JEE Exam > JEE Notes > DPP: Daily Practice Problems for JEE Main & Advanced > DPP for JEE: Daily Practice Problems- Continuity & Differentiability
Continuity & Differentiability Practice Questions - DPP for JEE
| Download, print and study this document offline |
Please wait while the PDF view is loading
Page 1
PART-I (Single Correct MCQs)
1. Let be a function such that
, and . Then
(a) f(x) is a quadratic function
(b) f(x) is continuous but not differentiable
(c) f(x) is differentiable in R
(d) f(x) is bounded in R
2. If x
2
+ y
2
= a
2
and k = , then k is equal to
(a)
(b)
(c)
Page 2
PART-I (Single Correct MCQs)
1. Let be a function such that
, and . Then
(a) f(x) is a quadratic function
(b) f(x) is continuous but not differentiable
(c) f(x) is differentiable in R
(d) f(x) is bounded in R
2. If x
2
+ y
2
= a
2
and k = , then k is equal to
(a)
(b)
(c)
(d)
3. Let a function satisfy the equation
f (x + y) = f(x) + f(y) for all x, y, If the function f(x) is continuous at x = 0,
then
(a) f(x) = 0 for all x
(b) f(x) is continuous for all positive real x
(c) f(x) is continuous for all x
(d) None of these
4. Differential coefficient of with respect to
will be
(a) 1
(b) – 1
(c) – 1/2
(d) x
5. The values of a, b and c which make the function
continuous at x = 0 are
(a) , , b = 0
(b) , ,
Page 3
PART-I (Single Correct MCQs)
1. Let be a function such that
, and . Then
(a) f(x) is a quadratic function
(b) f(x) is continuous but not differentiable
(c) f(x) is differentiable in R
(d) f(x) is bounded in R
2. If x
2
+ y
2
= a
2
and k = , then k is equal to
(a)
(b)
(c)
(d)
3. Let a function satisfy the equation
f (x + y) = f(x) + f(y) for all x, y, If the function f(x) is continuous at x = 0,
then
(a) f(x) = 0 for all x
(b) f(x) is continuous for all positive real x
(c) f(x) is continuous for all x
(d) None of these
4. Differential coefficient of with respect to
will be
(a) 1
(b) – 1
(c) – 1/2
(d) x
5. The values of a, b and c which make the function
continuous at x = 0 are
(a) , , b = 0
(b) , ,
(c) , ,
(d) None of these
6. The function f(x) = [x]
2
– [x
2
] (where [y] is the greatest integer function
less than or equal to y), is discontinuous at :
(a) all integers
(b) all integers except 0 and 1
(c) all integers except 0
(d) all integers except 1
7. The value of p for which the function
may be continuous at x = 0, is
(a) 1
(b) 2
(c) 3
(d) None of these
8. In the mean value theorem , if a = 0,
b = 1/2 and f (x) = x (x – 1) (x – 2), the value of c is –
(a)
(b)
(c)
(d)
9. If then at x = 0, f(x)
Page 4
PART-I (Single Correct MCQs)
1. Let be a function such that
, and . Then
(a) f(x) is a quadratic function
(b) f(x) is continuous but not differentiable
(c) f(x) is differentiable in R
(d) f(x) is bounded in R
2. If x
2
+ y
2
= a
2
and k = , then k is equal to
(a)
(b)
(c)
(d)
3. Let a function satisfy the equation
f (x + y) = f(x) + f(y) for all x, y, If the function f(x) is continuous at x = 0,
then
(a) f(x) = 0 for all x
(b) f(x) is continuous for all positive real x
(c) f(x) is continuous for all x
(d) None of these
4. Differential coefficient of with respect to
will be
(a) 1
(b) – 1
(c) – 1/2
(d) x
5. The values of a, b and c which make the function
continuous at x = 0 are
(a) , , b = 0
(b) , ,
(c) , ,
(d) None of these
6. The function f(x) = [x]
2
– [x
2
] (where [y] is the greatest integer function
less than or equal to y), is discontinuous at :
(a) all integers
(b) all integers except 0 and 1
(c) all integers except 0
(d) all integers except 1
7. The value of p for which the function
may be continuous at x = 0, is
(a) 1
(b) 2
(c) 3
(d) None of these
8. In the mean value theorem , if a = 0,
b = 1/2 and f (x) = x (x – 1) (x – 2), the value of c is –
(a)
(b)
(c)
(d)
9. If then at x = 0, f(x)
(a) has no limit
(b) is discontinuous
(c) is continuous but not differentiable
(d) is differentiable
10. where g is a continuous function then
does not exist if
(a) g(x) is any constant function
