Class 12 Integration Questions with Solutions (PDF)

The concept of Integration Questions with Solutions PDF Class 12 Maths plays a key role in mathematics and is widely applicable to both real-life situations and exam scenarios. It is one of the most important chapters for Class 12 students preparing for CBSE Boards, JEE Main, and other competitive exams. This page explains what integration is, key formulas, and common question types, and provides step-by-step integration solutions along with a handy PDF for offline practice and revision.

What Is Integration Questions with Solutions PDF Class 12 Maths?

Integration is the process of finding the area under a curve, or the antiderivative of a function. In Class 12 Maths, integration questions typically involve calculating definite integrals (with limits), indefinite integrals (without limits), and applying methods like substitution, integration by parts, and using partial fractions. You’ll find this concept applied in geometry (finding areas and volumes), physics (calculating displacement, work, or probability), and engineering problems.

Key Formula for Integration Questions with Solutions PDF Class 12 Maths

Here are some essential integration formulas for Class 12:

Integral	Formula	Notes
\(\int x^n dx\)	\(\frac{x^{n+1}}{n+1} + C\) (n ≠ -1)	Basic Power Rule
\(\int e^x dx\)	\(e^x + C\)	Exponential Function
\(\int \sin x dx\)	\(-\cos x + C\)	Trigonometric
\(\int \cos x dx\)	\(\sin x + C\)	Trigonometric
\(\int \frac{1}{x} dx\)	\(\ln|x| + C\)	Logarithmic Function

Cross-Disciplinary Usage

Integration is not only useful in Maths but also plays an important role in Physics, Computer Science, and daily logical reasoning. Students preparing for JEE or NEET will see its relevance in questions on displacement, area under graphs, and even statistics.

Types of Integration Questions in Class 12 Maths

Integration questions for Class 12 Maths (CBSE, NCERT, state boards, or JEE) generally fall into these categories:

• Indefinite integrals (basic, standard forms, or algebraic manipulation)
• Definite integrals (with upper and lower limits)
• Integration by substitution (changing the variable to simplify)
• Integration by parts (product of two functions)
• Partial fractions (breaking rational expressions)

Download: Integration Questions with Solutions PDF

To boost your offline revision and exam practice, you can quickly download Integration Questions with Solutions PDF for Class 12 Maths from Vedantu. This PDF includes question sets based on all major methods, with stepwise answers and explanations tailored for CBSE, JEE Main, and competitive exams. Print or save to your phone for last-minute preparation!

Step-by-Step Illustration

Here’s how to solve one of the most common integration questions seen in Class 12 exams:

Example: Find \(\int 2x^3 dx\)

1. Start with the given integral: \(\int 2x^3 dx\)

2. Bring the constant out: \(2 \int x^3 dx\)

3. Use the power rule: \(\int x^n dx = \frac{x^{n+1}}{n+1} + C\)

4. Apply it: \(2 \cdot \frac{x^{3+1}}{3+1} + C = 2 \cdot \frac{x^4}{4} + C = \frac{x^4}{2} + C\)

5. Final Answer: \(\int 2x^3 dx = \frac{x^4}{2} + C\)

Let’s try a substitution example commonly given in JEE:

Example: Find \(\int 2x \cos(x^2) dx\)

1. Let \(u = x^2\) → \(du = 2x dx\)

2. Substitute: \(\int \cos(u) du\)

3. Integrate: \(\sin u + C\)

4. Substitute back: \(\sin(x^2) + C\)

5. Final Answer: \(\int 2x \cos(x^2) dx = \sin(x^2) + C\)

Speed Trick or Vedic Shortcut

For some forms, like integrating rational functions with quadratic denominators, learn the “complete the square” method for faster substitution. For definite integrals with symmetric limits, always check if the function is odd or even—many odd functions directly integrate to zero across symmetric intervals.

Example Trick: If \( f(x) \) is odd, \(\int\limits_{-a}^{a} f(x) dx = 0\). Use this trick in MCQs for faster calculation!

Try These Yourself

• Integrate \( \int (3x^2 + 4) dx \)
• Evaluate \( \int\limits_{0}^{\pi} \sin x dx \)
• Integrate by parts: \( \int x e^x dx \)
• Break into partial fractions and integrate: \( \int \frac{1}{x^2-1} dx \)
• Try a substitution for: \( \int \frac{2x}{1+x^2} dx \)

Frequent Errors and Misunderstandings

• Forgetting the constant of integration (C) in indefinite integrals
• Not converting limits when changing the variable in definite integrals
• Confusing substitution and by parts steps
• Incorrect algebraic factorization in partial fractions

Relation to Other Concepts

The idea of integration connects with differentiation (it is the reverse operation), area calculations, and advanced calculus. Understanding integration also helps in mastering applications of integrals in physics and engineering.

Classroom Tip

A quick way to remember integration formulas is to use a formula sheet before practice. Vedantu’s teachers recommend solving at least 10 mixed integration questions daily for a month before exams. Watch methods of integration video explainers to boost confidence with step-based doubt resolution.

We explored Integration Questions with Solutions PDF Class 12 Maths — from definition, types, key formulas, tricks, and solved examples. Continue revising and practicing via Vedantu’s stepwise solutions for top marks in board and entrance exams!

Related Vedantu Resources

• Definite Integral (Solved Examples)
• Application of Integrals
• Methods of Integration (Tricks Guide)
• Integration by Parts Rule