Textbook ExpertVerified Tutor
18 Nov 2021
Given information
The given value of limit 
is 2.
The given values of 
are 1 and 
.
Step-by-step explanation
Step 1.
- The limit of
as 
approaches 
is 
that implies 
if for every number 
there is a corresponding number 
such that if 
then 
. - It is given that the value of is 1 and
, therefore the values of , and are 1, 2 and 
respectively. - Therefore, by the definition of limit if
then 
. - Solve the inequality by using the fact that if
then 
.
Single Variable Calculus: Early Transcendentals
4th Edition, 2018
Stewart
ISBN: 9781337687805
Solutions
Chapter
Section
- Problem 1
- Problem 2
- Problem 3
- Problem 4
- Problem 5
- Problem 6
- Problem 7
- Problem 8
- Problem 9
- Problem 10a
- Problem 10b
- Problem 11a
- Problem 11b
- Problem 11c
- Problem 12a
- Problem 12b
- Problem 12c
- Problem 13a
- Problem 13b
- Problem 14
- Problem 15
- Problem 16
- Problem 17
- Problem 18
- Problem 19a
- Problem 19b
- Problem 20a
- Problem 20b
- Problem 21a
- Problem 22
- Problem 23
- Problem 24