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Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
Lesson: Limit of Functions and One-Sided Limits
Course Developer: Brijendra Yadav
Department/College: Assistant Professor, Department of
Mathematics, A.N.D. College, University of Delhi
Page 2
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
Lesson: Limit of Functions and One-Sided Limits
Course Developer: Brijendra Yadav
Department/College: Assistant Professor, Department of
Mathematics, A.N.D. College, University of Delhi
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
Table of Contents
Chapter: Limit of Functions and One-Sided Limits
? 1: Learning Outcomes
? 2: Introduction
? 3: Limit of a Function (Imprecise Definition)
? 4: Limit of a Function at a Point (?? ? Definition)
o 4.1. Method to find the value of ? Algebraically
? 5: Algebra of Limits
? 6: One-Sided Limits
o 6.1. Right Hand Limit at a Point
o 6.2. Left Hand Limit at a Point
? 7: Infinite Limits
? Exercises
? Summary
? Reference
Page 3
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
Lesson: Limit of Functions and One-Sided Limits
Course Developer: Brijendra Yadav
Department/College: Assistant Professor, Department of
Mathematics, A.N.D. College, University of Delhi
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
Table of Contents
Chapter: Limit of Functions and One-Sided Limits
? 1: Learning Outcomes
? 2: Introduction
? 3: Limit of a Function (Imprecise Definition)
? 4: Limit of a Function at a Point (?? ? Definition)
o 4.1. Method to find the value of ? Algebraically
? 5: Algebra of Limits
? 6: One-Sided Limits
o 6.1. Right Hand Limit at a Point
o 6.2. Left Hand Limit at a Point
? 7: Infinite Limits
? Exercises
? Summary
? Reference
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
1. Learning outcomes:
After studying this chapter you should be able to understand the
? Limit of a function (Imprecise Definition)
? Limit of a function at a point (?? ? Definition)
? Method to find the value of ? algebraically
? Algebra of limits
? One Sided Limits at a Point
? Right Hand Limit at a Point
? Left Hand Limit at a Point
Page 4
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
Lesson: Limit of Functions and One-Sided Limits
Course Developer: Brijendra Yadav
Department/College: Assistant Professor, Department of
Mathematics, A.N.D. College, University of Delhi
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
Table of Contents
Chapter: Limit of Functions and One-Sided Limits
? 1: Learning Outcomes
? 2: Introduction
? 3: Limit of a Function (Imprecise Definition)
? 4: Limit of a Function at a Point (?? ? Definition)
o 4.1. Method to find the value of ? Algebraically
? 5: Algebra of Limits
? 6: One-Sided Limits
o 6.1. Right Hand Limit at a Point
o 6.2. Left Hand Limit at a Point
? 7: Infinite Limits
? Exercises
? Summary
? Reference
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
1. Learning outcomes:
After studying this chapter you should be able to understand the
? Limit of a function (Imprecise Definition)
? Limit of a function at a point (?? ? Definition)
? Method to find the value of ? algebraically
? Algebra of limits
? One Sided Limits at a Point
? Right Hand Limit at a Point
? Left Hand Limit at a Point
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
2. Introduction:
The central idea that distinguishes calculus from algebra and
trigonometry is the concept of limit. The essence of the concept of limit
for real-valued functions of a real variable is that: if ? is a real number,
then
0
lim ( )
xx
fx
?
? ? means that the value of f(x) can be made as close to ? as
we wish by taking x sufficiently close to
0
x (analyze the figure 1).
Figure 1
3. Limit of a Function (Imprecise Definition):
Let f(x) be defined on an open interval I about
0
x , except possibly at
0
x
itself. If f(x) get arbitrarily close to ? for all x sufficiently close to
0
x , then
the function f(x) approaches the limit ? as x approaches
0
x and it is
denoted by
0
lim ( )
xx
fx
?
? ?
and read as the limit of f(x) as x approaches
0
x is ? .
Value Addition: Note
In the above definition of limit phrases like arbitrarily close and
sufficiently close are imprecise because the meaning of these phrases
depends on the context. To a biologist, close may mean within a few
thousandths of an inch. To an astronomer studying distant galaxies close
may mean within a few thousand light-years.
