NCERT Solutions for Class 12 Maths Chapter 9 Exercise 9.2 Differential Equations - PDF Download
JEE Mains & AdvancedNCERT solutions for class 12 maths chapter 9 exercise 9.2 Differential Equations explains how to find general and particular solutions of a differential equation. You will get to understand the concepts and definitions of general and particular solutions of a differential equation by going through the NCERT solutions for ex 9.2 class 12 maths provided by the academic team of mathematics. These solutions have been developed in such a way to provide you deep knowledge of the concepts for preparing exams.
There are 12 questions in ex 9.2 class 12 maths chapter 9 that require an understanding to verify the given explicit or implicit function is a solution of the corresponding differential equation. Some of the questions in this exercise are simple to attempt while some of the questions are complex to solve. Students need to have in-depth knowledge of the concept of differential equations to solve exercise questions with ease.
Ex 9.2 class 12 maths chapter 9 NCERT solutions are made available in PDF format. Students can download these free PDFs on the eSaral website to practice questions that will be helpful for scoring good marks in exams. Given below is the link to download the NCERT solutions PDF for ex 9.2 class 12 maths.
Topics Covered in Exercise 9.2 Class 12 Mathematics Questions
Class 12 maths chapter 9 exercise 9.2 NCERT solutions covers general and particular solutions of a differential equation. These topics are explained here for your convenience to solve exercise questions.
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General and Particular Solutions of a Differential Equation |
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General and Particular Solutions of a Differential Equation
A function which satisfies the given differential equation is called its solution.
General Solutions of a Differential Equation - The solution which contains as many arbitrary constants as the order of the differential equation is called a general solution.
Particular Solutions of a Differential Equation - The solution free from arbitrary constants is called particular solution.
Tips for Solving Exercise 9.2 Class 12 Chapter 9 Differential Equations
eSaral’s subject experts have provided some very useful tips to solve ex 9.2 class 12 maths chapter 9 Differential Equations.
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Students need to use rules and formulas from previous exercise to solve questions of ex 9.2 class 12 maths ch 9.
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You must comprehend the concepts of general and particular solutions of a differential equation before solving questions in ex 9.2 class 12 maths.
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Also, you need to solve examples and exercise questions to grasp the stepwise method for solving each question.
Importance of Solving Ex 9.2 Class 12 Maths Chapter 9 Differential Equations
You will be benefited by solving questions of ex 9.2 class 12 maths chapter 9 as these questions are solved in stepwise manner by subject experts of eSaral. Here, we have combined some of the benefits that you can check below.
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In NCERT solutions class 12 maths chapter 9 ex 9.2, our experienced faculties of maths have elaborated general and particular solutions of a differential equation in simple and precise language for understanding the concepts.
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All the answers provided in NCERT solutions are completely trustworthy as they are solved by experts of mathematics which you use while practicing the questions.
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Revising the concepts and solving the questions in ex 9.2 class 12 maths solutions will help you improve your time management skills and problem solving skills.
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NCERT solutions PDF for ex 9.2 class 12 maths are provided to download for free. You can download the PDF for practicing the questions which helps in achieving a good score in exams.
Frequently Asked Questions
Question 1. What are general solutions of a differential equation?
Answer 1. The solution which contains as many arbitrary constants as the order of the differential equation is called a general solution.
Question 2. Define particular solutions of a differential equation?
Answer 2. The solution free from arbitrary constants is called a particular solution.