(b) g(x) = x
(c) g(x) = x
2
(d) g(x) = x h (x), where h(x) is a polynomial
11. Let f : R ? R be a function defined by f (x) = max {x, x
3
}. The set of all
points where f (x) is NOT differentiable is
(a) {-1, 1}
(b) {-1, 0}
(c) {0, 1}
(d) {-1, 0, 1}
12. The function is not defined atx = . The value of
f so that f is continuous at x = is
(a)
(b)
(c) 2
(d) None of these
13. If g is the inverse function of f and = sin x, then
is
(a)
(b)
Page 5
PART-I (Single Correct MCQs)
1. Let be a function such that
, and . Then
(a) f(x) is a quadratic function
(b) f(x) is continuous but not differentiable
(c) f(x) is differentiable in R
(d) f(x) is bounded in R
2. If x
2
+ y
2
= a
2
and k = , then k is equal to
(a)
(b)
(c)
(d)
3. Let a function satisfy the equation
f (x + y) = f(x) + f(y) for all x, y, If the function f(x) is continuous at x = 0,
then
(a) f(x) = 0 for all x
(b) f(x) is continuous for all positive real x
(c) f(x) is continuous for all x
(d) None of these
4. Differential coefficient of with respect to
will be
(a) 1
(b) – 1
(c) – 1/2
(d) x
5. The values of a, b and c which make the function
continuous at x = 0 are
(a) , , b = 0
(b) , ,
(c) , ,
(d) None of these
6. The function f(x) = [x]
2
– [x
2
] (where [y] is the greatest integer function
less than or equal to y), is discontinuous at :
(a) all integers
(b) all integers except 0 and 1
(c) all integers except 0
(d) all integers except 1
7. The value of p for which the function
may be continuous at x = 0, is
(a) 1
(b) 2
(c) 3
(d) None of these
8. In the mean value theorem , if a = 0,
b = 1/2 and f (x) = x (x – 1) (x – 2), the value of c is –
(a)
(b)
(c)
(d)
9. If then at x = 0, f(x)
(a) has no limit
(b) is discontinuous
(c) is continuous but not differentiable
(d) is differentiable
10. where g is a continuous function then
does not exist if
(a) g(x) is any constant function
(b) g(x) = x
(c) g(x) = x
2
(d) g(x) = x h (x), where h(x) is a polynomial
11. Let f : R ? R be a function defined by f (x) = max {x, x
3
}. The set of all
points where f (x) is NOT differentiable is
(a) {-1, 1}
(b) {-1, 0}
(c) {0, 1}
(d) {-1, 0, 1}
12. The function is not defined atx = . The value of
f so that f is continuous at x = is
(a)
(b)
(c) 2
(d) None of these
13. If g is the inverse function of f and = sin x, then
is
(a)
(b)
(c)
(d)
14. Which of the following functions is differentiable at x = 0?
(a)
(b)
(c)
(d)
15. If the equation ............. + = 0
0, n 2, has a positive root x = , then the equation
+ (n – 1) + ......... + = 0 has a positive root,
which is
(a) greater than
(b) smaller than
(c) greater than or equal to
(d) equal to
16. If f (x) =
greatest integer less than or equal to x, then in order that f be continuous at x
=0, the value of k is
(a) equal to 0
(b) equal to 1
(c) equal to –1
(d) indeterminate
Read More
Related Exams
About this Document
4.68/5
Rating
Jan 15, 2025
Last updated
Document Description: DPP for JEE: Daily Practice Problems- Continuity & Differentiability for JEE 2025 is part of DPP: Daily Practice Problems for JEE Main & Advanced preparation.
The notes and questions for DPP for JEE: Daily Practice Problems- Continuity & Differentiability have been prepared according to the JEE exam syllabus. Information about DPP for JEE: Daily Practice Problems- Continuity & Differentiability covers topics
like and DPP for JEE: Daily Practice Problems- Continuity & Differentiability Example, for JEE 2025 Exam. Find important definitions, questions, notes, meanings, examples, exercises and tests below for DPP for JEE: Daily Practice Problems- Continuity & Differentiability.
Introduction of DPP for JEE: Daily Practice Problems- Continuity & Differentiability in English is available as part of our DPP: Daily Practice Problems for JEE Main & Advanced
for JEE & DPP for JEE: Daily Practice Problems- Continuity & Differentiability in Hindi for DPP: Daily Practice Problems for JEE Main & Advanced course.
