Access free live classes and tests on the app
Download
+
Unacademy's Blog!
Login Join for Free
avtar
  • ProfileProfile
  • Settings Settings
  • Refer your friendsRefer your friends
  • Sign outSign out
  • Terms & conditions
  • •
  • Privacy policy
  • About
  • •
  • Careers
  • •
  • Blog

© 2023 Sorting Hat Technologies Pvt Ltd

[wp_login_wall media_id="448945" text_before_login="Download JEE Maths Formulas" text_after_login="Download JEE Maths Formulas"]

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
[wp_login_wall media_id="424566" text_before_login=" Download Previous Year Papers" text_after_login="Download Previous Year Papers"] combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee Predict your JEE Rank .
[wp_login_wall media_id="448945" text_before_login="Download JEE Maths Formulas" text_after_login="Download JEE Maths Formulas"]

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
[wp_login_wall media_id="424566" text_before_login=" Download Previous Year Papers" text_after_login="Download Previous Year Papers"] combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee Predict your JEE Rank .
JEE Main 2026 Preparation: Question Papers, Solutions, Mock Tests & Strategy Unacademy » JEE Study Material » Mathematics » The Limit of a Function
[wp_login_wall media_id="448945" text_before_login="Download JEE Maths Formulas" text_after_login="Download JEE Maths Formulas"]

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
[wp_login_wall media_id="424566" text_before_login=" Download Previous Year Papers" text_after_login="Download Previous Year Papers"] combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee Predict your JEE Rank .

The Limit of a Function

In this article, we will learn about the limits and functions, history, properties, limits of a function of two variables and continuity.

Table of Content
  •  

This is because the notion of a derivative is dependent on the existence of limits in the theory of functions. This is why the theory of limits of functions is considered to be the cornerstone of calculus. What exactly is a limit? To further grasp the notion of “limit,” consider the following example: consider the function f (x). Make it so that the independent variable x takes values that are close to a given constant a. Then, the function f(x) takes a set of values corresponding to x. Assume that when the value of x is close to ‘a,’ the values of f(x) are close to a particular constant. For example, let us suppose that by selecting values of x that are sufficiently close to a but not equal to a, we may have f(x) diverge arbitrarily slightly from the value ‘a’, and that this is true for all such values of x. Then, when x approaches ‘a’, it is argued that f(x) is approaching limit A. 

Limits and functions: 

A function may be on the verge of approaching two separate limitations. Two scenarios are possible: one in which the variable approaches its limit by values more than the limit, and another in which the variable approaches its limit through values less than the limit. In such a circumstance, the limit is not defined, but the right-hand and left-hand limits are both present and functional.

The right-hand limit of a function is the value that the function approaches when a variable approaches its limit from the right side of the function’s graph.

This can be expressed in the following way: 

limx→a f(x) = A+ 

The left-hand limit of a function is the value that the function approaches when a variable approaches its limit from the left side of the function’s graph.

This can be expressed in the following way: 

limx→a f(x) = A- 

History: 

Despite being implicit in the development of calculus during the 17th and 18th centuries, the modern concept of the limit of a function can be traced back to Bolzano, who in 1817 introduced the fundamentals of the epsilon-delta technique to define continuous functions in order to define continuous functions. His work, on the other hand, was not well-known during his lifetime.

Cahuy discussed variable quantities, infinitesimals, and limits in his 1821 book Cours d’analyse, and defined continuity of y=f(x)y=f(x) by stating that an infinitesimal change in x necessarily produces an infinitesimal change in y, while (Grabiner 1983) claims that he used a rigorous epsilon-delta definition in his proofs. In 1861, Weierstrass published the first version of the epsilon-delta definition of limit in the form that is still often used today. He also pioneered the use of the notations lim and limx→x0, among others. 

Properties: 

A function f is real-valued if and only if the right-handed limit and the left-handed limit of the function f at p are both equal to L. If the limit of the function f at p is real-valued, the limit of the function f at p is L.

F(x) approaches p and is equal to f(p), then the function is continuous at p, and else it is discontinuous (p). This is equivalent to saying that f transforms every sequence in M which converges towards p into a sequence in N which converges toward f. This is equivalent to saying that every sequence in M converges towards f(p).

