You can click on the subject wise links below to download the books that you are looking for in PDF format. You can download entire book in single click or each chapter individually in PDF. You can click on the links below to download the book that you want to read in Class We have provided options to download the full book or each chapter in PDF.
All books are available in English and Hindi medium so that all students can download and use the books for Class Just click on the link below and the book will save on your computer. For Grade 12 students NCERT textbooks are best for understanding various topics or even for preparing for their exams.
Our teachers recommend standard 12 students to read these textbooks while preparing for their exams or even for higher level competitive examinations. It is also important to note that in the board exams for class 12 most of the questions usually come from NCERT textbooks.
Sometimes questions directly come from the books itself. Some questions are being slightly modified to test problem solving skills of students. So, all students of Class 12 must understand the significance of these books. We have uploaded PDF versions of both these books along with solutions for better preparation. This mock test series has a comprehensive selection of relevant questions and their solutions.
Candidates in CBSE Board can take these free mock tests to practise and find areas where they need to improve for their board exams.
The CBSE book for class 12 maths includes a thorough explanation of each chapter of the curriculum. In addition, it includes an exercise-by-exercise solution that covers each topic and sub-topic.
Solutions like this help students gain a better understanding of each concept and improve their problem-solving skills.
A: Both books are good. If your concepts are hard rock then go for RD Sharma. If you want a book to build your concepts and practice easy questions, then go for RS Aggarwal. Aggarwal 2. Sharma 3. Oswaal Topicwise Markwise Questions. Furthermore, you learn methods of solving first order, first-degree differential equation.
There are various miscellaneous examples after these topics, which will help you to clear your doubts. Vectors typically denote quantities like displacement, force, velocity, weight, momentum, etc. Here, you will study the definition, basic concepts, operations and other topics associated with the vectors.
Furthermore, here is a list of topics that you will learn in this chapter —. Basic concepts of vector. Types of vectors. Addition of vectors. Multiplication of vectors by a scalar. Product of two vectors. Additionally, there are diagrams, examples and exercises with solutions to help you comprehend this topic better. Besides, every practice set has detailed solutions with diagrams for a better explanation. Following the chapter of vector algebra, you will now learn how to use it into three-dimensional geometry.
In this chapter, you will learn the basic concepts of 3D geometry, which includes the following —. Direction cosines and Direction Ratios of a line. Equation of a line in space.
The angle between two lines. The shortest distance between two lines. Plane surface. Co-planarity of two lines. The angle between two planes. The distance of a point from a plane. The angle between a line and a plane. Additionally, these topics are followed by different examples and summary section to conclude the chapter. Optimisation problems are a crucial section of mathematics, and one of its popular sub-types is linear programming.
You have already studied the concept of linear programming and its everyday applications. Moreover, in class 11, you have previously studied the same with the help of graphical representations. Additionally, in this chapter, you will learn about linear programming via graphical representations. There is only one topic included in this chapter, i. Under this section, there are various examples and exercises for you to solve. In the previous classes, you have already studied probability as a way of measuring uncertainty of outcomes during various experiments.
Hence, we have discussed the axiomatic approach coined by the Russian Mathematician, A. Moreover, we have treated probability as an outcome of experiments. Additionally, you have also studied the equivalence between classical theory and axiomatic theory, in case of similar outcomes. Furthermore, in this chapter, you will learn the concept of conditional probability, Bayes theorem, multiplication rule, and independent events. Additionally, the idea of a random variable, the probability distribution is also discussed here.
In the penultimate section of this chapter, you will study Binomial distribution.
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