Download more important topics related with notes, lectures and mock test series for JEE
Exam by signing up for free. JEE: Continuity & Differentiability Practice Questions - DPP for JEE
Description
Full syllabus notes, lecture & questions for Continuity & Differentiability Practice Questions - DPP for JEE - JEE | Plus excerises question with solution to help you revise complete syllabus for DPP: Daily Practice Problems for JEE Main & Advanced | Best notes, free PDF download
Information about DPP for JEE: Daily Practice Problems- Continuity & Differentiability
In this doc you can find the meaning of DPP for JEE: Daily Practice Problems- Continuity & Differentiability defined & explained in the simplest way possible. Besides explaining types of
DPP for JEE: Daily Practice Problems- Continuity & Differentiability theory, EduRev gives you an ample number of questions to practice DPP for JEE: Daily Practice Problems- Continuity & Differentiability tests, examples and also practice JEE
tests
Related Searches
Semester Notes
,Viva Questions
,Continuity & Differentiability Practice Questions - DPP for JEE
,Summary
,Free
,Sample Paper
,Important questions
,practice quizzes
,Objective type Questions
,shortcuts and tricks
,mock tests for examination
,Continuity & Differentiability Practice Questions - DPP for JEE
,Continuity & Differentiability Practice Questions - DPP for JEE
,ppt
,past year papers
,Exam
,video lectures
,MCQs
,Previous Year Questions with Solutions
,Extra Questions
,study material
;
Additional Information about DPP for JEE: Daily Practice Problems- Continuity & Differentiability for JEE Preparation
DPP for JEE: Daily Practice Problems- Continuity & Differentiability Free PDF Download
The DPP for JEE: Daily Practice Problems- Continuity & Differentiability is an invaluable resource that delves deep into the core of the JEE exam.
These study notes are curated by experts and cover all the essential topics and concepts, making your preparation more efficient and effective.
With the help of these notes, you can grasp complex subjects quickly, revise important points easily,
and reinforce your understanding of key concepts. The study notes are presented in a concise and easy-to-understand manner,
allowing you to optimize your learning process. Whether you're looking for best-recommended books, sample papers, study material,
or toppers' notes, this PDF has got you covered. Download the DPP for JEE: Daily Practice Problems- Continuity & Differentiability now and kickstart your journey towards success in the JEE exam.
Importance of DPP for JEE: Daily Practice Problems- Continuity & Differentiability
The importance of DPP for JEE: Daily Practice Problems- Continuity & Differentiability cannot be overstated, especially for JEE aspirants.
This document holds the key to success in the JEE exam.
It offers a detailed understanding of the concept, providing invaluable insights into the topic.
By knowing the concepts well in advance, students can plan their preparation effectively.
Utilize this indispensable guide for a well-rounded preparation and achieve your desired results.
DPP for JEE: Daily Practice Problems- Continuity & Differentiability Notes
DPP for JEE: Daily Practice Problems- Continuity & Differentiability Notes offer in-depth insights into the specific topic to help you master it with ease.
This comprehensive document covers all aspects related to DPP for JEE: Daily Practice Problems- Continuity & Differentiability.
It includes detailed information about the exam syllabus, recommended books, and study materials for a well-rounded preparation.
Practice papers and question papers enable you to assess your progress effectively.
Additionally, the paper analysis provides valuable tips for tackling the exam strategically.
Access to Toppers' notes gives you an edge in understanding complex concepts.
Whether you're a beginner or aiming for advanced proficiency, DPP for JEE: Daily Practice Problems- Continuity & Differentiability Notes on EduRev are your ultimate resource for success.
DPP for JEE: Daily Practice Problems- Continuity & Differentiability JEE Questions
The "DPP for JEE: Daily Practice Problems- Continuity & Differentiability JEE Questions" guide is a valuable resource for all aspiring students preparing for the
JEE exam. It focuses on providing a wide range of practice questions to help students gauge
their understanding of the exam topics. These questions cover the entire syllabus, ensuring comprehensive preparation.
The guide includes previous years' question papers for students to familiarize themselves with the exam's format and difficulty level.
Additionally, it offers subject-specific question banks, allowing students to focus on weak areas and improve their performance.
Study DPP for JEE: Daily Practice Problems- Continuity & Differentiability on the App
Students of JEE can study DPP for JEE: Daily Practice Problems- Continuity & Differentiability alongwith tests & analysis from the EduRev app,
which will help them while preparing for their exam. Apart from the DPP for JEE: Daily Practice Problems- Continuity & Differentiability,
students can also utilize the EduRev App for other study materials such as previous year question papers, syllabus, important questions, etc.
The EduRev App will make your learning easier as you can access it from anywhere you want.
The content of DPP for JEE: Daily Practice Problems- Continuity & Differentiability is prepared as per the latest JEE syllabus.
|
© EduRev
|
Education Revolution
|
|
Signup to see your scores
go up within 7 days!
Access 1000+ FREE Docs, Videos and Tests
Takes less than 10 seconds to signup