Suppose N is an ordered vector space. The limit operation is linear in the following sense: if the limit of f(x) as x approaches p is L and the limit of g(x) as x approaches p is P, then the limit of f(x) + g(x) as x approaches p is L + P. 

Limit of a function of two variables: 

If we have a function f(x,y) which depends on two variables x and y. Then this given function has the limit say C as (x,y) → (a,b) provided that ϵ>0,∃ δ > 0 such that |f(x,y)−C| < ϵ whenever 0 < √(x-a)²+(y-b)² < δ.

It is defined as 

lim(x,y)→(a,b) f(x,y) = C 

Limits of functions and continuity: 

The concepts of limits and continuity are strongly tied to one another. Functions may be either continuous or discontinuous in nature. The continuity of a function is defined as follows: if there are minor changes in the input of the function, then there must also be small changes in the output of the function.

In elementary calculus, the condition f(X) -> λ as x -> a denotes that the number f(x) can be made to lie as close as we want to the number lambda as long as we take the number x to be unequal to the number a but close enough to a to be considered equal to a. This demonstrates that f(a) may be a long way from lambda and that it is not necessary to define f(a). The following is an extremely significant result that we utilise in the derivation of functions: f’(a) of a given function f at a number a can be thought of as, 

f’(a) = limx→a f(x) – f(a)/x-a 

Conclusion: 

The application of limits in calculus is not limited to the computation of derivatives and integrals; it has a wide range of applications in a variety of other domains as well. The following are examples of how Limits can be used: It is useful in determining the strength of magnetic fields, electric fields, and other fields; Limits are used to extract the most relevant pieces of information from huge complex functions that include a lot of information. 

faq

Frequently asked questions

Get answers to the most common queries related to the IIT JEE Examination Preparation.

What is a limit in a function?

Ans :  Limits are values that a function (or sequence) appro...Read full

Why do we find the limit of a function?

Ans : – Using a ...Read full

Do all functions have limits?

Ans :  It is concerned with the value of a function at a specific point, which is referred ...Read full

What are the laws of limits?

Ans : The limit of a constant multiplied by a function is the...Read full

What are the applications of limits in mathematics?

Ans: Limits are values that a function (or sequence) approaches as the input (or index) approaches a certain value i...Read full

Ans :  Limits are values that a function (or sequence) approaches as the input (or index) approaches a certain value in mathematics. To understand calculus and mathematics, one must understand limits. Limits are used to define concepts such as continuous function, derivatives, and integrals. 

Ans : – Using a limit, we may see what value a function approaches when the inputs to that function become more close to a certain number. The concept of a limit serves as the foundation for all of calculus. 

Ans :  It is concerned with the value of a function at a specific point, which is referred to as the limit. Calculating the definite integral of a function is accomplished through the use of limits. Not all functions have upper and lower bounds. Some functions have no upper limit because the variable is on its way to infinity.

Ans : The limit of a constant multiplied by a function is the same as the limit of the constant multiplied by the limit of the function The product of the limits is equivalent to the product of the limitations of a product. The limit of a quotient is the same as the limit of the limits multiplied by one. The limit of a constant function is equal to the value of the constant function itself. 

Ans: Limits are values that a function (or sequence) approaches as the input (or index) approaches a certain value in mathematics. To understand calculus and mathematics, one must understand limits. Limits are used to define concepts such as continuous function, derivatives, and integrals. 

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee
Predict your JEE Rank
.

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee
Predict your JEE Rank
.
Company Logo

Unacademy is India’s largest online learning platform. Download our apps to start learning


Starting your preparation?

Call us and we will answer all your questions about learning on Unacademy

Call +91 8585858585

Company
About usShikshodayaCareers
we're hiring
BlogsPrivacy PolicyTerms and Conditions
Help & support
User GuidelinesSite MapRefund PolicyTakedown PolicyGrievance Redressal
Products
Learner appLearner appEducator appEducator appParent appParent app
Popular goals
IIT JEEUPSCSSCCSIR UGC NETNEET UG
Trending exams
GATECATCANTA UGC NETBank Exams
Study material
UPSC Study MaterialNEET UG Study MaterialCA Foundation Study MaterialJEE Study MaterialSSC Study Material

© 2026 Sorting Hat Technologies Pvt Ltd

Unacademy's Blog!

Share via

COPY