module 1 tutorial
| Site: | Learn Hub LMS |
| Course: | Trigonometry Made Simple |
| Book: | module 1 tutorial |
| Printed by: | Guest user |
| Date: | Friday, 6 February 2026, 2:02 PM |
Description
Trigonometric Ratios
🔹 What are Trigonometric Ratios?
Trigonometric ratios show the relationship between the sides and angles of a right-angled triangle.
These ratios help us calculate unknown sides or angles using a known angle.
🔹 Parts of a Right-Angled Triangle
When an angle θ is given:
-
Hypotenuse → longest side (opposite the right angle)
-
Opposite → side opposite to angle θ
-
Adjacent → side next to angle θ
🔹 The Three Main Ratios
Sine (sin θ)
Opposite / Hypotenuse
Cosine (cos θ)
Adjacent / Hypotenuse
Tangent (tan θ)
Opposite / Adjacent
🔹 Easy Way to Remember (SOH–CAH–TOA)
-
SOH → sin = Opposite / Hypotenuse
-
CAH → cos = Adjacent / Hypotenuse
-
TOA → tan = Opposite / Adjacent
✅ Lesson 1 Key Takeaway
✔ Trigonometric ratios connect angles and sides
✔ sin, cos, and tan are used only in right-angled triangles
✔ SOH–CAH–TOA makes formulas easy to remember
1. Trignometric Ratios
Trigonometric Ratios
🔹 What are Trigonometric Ratios?
Trigonometric ratios show the relationship between the sides and angles of a right-angled triangle.
These ratios help us calculate unknown sides or angles using a known angle.
🔹 Parts of a Right-Angled Triangle
When an angle θ is given:
-
Hypotenuse → longest side (opposite the right angle)
-
Opposite → side opposite to angle θ
-
Adjacent → side next to angle θ
🔹 The Three Main Ratios
Sine (sin θ)
Opposite / Hypotenuse
Cosine (cos θ)
Adjacent / Hypotenuse
Tangent (tan θ)
Opposite / Adjacent
🔹 Easy Way to Remember (SOH–CAH–TOA)
-
SOH → sin = Opposite / Hypotenuse
-
CAH → cos = Adjacent / Hypotenuse
-
TOA → tan = Opposite / Adjacent
✅ Lesson 1 Key Takeaway
✔ Trigonometric ratios connect angles and sides
✔ sin, cos, and tan are used only in right-angled triangles
✔ SOH–CAH–TOA makes formulas easy to remember