What is a radian and why is it used?

A radian is the angle subtended at the center of a circle by an arc equal in length to the radius. It is the natural unit for angles in calculus and advanced physics because it simplifies equation relations (e.g. d/dx[sinx] = cosx is only true when x is in radians).

What is the ASTC rule?

The "All Science Teachers Crazy" (or Cast) rule indicates where trig functions are positive: All are positive in Quad I, Sin in Quad II, Tan in Quad III, and Cos in Quad IV.

Back to Class XI Mathematics

Class XI Mathematics

Chapter 3: Trigonometric Functions

Standard NCERT & CBSE aligned study curriculum. Master concepts, track accuracy, revise weak areas, and challenge yourself with 9 customized practice modes.

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Syllabus Sections

Chapter Overview

Welcome to Class XI Mathematics: Trigonometric Functions. This chapter forms a core structural component of the math syllabus, designed to build analytical rigor and key formula models.

Use the detailed subtopic guide below to review standard definitions, key mathematical rules, and study guidelines.

Prerequisite Concepts

Right angled triangle trigonometryCircular coordinates basic

Detailed Subtopics Study Guide

Review detailed conceptual explanations, mathematical equations, and guidelines for each subtopic in this chapter:

1Angles degree and radian measures

Concept Explanation

Radian and degree are two units for measuring angles. A radian is the angle subtended at the center of a circle by an arc equal in length to the radius. A complete rotation is 360 degrees, which equals 2π radians.

Mathematical Representation

\pi \text{ radians} = 180^\circ \implies \text{Rad} = \text{Deg} \times \frac{\pi}{180}, \quad \text{Deg} = \text{Rad} \times \frac{180}{\pi}

Study Guideline: When converting, use 22/7 or 3.14159 for π. Keep in mind that derivative formulas in calculus assume the angle is in radians.

2Sign of trigonometric functions

Concept Explanation

The signs of trigonometric functions in the four quadrants are determined by the signs of the coordinates on a unit circle. This is summarized by the ASTC rule (All, Sine, Tangent, Cosine).

Mathematical Representation

\text{Q1: All (+)}, \quad \text{Q2: Sin/Csc (+)}, \quad \text{Q3: Tan/Cot (+)}, \quad \text{Q4: Cos/Sec (+)}

Study Guideline: Mnemonic: 'All Silver Tea Cups' or 'Add Sugar To Coffee'. Use this to determine the sign of functions for angles greater than 90°.

3Trigonometric identities for compound angles

Concept Explanation

Compound angle formulas calculate trigonometric functions of the sum or difference of two angles. They are used to derive double-angle and half-angle formulas.

Mathematical Representation

\sin(A \pm B) = \sin A\cos B \pm \cos A\sin B, \quad \cos(A \pm B) = \cos A\cos B \mp \sin A\sin B, \quad \tan(A \pm B) = \frac{\tan A \pm \tan B}{1 \mp \tan A\tan B}

Study Guideline: Note the sign change in the cosine compound formula: cos(A+B) has a minus sign, and cos(A-B) has a plus sign.

4Trigonometric equations solutions

Concept Explanation

Trigonometric equations contain trigonometric functions of unknown angles. They have principal solutions (bounded in [0, 2π)) and general solutions (which capture all possible periodic solutions using integer n).

Mathematical Representation

\sin\theta = \sin\alpha \implies \theta = n\pi + (-1)^n\alpha, \quad \cos\theta = \cos\alpha \implies \theta = 2n\pi \pm \alpha, \quad \tan\theta = \tan\alpha \implies \theta = n\pi + \alpha

Study Guideline: Express the equation in terms of a single trigonometric ratio before applying the general solution formulas.