution contd..
39
Class Exercise - 10
Solution
By componendo and dividendo
40
Solution contd..
41
(No Transcript)
Write a Comment
User Comments (0)
About PowerShow.com