All Courses
Get the App Signup / Login
Sign in Open App
JEE Exam  >  JEE Tests  >  Mathematics (Maths) Class 12  >  JEE Advanced Level Test: Continuity and Differentiability- 2 - JEE MCQ

JEE Advanced Level Test: Continuity and Differentiability- 2 - JEE MCQ


Test Description

30 Questions MCQ Test Mathematics (Maths) Class 12 - JEE Advanced Level Test: Continuity and Differentiability- 2

JEE Advanced Level Test: Continuity and Differentiability- 2 for JEE 2024 is part of Mathematics (Maths) Class 12 preparation. The JEE Advanced Level Test: Continuity and Differentiability- 2 questions and answers have been prepared according to the JEE exam syllabus.The JEE Advanced Level Test: Continuity and Differentiability- 2 MCQs are made for JEE 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for JEE Advanced Level Test: Continuity and Differentiability- 2 below.
Solutions of JEE Advanced Level Test: Continuity and Differentiability- 2 questions in English are available as part of our Mathematics (Maths) Class 12 for JEE & JEE Advanced Level Test: Continuity and Differentiability- 2 solutions in Hindi for Mathematics (Maths) Class 12 course. Download more important topics, notes, lectures and mock test series for JEE Exam by signing up for free. Attempt JEE Advanced Level Test: Continuity and Differentiability- 2 | 30 questions in 60 minutes | Mock test for JEE preparation | Free important questions MCQ to study Mathematics (Maths) Class 12 for JEE Exam | Download free PDF with solutions
JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 1
Save

The function  is continuous at 

Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 1

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 2
Save

If the function  is continuous at x = 0 then a = 

Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 2

1 Crore+ students have signed up on EduRev. Have you? Download the App
JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 3
Save

is continuous at x = 0 then

Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 3

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 4
Save

The function  is discontinuous at the points
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 4

f (x) is discontinuous when x2 - 3|x| + 2 = 0
⇒ |x|2 - 3|x| + 2 = 0 ⇒ |x| = 1, 2

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 5
Save

The values of a and b if f is continuous at x = 0, where 
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 5

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 6
Save

 is continuous at then k = 
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 6


JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 7
Save

so that f(x) is continuous at then
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 7

 By L-Hospital rule

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 8
Save

where [.] denotes greatest integer function and the function is continuous then
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 8

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 9
Save

is continuous everywhere. Then the  equation whose roots are a and b is
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 9


JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 10
Save

 where [x] is the greatest integer function. The function f (x) is
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 10

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 11
Save

The function  is continuous at exactly two  points then the possible values of ' a ' are
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 11

f (x) is continuous when x2 - ax + 3 =2 - x
⇒ x2 - a -1 x + 1 = 0. This must have two distinct roots ⇒ Δ > 0 ⇒ (a -1)2 - 4 > 0

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 12
Save

If the function  is continuous for every x ∈ R then
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 12

x2 + kx + 1>0 and x2 - k must not have any real root ;
∴ k2 - 4 < 0 &k < 0
⇒ k ∈ [-2, 2] and k < 0 ⇒ k ∈ [-2, 0)

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 13
Save

Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 13

|x| is not differentiable at x = 0
|x| is continuous at x = 0

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 14
Save

The function f (x) = cos-1 (cos x) is
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 14


f (x) is continuous at x = π, - π

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 15
Save

Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 15


JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 16
Save

then which is correct
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 16

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 17
Save

Let f (x) = |x - 1| + |x + 1|
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 17

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 18
Save

Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 18

Since g(x) = |x| is a continuous function and   so f is continuous function. In particular f is continuous at a = 1 and x = 4) f is clearly not differentiable at x = 4) Since g(x) = |x| is not differentiable at x = 0. Now

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 19
Save

The set of all points where the function  is differentiable is
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 19

 is not differentiable only at x = 0

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 20
Save

If   then derivative of f(x) at x = 0 is
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 20

