NCERT Solutions of Class 12 Maths Chapter 2: NCERT Math Solutions for Grade 12 The chapter 2 offered here is a crucial component of class 12 board test preparation. It might make it extremely simple for you to comprehend every idea in chapter 2. This NCERT Class 12 Maths Ch 2 Solutions will answer all of your problems regarding the inverse trigonometric function topic questions. Therefore, class 12 NCERT Solutions Maths ch 2 Inverse Trigonometric Functions is a fantastic study resource, according to subject teachers and CBSE top students.
You can succeed in the board test by working through the NCERT Solutions. Because it contains a variety of exam resources, including practise questions, answers, activities using unresolved questions, and more. You may effectively understand the full Inverse Trigonometric Function Ex 2.1 & 2.2 with the help of these resources. NCERT Solutions for Class 12 Maths Chapter 2 Inverse Trigonometric Functions Exercise 2.1, 2.2 in English & Hindi media have been compiled for your convenience.
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NCERT Solutions of Class 12 Maths Chapter 2 Inverse Trigonometric Functions
|Inverse trigonometric functions are used to find the measure of an angle in a right triangle, given the ratio of the side lengths. The inverse trigonometric functions are denoted by an “arc” notation, such as arctan(x), arccos(x), and arcsin(x).|
The inverse sine function, denoted as arcsin(x) or sin^-1(x), finds the measure of the angle in radians that has a sine equal to x. The domain of arcsin(x) is [-1, 1], and the range is [-π/2, π/2].
The inverse cosine function, denoted as arccos(x) or cos^-1(x), finds the measure of the angle in radians that has a cosine equal to x. The domain of arccos(x) is [-1, 1], and the range is [0, π].
The inverse tangent function, denoted as arctan(x) or tan^-1(x), finds the measure of the angle in radians that has a tangent equal to x. The domain of arctan(x) is all real numbers, and the range is (-π/2, π/2].
The inverse cotangent function, denoted as arccot(x) or cot^-1(x), finds the measure of the angle in radians that has a cotangent equal to x. The domain of arccot(x) is all real numbers, and the range is (0, π).
The inverse secant function, denoted as arcsec(x) or sec^-1(x), finds the measure of the angle in radians that has a secant equal to x. The domain of arcsec(x) is (-∞, -1) U (1, ∞) and the range is (0, π) or (π, 2π)
The inverse cosecant function, denoted as arccosec(x) or cosec^-1(x), finds the measure of the angle in radians that has a cosecant equal to x. The domain of arc cosec(x) is (-∞, -1) U (1, ∞) and the range is (-π/2, π/2)
Note: The inverse trigonometric functions are not defined for certain values of x, such as x = 1 or x = -1 for the inverse cosine and inverse secant functions, respectively.
Also, the inverse trigonometric functions are the inverse of the trigonometric functions, when restricted to their domains, and trigonometric functions are not one-to-one function, so they are not invertible everywhere, that’s why we restrict the domain of inverse trigonometric functions.
Inverse trigonometric functions is Chapter 2 of Class 12 Math. Calculus relies heavily on this chapter on inverse trigonometric functions to determine various integrals. This chapter is also utilised in other fields, such as science and engineering. You can learn some basic information about the limitations on the domains and ranges of trigonometric functions as well as some simple instances of their features from this chapter on the inverse trigonometric function.
The vast array of questions with solutions will help candidates understand the topics by using these NCERT Solutions. Therefore, practise your fundamental knowledge of inverse trigonometric functions by regularly completing the Class 12 Maths NCERT Solutions Inverse Trigonometric Function Ex 2.1, Ex 2.2.
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|Chapter Name||Inverse Trigonometric Functions|
NCERT Solutions for Class 12 Maths Ch 2 – Fully Solved Exercises
The top-notch NCERT Solutions for Class 12 Maths that are offered here are suitable for students who are enrolled in classes through a variety of boards, including CBSE, UP, MP, Uttarakhand, Gujarat, and many more. Exercise-by-exercise NCERT solutions to Chapter 2 of 12th-class mathematics on inverse trigonometric functions can help you ace your exam preparation. You may get these NCERT Solutions for Class 12 Ch 2 PDF for free from this page if you wish to practise more and more in an offline setting.
For the purpose of resolving your questions and enhancing your topic understanding to the maximum, we have assembled NCERT Solutions for Class 12 Maths Chapter 2 Inverse Trigonometric Functions Solved Exercises created by subject experts. Additionally, using the Class 12 Ch 2 Mathematics NCERT Solutions can help you become more accurate, quick, efficient, and problem-solving savvy. Use the 12th Class Maths Ch 2 NCERT Solutions offered here in both English and Hindi to gain a solid understanding of the fundamentals.
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Download NCERT Solution For Class 12th Chapter 2 From below Green link
|S.No||Chapter Name||Get Here|
|1||Relation And Function||Get Here|
|2||Inverse Trigonometric Functions||Get Here|
|5||Continuity And Differentiability||Get Here|
|6||Application Of derivatives||Get Here|
|8||App of integrals||Get Here|
|9||Differential Equations||Get Here|
|10||Vector Algebra||Get Here|
|11||Three Dimensional geometry||Get Here|
|12||Linear programing||Get Here|
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