Trigonometry
Trigonometry is a branch of mathematics that studies the relationship between the angles and sides of a triangle—especially right-angled triangles. It is widely used in physics, engineering, architecture, navigation, astronomy and everyday problem-solving.
The core of trigonometry lies in the three most important ratios:
- Sine (sin) = Perpendicular / Hypotenuse
- Cosine (cos) = Base / Hypotenuse
- Tangent (tan) = Perpendicular / Base
Understanding these functions helps us measure heights, distances, angles, and the behavior of waves, light, sound, and motion. Trigonometry forms a foundation for advanced mathematics and scientific studies.
Basic Trigonometric Ratios
- sin 0° = 0
- sin 30° = 1/2
- sin 45° = √2/2
- sin 60° = √3/2
- sin 90° = 1
- cos 0° = 1
- cos 30° = √3/2
- cos 45° = √2/2
- cos 60° = 1/2
- cos 90° = 0
- tan 0° = 0
- tan 30° = 1/√3
- tan 45° = 1
- tan 60° = √3
- tan 90° = Undefined
Reciprocal Ratios
- cosec 30° = 2
- sec 60° = 2
- cot 45° = 1
- cosec 90° = 1
- cot 0° = Undefined
Pythagorean Identities
- If sin θ = 3/5, find cos θ (acute angle).
cos θ = 4/5. - If cos θ = 12/13, find sin θ.
sin θ = 5/13. - If tan θ = 4/3, find sec θ.
sec θ = 5/3.
Height and Distance Problems
- A ladder 10 m long makes a 60° angle with the ground.
Height = 10 × sin 60° = 10 × √3/2 = 5√3 m. - A tree casts a 20 m shadow when the sun’s angle of elevation is 30°.
Height = 20 × tan 30° = 20 × 1/√3 = 20/√3 m. - A building is 40 m tall. Angle of elevation from a point is 45°.
Distance = 40 m. - A person looks at the top of a tower at 60°, distance 30 m.
Height = 30 × tan 60° = 30√3 m. - Height of a tower is 50 m. Angle of depression is 30°.
Distance = 50 / tan 30° = 50√3 m.
Finding Unknown Sides
- In a right triangle, hypotenuse = 13, angle = 30°.
Opposite side = 13 × sin 30° = 6.5. - Hypotenuse = 10, base = 8.
Perpendicular = √(10² − 8²) = 6. - Base = 7, angle = 45°.
Opposite = 7 × tan 45° = 7. - If sin θ = 1/2, angle θ = 30°.
- If cos θ = √3/2, θ = 30°.
Trigonometric Identities
- sin² 30° + cos² 30° = 1
- tan 45° × tan 45° = 1
- cos 60° × sec 60° = 1
- sin 90° × cosec 90° = 1
- tan 30° × cot 30° = 1
Angle Simplifications
- sin (90° – 30°) = cos 30° = √3/2
- cos (90° – 45°) = sin 45° = √2/2
- tan (90° – 60°) = cot 60° = 1/√3
Trigonometric Values Using Triangles
- Triangle with sides 5, 12, 13. Find sin θ opposite to side 5.
sin θ = 5/13 - Same triangle, find cos θ for adjacent side 12.
cos θ = 12/13 - Same triangle, find tan θ.
tan θ = 5/12
Advanced Examples
- If sin A = 4/5, find tan A.
Perpendicular = 4, Hyp = 5 → Base = 3
tan A = 4/3 - If cos A = 3/5, find tan A.
Perpendicular = 4, Base = 3
tan A = 4/3 - If cot A = 5/12, find sin A.
Base = 12, Perpendicular = 5 → Hypotenuse = 13
sin A = 5/13 - If sec A = 5/4, find cos A.
cos A = 4/5 - If tan A = √3, angle A = 60°.
- If sin θ = cos θ,
θ = 45°.
Trigonometry is an essential mathematical tool that connects angles and distances. By mastering trigonometric ratios, identities, and height-distance applications, students can confidently solve real-life problems related to engineering, navigation, physics, architecture, and surveying. A strong understanding of trigonometry builds analytical thinking, accuracy, and a solid foundation for advanced mathematical concepts.
FAQs
- What is trigonometry mainly used for?
It is used to measure heights, distances, angles, and analyze waves, motion, light and engineering structures.
- What are the three basic trigonometric ratios?
Sine, Cosine, and Tangent.
- Why is trigonometry important for students?
It improves logical thinking and helps in science, engineering, and real-world calculations.
- What is the easiest way to learn trigonometry?
Start with memorizing standard angle values and understanding right-triangle ratios.
- Where is trigonometry used in real life?
In navigation, architecture, astronomy, physics, GPS technology, and construction.
- What is the meaning of 0° and 90° in trigonometry?
They represent special angles with standard trigonometric values.
- Can trigonometry be used without triangles?
Yes, it is used in waves, circular motion, oscillations, and periodic patterns.
- What is the most important identity?
sin²θ + cos²θ = 1
- Why is tan 90° undefined?
Because cos 90° = 0, and division by zero is impossible.
- Should I memorize trigonometric tables?
Yes, knowing standard angles (0°, 30°, 45°, 60°, 90°) is essential.
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