Example 1: Check the behavior of the function
Page 5
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
Lesson: Limit of Functions and One-Sided Limits
Course Developer: Brijendra Yadav
Department/College: Assistant Professor, Department of
Mathematics, A.N.D. College, University of Delhi
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
Table of Contents
Chapter: Limit of Functions and One-Sided Limits
? 1: Learning Outcomes
? 2: Introduction
? 3: Limit of a Function (Imprecise Definition)
? 4: Limit of a Function at a Point (?? ? Definition)
o 4.1. Method to find the value of ? Algebraically
? 5: Algebra of Limits
? 6: One-Sided Limits
o 6.1. Right Hand Limit at a Point
o 6.2. Left Hand Limit at a Point
? 7: Infinite Limits
? Exercises
? Summary
? Reference
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
1. Learning outcomes:
After studying this chapter you should be able to understand the
? Limit of a function (Imprecise Definition)
? Limit of a function at a point (?? ? Definition)
? Method to find the value of ? algebraically
? Algebra of limits
? One Sided Limits at a Point
? Right Hand Limit at a Point
? Left Hand Limit at a Point
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
2. Introduction:
The central idea that distinguishes calculus from algebra and
trigonometry is the concept of limit. The essence of the concept of limit
for real-valued functions of a real variable is that: if ? is a real number,
then
0
lim ( )
xx
fx
?
? ? means that the value of f(x) can be made as close to ? as
we wish by taking x sufficiently close to
0
x (analyze the figure 1).
Figure 1
3. Limit of a Function (Imprecise Definition):
Let f(x) be defined on an open interval I about
0
x , except possibly at
0
x
itself. If f(x) get arbitrarily close to ? for all x sufficiently close to
0
x , then
the function f(x) approaches the limit ? as x approaches
0
x and it is
denoted by
0
lim ( )
xx
fx
?
? ?
and read as the limit of f(x) as x approaches
0
x is ? .
Value Addition: Note
In the above definition of limit phrases like arbitrarily close and
sufficiently close are imprecise because the meaning of these phrases
depends on the context. To a biologist, close may mean within a few
thousandths of an inch. To an astronomer studying distant galaxies close
may mean within a few thousand light-years.
Example 1: Check the behavior of the function
Limit of Functions and One-Sided Limits
Institute of Lifelong Learning, University of Delhi
2
4
()
2
x
fx
x
?
?
?
, near x = 2.
Solution: Given that
2
4
()
2
x
fx
x
?
?
?
for any 2 x ? , we can have
( 2)( 2)
( ) 2 2
2
xx
f x x for x
x
??
? ? ? ?
?
.
Thus, the graph of f(x) is the line 2 yx ?? with the point (1, 2) removed.
Figure 2: Graph of
2
4
()
2
x
fx
x
?
?
?
.
The removed point (2, 4) is shown as a hole in the graph. Even though
f(2) is not defined, it is clear that we can make the value of f(x) as close
as we want to 4 by choosing x close enough to 2.
Thus, f(x) approaches the limit 4 as x approaches to 2.
Hence,
2
22
4
lim ( ) lim 4
2
xx
x
fx
x
??
?
??
?
.
Example 2: Discuss the behavior of function
1, 0
()
2, 0
x
fx
x
? ?
?
?
?
?
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FAQs on Lecture 4 - Limit of Functions and One-Sided Limits - Calculus - Engineering Mathematics
| 1. What is a limit of a function? |  |
Ans. The limit of a function is a fundamental concept in calculus that describes the behavior of a function as the input approaches a certain value. It represents the value that the function approaches or tends to as the input gets arbitrarily close to a particular point.
| 2. How is a limit of a function calculated? | |
Ans. The limit of a function can be calculated by evaluating the function at values very close to the desired point. If the function approaches a single value as the input approaches the desired point, then that value is the limit. If the function approaches different values from the left and right sides of the desired point, the limit does not exist.
| 3. What are one-sided limits? | |
Ans. One-sided limits refer to the behavior of a function as the input approaches a particular point from either the left or the right side. A left-sided limit is the value that the function approaches as the input approaches the point from the left, while a right-sided limit is the value that the function approaches as the input approaches the point from the right.
| 4. How are one-sided limits different from the limit of a function? | |
Ans. One-sided limits focus on the behavior of a function from only one side of a point, either left or right, while the limit of a function considers the behavior from both sides. If the one-sided limits from both sides exist and are equal, then the limit of the function also exists and is equal to the one-sided limits.
| 5. Why are limits of functions important in engineering mathematics? | |
Ans. Limits of functions are important in engineering mathematics as they provide a way to analyze and describe the behavior of various physical quantities or phenomena. They help engineers understand how functions approach certain values, which is crucial for designing and optimizing systems, predicting performance, and solving engineering problems.
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