Trigonometry

Introduction

Trigonometry is the study of relationships between sides and angles of triangles. The word comes from Greek: 'trigonon' (triangle) and 'metron' (measure). For ICSE Class 9, we focus on basic trigonometric ratios and their applications.

Trigonometric Ratios

In a right triangle ABC with right angle at B:

Let angle at A = θ. Then:

  • Side opposite to θ = BC = perpendicular (p)
  • Side adjacent to θ = AB = base (b)
  • Hypotenuse = AC = h

Six Trigonometric Ratios:

RatioNameFormula
sin θSineopposite/hypotenuse = p/h
cos θCosineadjacent/hypotenuse = b/h
tan θTangentopposite/adjacent = p/b
cot θCotangentadjacent/opposite = b/p
sec θSecanthypotenuse/adjacent = h/b
cosec θCosecanthypotenuse/opposite = h/p

Relationships:

  • tan θ = sin θ / cos θ
  • cot θ = 1 / tan θ
  • cot θ = cos θ / sin θ
  • sec θ = 1 / cos θ
  • cosec θ = 1 / sin θ
<ICSEExample title="Find Trigonometric Ratios"> In a right triangle ABC, right-angled at B, AB = 3 cm, BC = 4 cm, and AC = 5 cm. Find sin A, cos A, and tan A. <Solution> For angle A: Opposite side (BC) = 4 cm Adjacent side (AB) = 3 cm Hypotenuse (AC) = 5 cm

sin A = BC/AC = 4/5 cos A = AB/AC = 3/5 tan A = BC/AB = 4/3 </Solution> </ICSEExample>

Standard Angles

The trigonometric ratios for 0°, 30°, 45°, 60°, and 90° must be memorised.

Angle θsin θcos θtan θcot θsec θcosec θ
010Not defined1Not defined
30°1/2√3/21/√3√32/√32
45°1/√21/√211√2√2
60°√3/21/2√31/√322/√3
90°10Not defined0Not defined1
<ICSEExample title="Evaluate Expression"> Evaluate: sin 60° × cos 30° + cos 60° × sin 30° <Solution> = (√3/2 × √3/2) + (1/2 × 1/2) = (3/4) + (1/4) = 1 </Solution> </ICSEExample>

Simple Trigonometric Identities

Identity 1: sin²A + cos²A = 1

Proof: In right triangle ABC, right-angled at B: sin A = BC/AC, cos A = AB/AC sin²A + cos²A = BC²/AC² + AB²/AC² = (BC² + AB²)/AC² = AC²/AC² = 1

Identity 2: 1 + tan²A = sec²A

Identity 3: 1 + cot²A = cosec²A

<ICSEExample title="Using Identity"> If sin A = 3/5, find cos A using identity. <Solution> sin²A + cos²A = 1 (3/5)² + cos²A = 1 9/25 + cos²A = 1 cos²A = 16/25 cos A = 4/5 (positive since A is acute) </Solution> </ICSEExample>

Simple 2D Problems

<ICSEExample title="Height of a Pole"> A pole casts a shadow of length 10√3 m when the suns elevation is 30°. Find the height of the pole. <Solution> Let height of pole = h tan 30° = h/(10√3) 1/√3 = h/(10√3) h = (10√3)/√3 = 10 m Height of pole = 10 m </Solution> </ICSEExample> <ICSEExample title="Distance Problem"> A ladder leaning against a wall makes an angle of 60° with the ground. If the foot of the ladder is 2.5 m from the wall, find the length of the ladder. <Solution> cos 60° = adjacent/hypotenuse = 2.5/length 1/2 = 2.5/length Length = 5 m </Solution> </ICSEExample>

Common Mistakes With Fixes

MistakeCorrection
Confusing sin and cos ratiosSin = opposite/hypotenuse, Cos = adjacent/hypotenuse
Forgetting that sin²A means (sin A)²sin²A = (sin A)², not sin(A²)
Mixing up standard angle valuesDraw a quick table or derive using special triangles
Using degrees in calculators incorrectlyEnsure calculator is in degree mode

ICSE Exam Focus

TopicMarks (approx.)Frequency
Trigonometric ratios of standard angles3-4 marksVery common
Trigonometric identities4 marksVery common
Simple 2D problems4-5 marksCommon
Evaluating expressions with trig ratios3 marksFrequently asked

Self-Test

Q1: If cos A = 12/13, find sin A and tan A.

Q2: Evaluate: cos² 45° + sin² 45°

Q3: Prove: (1 - sin²A) × sec²A = 1

Q4: A tree breaks due to storm and the broken part bends so that the top touches the ground making an angle of 60° with the ground. The distance from the foot of the tree to the point where the top touches the ground is 6 m. Find the height of the tree.

Q5: Find the value of: (sin 30° × cos 60°) + (cos 30° × sin 60°)

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