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Melina
@li.xo_
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This basic trigonometry revision notes pdf provides a comprehensive overview of fundamental trigonometric concepts, ideal for GCSE students. It covers Pythagoras' theorem, trigonometric ratios, and their applications in right-angled triangles.
Key points:
12/10/2023
315
This page introduces essential concepts in trigonometry, focusing on the relationships between angles and sides in right-angled triangles. It covers Pythagoras' theorem and trigonometric ratios, providing a solid foundation for understanding trigonometric ratios for beginners.
The page begins by presenting Pythagoras' theorem, a fundamental principle in trigonometry. The theorem is expressed as a²+ b² = c², where c represents the hypotenuse of a right-angled triangle. This formula is crucial for calculating unknown side lengths in right-angled triangles.
Definition: Pythagoras' theorem states that in a right-angled triangle, the square of the hypotenuse is equal to the sum of squares of the other two sides.
The document then introduces the concept of trigonometric ratios, which are relationships between the sides of a right-angled triangle. These ratios are typically represented using Greek letters, with θ (theta) commonly used to denote angles.
Vocabulary: The sides of a right-angled triangle are labeled as:
- Adjacent: The side next to the angle of interest
- Opposite: The side across from the angle of interest
- Hypotenuse: The longest side, opposite the right angle
The page explains the three main trigonometric ratios: sine (sin), cosine (cos), and tangent (tan). These ratios are defined in terms of the sides of a right-angled triangle:
Highlight: The trigonometric ratios are:
- Sin θ = opposite / hypotenuse
- Cos θ = adjacent / hypotenuse
- Tan θ = opposite / adjacent
To help students remember these ratios, the mnemonic SOHCAHTOA is introduced. This memory aid is widely used in trigonometry GCSE worksheets and revision materials.
Example: In a right-angled triangle ABC with the right angle at C, if angle B is the angle of interest:
- Sin B = AC / AB (opposite / hypotenuse)
- Cos B = BC / AB (adjacent / hypotenuse)
- Tan B = AC / BC (opposite / adjacent)
This comprehensive overview provides students with the essential knowledge needed for solving trigonometric problems and understanding more advanced concepts in trigonometry. The clear explanations and visual representations make this an excellent resource for trigonometry revision pdf materials and GCSE trigonometry worksheets.
15
299
10/11
What is Trigonometry and how to solve it
If you have any questions then please feel free to message me,I am learning trigonometry aswell so any tips would be appreciated.If your struggling with trigonometry then corbettmaths.com has practice questions and answers on different slides.
24
447
S4
trigonometry and quadratics
area of triangle, triangle trig, sine rule, angel sine rule, 2 part sine rule, bearings, cosine rule, angel cosine rule. QUADRATICS- quadratic functions, quadratic graphs,
7
304
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Sin and Cos rules
made for N5 maths. Please check my page for more N5 maths topics.
4
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S4
Non-calculator Trig - National 5 Maths
jotter scan from the topic non-calculator trig from the national 5 maths course. Includes worked examples :)
6
436
S4/S5
Entire Nat 5 Maths Notes (Part 2): Applications
Part 2 of all the notes for National 5 Maths (adjusted for Covid so some topics may be missing)
9
284
11
Angles on Parallel Lines
Revision note
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Melina
@li.xo_
·
0 Follower
Follow
This basic trigonometry revision notes pdf provides a comprehensive overview of fundamental trigonometric concepts, ideal for GCSE students. It covers Pythagoras' theorem, trigonometric ratios, and their applications in right-angled triangles.
Key points:
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This page introduces essential concepts in trigonometry, focusing on the relationships between angles and sides in right-angled triangles. It covers Pythagoras' theorem and trigonometric ratios, providing a solid foundation for understanding trigonometric ratios for beginners.
The page begins by presenting Pythagoras' theorem, a fundamental principle in trigonometry. The theorem is expressed as a²+ b² = c², where c represents the hypotenuse of a right-angled triangle. This formula is crucial for calculating unknown side lengths in right-angled triangles.
Definition: Pythagoras' theorem states that in a right-angled triangle, the square of the hypotenuse is equal to the sum of squares of the other two sides.
The document then introduces the concept of trigonometric ratios, which are relationships between the sides of a right-angled triangle. These ratios are typically represented using Greek letters, with θ (theta) commonly used to denote angles.
Vocabulary: The sides of a right-angled triangle are labeled as:
- Adjacent: The side next to the angle of interest
- Opposite: The side across from the angle of interest
- Hypotenuse: The longest side, opposite the right angle
The page explains the three main trigonometric ratios: sine (sin), cosine (cos), and tangent (tan). These ratios are defined in terms of the sides of a right-angled triangle:
Highlight: The trigonometric ratios are:
- Sin θ = opposite / hypotenuse
- Cos θ = adjacent / hypotenuse
- Tan θ = opposite / adjacent
To help students remember these ratios, the mnemonic SOHCAHTOA is introduced. This memory aid is widely used in trigonometry GCSE worksheets and revision materials.
Example: In a right-angled triangle ABC with the right angle at C, if angle B is the angle of interest:
- Sin B = AC / AB (opposite / hypotenuse)
- Cos B = BC / AB (adjacent / hypotenuse)
- Tan B = AC / BC (opposite / adjacent)
This comprehensive overview provides students with the essential knowledge needed for solving trigonometric problems and understanding more advanced concepts in trigonometry. The clear explanations and visual representations make this an excellent resource for trigonometry revision pdf materials and GCSE trigonometry worksheets.
Maths - What is Trigonometry and how to solve it
If you have any questions then please feel free to message me,I am learning trigonometry aswell so any tips would be appreciated.If your struggling with trigonometry then corbettmaths.com has practice questions and answers on different slides.
15
299
1
Maths - trigonometry and quadratics
area of triangle, triangle trig, sine rule, angel sine rule, 2 part sine rule, bearings, cosine rule, angel cosine rule. QUADRATICS- quadratic functions, quadratic graphs,
24
447
0
Maths - Sin and Cos rules
made for N5 maths. Please check my page for more N5 maths topics.
7
304
0
Maths - Non-calculator Trig - National 5 Maths
jotter scan from the topic non-calculator trig from the national 5 maths course. Includes worked examples :)
4
153
0
Maths - Entire Nat 5 Maths Notes (Part 2): Applications
Part 2 of all the notes for National 5 Maths (adjusted for Covid so some topics may be missing)
6
436
0
Maths - Angles on Parallel Lines
Revision note
9
284
0
Average app rating
Pupils love Knowunity
In education app charts in 12 countries
Students have uploaded notes
iOS User
Philip, iOS User
Lena, iOS user