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 21
Save

If f : R → R be a differentiable function, such that f (x + 2y) = f (x) + f (2y) + 4xy for all x, y ∈ R then
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 21

f (x + 2y) = f (x) + f (2 y) + 4xy for x, y ∈ R putting x = y = 0, we get f (0) = 0

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 22
Save

Let f be a differentiable function satisfying the condition for all 
, then f ' (x) is equal to
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 22

 replacing x and y both by 1, we get


JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 23
Save

The function is not differentiable at
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 23

By verification f ' (2 -) ≠ f ' (2 +)
∴ f(x) is not differentiable at x = 2

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 24
Save

then set of all points where f is differentiable is 
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 24

The function is clearly differentiable except possible at x = 2, 3

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 25
Save

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 26
Save

Let h(x) = min {x, x2} for  Then which of the following is correct
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 26


From the graph it is clear that h is continuous. Also h is differentiable except possible at x = 0 & 1


so h is not differentiable at 1
similarly h' (0 +)= 0 but h ' (0 - ) = 1

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 27
Save

If f (x + y) = 2f (x) f (y) for all x, y ∈ R where f ' (0) = 3 and f (4) = 2, then f ' (4) is equal to
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 27


JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 28
Save

If  and f ' (0) = -1, f (0) = 1, then f (2) =
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 28

Take  f (x) = ax+ b

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 29
Save

Let f (x) be differentiable function such that and y. If 
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 29

JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 30
Save

Let f : R → R be a function defined by f (x) = min {x + 1, |x| + 1}, Then which of the following is true?
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 2 - Question 30

204 videos|288 docs|139 tests
Join Course
Information about JEE Advanced Level Test: Continuity and Differentiability- 2 Page
In this test you can find the Exam questions for JEE Advanced Level Test: Continuity and Differentiability- 2 solved & explained in the simplest way possible. Besides giving Questions and answers for JEE Advanced Level Test: Continuity and Differentiability- 2, EduRev gives you an ample number of Online tests for practice

Top Courses for JEE

204 videos|288 docs|139 tests
Join Course
Download as PDF

Top Courses for JEE

Important Questions for JEE Advanced Level Test: Continuity and Differentiability- 2

Find all the important questions for JEE Advanced Level Test: Continuity and Differentiability- 2 at EduRev.Get fully prepared for JEE Advanced Level Test: Continuity and Differentiability- 2 with EduRev's comprehensive question bank and test resources. Our platform offers a diverse range of question papers covering various topics within the JEE Advanced Level Test: Continuity and Differentiability- 2 syllabus. Whether you need to review specific subjects or assess your overall readiness, EduRev has you covered. The questions are designed to challenge you and help you gain confidence in tackling the actual exam. Maximize your chances of success by utilizing EduRev's extensive collection of JEE Advanced Level Test: Continuity and Differentiability- 2 resources.

JEE Advanced Level Test: Continuity and Differentiability- 2 MCQs with Answers

Prepare for the JEE Advanced Level Test: Continuity and Differentiability- 2 within the JEE exam with comprehensive MCQs and answers at EduRev. Our platform offers a wide range of practice papers, question papers, and mock tests to familiarize you with the exam pattern and syllabus. Access the best books, study materials, and notes curated by toppers to enhance your preparation. Stay updated with the exam date and receive expert preparation tips and paper analysis. Visit EduRev's official website today and access a wealth of videos and coaching resources to excel in your exam.

Online Tests for JEE Advanced Level Test: Continuity and Differentiability- 2 Mathematics (Maths) Class 12

Practice with a wide array of question papers that follow the exam pattern and syllabus. Our platform offers a user-friendly interface, allowing you to track your progress and identify areas for improvement. Access detailed solutions and explanations for each test to enhance your understanding of concepts. With EduRev's Online Tests, you can build confidence, boost your performance, and ace JEE Advanced Level Test: Continuity and Differentiability- 2 with ease. Join thousands of successful students who have benefited from our trusted online resources.
© EduRev
Education Revolution
Follow Us
Signup to see your scores go up within 7 days!
Access 1000+ FREE Docs, Videos and Tests
Takes less than 10 seconds to signup