Inverse Trigonometric Functions Exercise 2.1 Solutions

CategoriesClass 12MathsTagged , , , , , , , , , , , , , , , , , , , , , , ,
image_printPrint 9

Short Intro

In this post, students can find complete step-by-step solutions for Class 12 Maths Chapter 2 Exercise 2.1 – Inverse Trigonometric Functions based on the latest NCERT syllabus. This exercise covers principal values, domains and ranges of inverse trigonometric functions, and evaluation of inverse trigonometric expressions in a simple and exam-oriented format.


Quick Information Box

ItemDetails
BoardNCERT / CBSE
Class12
SubjectMathematics
ChapterInverse Trigonometric Functions
Exercise2.1
Main TopicsPrincipal Values

Concepts Used (Topics Covered)

  • Principal Value Branch
  • Inverse Sine Function
  • Inverse Cosine Function
  • Inverse Tangent Function
  • Inverse Cotangent Function
  • Inverse Secant Function
  • Inverse Cosecant Function
  • Domain & Range of Inverse Trigonometric Functions

The chapter explains principal value branches of inverse trigonometric functions.


Important Formulas

Principal Value Range of sin⁻¹x

sin1x[π2,π2]\sin^{-1}x\in\left[-\frac{\pi}{2},\frac{\pi}{2}\right]


Principal Value Range of cos⁻¹x

cos1x[0,π]\cos^{-1}x\in[0,\pi]


Principal Value Range of tan⁻¹x

tan1x(π2,π2)\tan^{-1}x\in\left(-\frac{\pi}{2},\frac{\pi}{2}\right)


Principal Value Range of cot⁻¹x

cot1x(0,π)\cot^{-1}x\in(0,\pi)


Questions & Step-by-step Solutions

Question 1

Find:

sin1(12)\sin^{-1}\left(-\frac{1}{2}\right)

Solution

We know:

sin(−π/6)=−1/2

Principal value range of:

sin⁻¹x

is:

[−π/2, π/2]

Therefore:

Answer = −π/6

Question 2

Find:

cos1(32)\cos^{-1}\left(\frac{\sqrt{3}}{2}\right)

Solution

We know:

cos(π/6)=√3/2

Principal value range of:

cos⁻¹x

is:

[0, π]

Therefore:

Answer = π/6

Question 3

Find:

cosec1(2)\cosec^{-1}(2)

Solution

We know:

cosec(π/6)=2

Therefore:

Answer = π/6

Question 4

Find:

tan1(3)\tan^{-1}(-\sqrt{3})

Solution

We know:

tan(−π/3)=−√3

Therefore:

Answer = −π/3

Question 5

Find:

cos1(12)\cos^{-1}\left(-\frac{1}{2}\right)

Solution

We know:

cos(2π/3)=−1/2

Since principal value range of cosine inverse is:

[0, π]

Therefore:

Answer = 2π/3

Question 6

Find:

tan1(1)\tan^{-1}(-1)

Solution

We know:

tan(−π/4)=−1

Therefore:

Answer = −π/4

Question 7

Find:

sec1(23)\sec^{-1}\left(-\frac{2}{\sqrt{3}}\right)

Solution

We know:

sec(5π/6)=−2/√3

Therefore:

Answer = 5π/6

Question 8

Find:

cot1(3)\cot^{-1}(\sqrt{3})

Solution

We know:

cot(π/6)=√3

Therefore:

Answer = π/6

Question 9

Find:

cos1(12)\cos^{-1}\left(-\frac{1}{\sqrt{2}}\right)

Solution

We know:

cos(3π/4)=−1/√2

Therefore:

Answer = 3π/4

Question 10

Find:

cosec1(2)\cosec^{-1}(-\sqrt{2})

Solution

We know:

cosec(−π/4)=−√2

Therefore:

Answer = −π/4

Question 11

Find the value of:

tan1(1)+cos1(12)+sin1(12)\tan^{-1}(1)+\cos^{-1}\left(-\frac{1}{2}\right)+\sin^{-1}\left(-\frac{1}{2}\right)

Solution

Using standard values:

tan⁻¹(1)=π/4
cos⁻¹(−1/2)=2π/3
sin⁻¹(−1/2)=−π/6

Adding:

π/4 + 2π/3 − π/6

LCM = 12

= 3π/12 + 8π/12 − 2π/12

Therefore:

Answer = 3π/4

Question 12

Find:

cos1(12)+2sin1(12)\cos^{-1}\left(\frac{1}{2}\right)+2\sin^{-1}\left(\frac{1}{2}\right)

Solution

Using standard values:

cos⁻¹(1/2)=π/3
sin⁻¹(1/2)=π/6

Hence:

π/3 + 2(π/6)
= π/3 + π/3

Therefore:

Answer = 2π/3

Question 13

If:

sin1x=y\sin^{-1}x=y

then:

Solution

Range of:

sin⁻¹x

is:

[−π/2, π/2]

Therefore correct option is:

(B)

Question 14

Evaluate:

tan1(3)sec1(2)\tan^{-1}(\sqrt{3})-\sec^{-1}(-2)

Solution

We know:

tan⁻¹(√3)=π/3

and:

sec⁻¹(−2)=2π/3

Therefore:

π/3 − 2π/3

Hence:

Answer = −π/3

Correct option:

(B)

Common Mistakes

  • Ignoring principal value ranges
  • Confusing sin⁻¹x with 1/sinx
  • Using wrong quadrant values
  • Forgetting domain restrictions
  • Wrong sign in inverse functions

Exam Tips

  • Memorize standard inverse trigonometric values.
  • Always check principal value branch.
  • Use unit circle for quick answers.
  • Practice simplification regularly.

Practice MCQs

MCQ 1

Principal value range of:

cos1x\cos^{-1}x

is:

A. [−π/2, π/2]
B. [0, π]
C. R
D. (−π, π)

Answer:

B. [0, π]

MCQ 2

Value of:

tan1(1)\tan^{-1}(1)

is:

A. π
B. π/2
C. π/4
D. 0

Answer:

C. π/4

MCQ 3

Value of:

sin1(12)\sin^{-1}\left(-\frac{1}{2}\right)

is:

A. π/6
B. −π/6
C. 5π/6
D. −5π/6

Answer:

B. −π/6

FAQ Section

What is principal value?

The value lying in the principal branch of inverse trigonometric function.


What is the range of sin⁻¹x?

[π2,π2]\left[-\frac{\pi}{2},\frac{\pi}{2}\right]


Is sin⁻¹x equal to 1/sinx?

No.

sin⁻¹x means inverse sine function.

What is the range of tan⁻¹x?

(π2,π2)\left(-\frac{\pi}{2},\frac{\pi}{2}\right)


CTA (Call To Action)

📘 Prepare Smarter with MyMockMate!

✅ Chapter-wise NCERT Solutions
✅ Important Notes & MCQs
✅ Online Mock Tests
✅ Instant Result & Analysis
✅ CBSE Board Preparation

Start learning now on MyMockMate

image_printPrint 9

About the author

Leave a Reply

Your email address will not be published. Required fields are marked *