Differentiability for Competitive Exam Success

Differentiability

Q. Which of the following functions is not differentiable at x = 0? f(x) = x^2 sin(1/x) for x ≠ 0 and f(0) = 0.

A. f(x)
B. g(x) =
C. x
D.
. h(x) = x^3
. k(x) = x^2

Solution

The function f(x) is not differentiable at x = 0 due to the oscillatory nature of sin(1/x) as x approaches 0.

Correct Answer: A — f(x)

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Differentiability MCQ & Objective Questions

Differentiability is a crucial concept in calculus that plays a significant role in various examinations. Understanding this topic not only helps in grasping advanced mathematical concepts but also enhances your problem-solving skills. Practicing MCQs and objective questions on differentiability is essential for scoring better in your exams. By solving these practice questions, you can identify important questions and strengthen your exam preparation.

What You Will Practise Here

Definition and significance of differentiability
Conditions for differentiability at a point
Relationship between continuity and differentiability
Derivatives and their applications
Higher-order derivatives
Graphical interpretation of differentiable functions
Common differentiability problems and solutions

Exam Relevance

The topic of differentiability is frequently tested in CBSE, State Boards, NEET, and JEE examinations. Students can expect questions that require them to determine whether a function is differentiable at a given point or to apply the concept of derivatives in real-world scenarios. Common question patterns include multiple-choice questions that assess both theoretical understanding and practical application of differentiability concepts.

Common Mistakes Students Make

Confusing differentiability with continuity
Overlooking the conditions required for a function to be differentiable
Misinterpreting the graphical representation of differentiable functions
Neglecting higher-order derivatives in complex problems
Failing to apply the correct formulas in objective questions

FAQs

Question: What is the difference between continuity and differentiability?
Answer: Continuity means a function does not have any breaks or jumps, while differentiability indicates that a function has a defined derivative at a point.

Question: How can I determine if a function is differentiable at a point?
Answer: A function is differentiable at a point if it is continuous at that point and the limit of the difference quotient exists.

Question: Why is practicing MCQs on differentiability important?
Answer: Practicing MCQs helps reinforce your understanding, improves problem-solving speed, and prepares you for the types of questions you will encounter in exams.

Now is the time to enhance your understanding of differentiability! Dive into our practice MCQs and test your knowledge to ensure you are well-prepared for your upcoming exams.