Pure 1 - Chapter 9+10
thomas.payne
Created on November 27, 2023
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Related
New
Old
LO's
Knowledge check 1
Ans A
Ans B
AS
Chapter 9 - Trigonometric Ratios
y dπ₯
A = lw
b2-4ac
Rules
AS
y dπ₯
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9.1 - The cosine rule
Rules
AS
y dπ₯
A = lw
b2-4ac
9.1 - The cosine rule
Rules
AS
y dπ₯
A = lw
b2-4ac
9.1 - The cosine rule
Rules
AS
y dπ₯
A = lw
b2-4ac
9.1 - The cosine rule
Rules
AS
y dπ₯
A = lw
b2-4ac
9.2 - The sine rule
Rules
AS
y dπ₯
A = lw
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9.2 - The sine rule
AS
y dπ₯
A = lw
b2-4ac
9.2 - The sine rule
Rules
AS
y dπ₯
A = lw
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9.2 - The sine rule
Rules
AS
y dπ₯
A = lw
b2-4ac
9.3 - Areas of triangles
Rules
AS
y dπ₯
A = lw
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9.3 - Areas of triangles
Rules
AS
y dπ₯
A = lw
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9.4 - Solving triangle problems
Rules
AS
y dπ₯
A = lw
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9.4 - Solving triangle problems
Rules
AS
y dπ₯
A = lw
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9.4 - Solving triangle problems
Rules
AS
y dπ₯
A = lw
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9.4 - Solving triangle problems
Rules
AS
y dπ₯
A = lw
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9.5 - Graphs of sine, cosine and tangent
Rules
AS
y dπ₯
A = lw
b2-4ac
9.5 - Graphs of sine, cosine and tangent
Rules
AS
y dπ₯
A = lw
b2-4ac
9.5 - Graphs of sine, cosine and tangent
Rules
AS
y dπ₯
A = lw
b2-4ac
9.5 - transforming trigonometric graphs
Rules
AS
y dπ₯
A = lw
b2-4ac
9.5 - transforming trigonometric graphs
Rules
AS
y dπ₯
A = lw
b2-4ac
9.5 - transforming trigonometric graphs
Rules
AS
y dπ₯
A = lw
b2-4ac
9.5 - transforming trigonometric graphs
Rules
AS
y dπ₯
A = lw
b2-4ac
9.5 - transforming trigonometric graphs
Related
New
Old
LO's
Knowledge check 2
Knowledge check 1
Ans A
Ans A
Ans B
Ans B
AS
Chapter 10 - Trig
y dπ₯
A = lw
b2-4ac
Rules
AS
y dπ₯
A = lw
b2-4ac
10.1 - Angles in all four quadrants
Rules
AS
y dπ₯
A = lw
b2-4ac
10.1 - Angles in all four quadrants
Rules
AS
y dπ₯
A = lw
b2-4ac
10.1 - Angles in all four quadrants
Rules
AS
y dπ₯
A = lw
b2-4ac
10.1 - Angles in all four quadrants
Rules
AS
y dπ₯
A = lw
b2-4ac
10.1 - Angles in all four quadrants
Rules
AS
y dπ₯
A = lw
b2-4ac
10.2 - Exact values of trigonometric ratios
Rules
AS
y dπ₯
A = lw
b2-4ac
10.3 - Trigonometric identities
Rules
AS
y dπ₯
A = lw
b2-4ac
10.3 - Trigonometric identities
Rules
AS
y dπ₯
A = lw
b2-4ac
10.3 - Trigonometric identities
Rules
AS
y dπ₯
A = lw
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10.3 - Trigonometric identities
Rules
AS
y dπ₯
A = lw
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10.4 - Simple trigonometric equations
Rules
AS
y dπ₯
A = lw
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10.4 - Simple trigonometric equations
Rules
AS
y dπ₯
A = lw
b2-4ac
10.4 - Simple trigonometric equations
Rules
AS
y dπ₯
A = lw
b2-4ac
10.4 - Simple trigonometric equations
Rules
AS
y dπ₯
A = lw
b2-4ac
10.5 - Harder Trigonometric equations
Rules
AS
y dπ₯
A = lw
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10.5 - Harder Trigonometric equations
Rules
AS
y dπ₯
A = lw
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10.6 - Equations and identities
Rules
AS
y dπ₯
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10.6 - Equations and identities
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
Foundation
Higher
A Level
Foundation
Higher
A Level
Foundation
Higher
A Level
Foundation
Higher
A Level
Foundation
Higher
A Level
Foundation
Higher
A Level
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
Foundation
Higher
A Level
Foundation
Higher
A Level
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
Foundation
Higher
A Level
Chapter 9 Learning Objectives
- Use the cosine rule to find a missing side or angle.
- Use the sine rule to find a missing side or angle.
- Find the area of a triangle using an appropriate formula.
- Solve problems involving triangles.
- Sketch the graphs of the sine, cosine and tangent functions.
- Sketch simple transformations of these graphs.
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
Chapter 10 Learning Objectives
- Calculate the sine, cosine and tangent of any angle.
- Know the exact trigonometric ratios for 30Β°, 45Β° and 60Β°
- Know and use the relationships
- Solve simple trigonometric equations of the forms sin ΞΈ = k,
- Solve more complicated trigonometric equations of the forms
- Solve trigonometric equations that produce quadratics.
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
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Shafi Goldwasser, an Israeli-American computer scientist, is renowned for her groundbreaking contributions to cryptography. Her co-invention of zero-knowledge proofs revolutionized the field, enabling individuals to prove their
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
Foundation
Higher
A Level
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
Foundation
Higher
A Level
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
y dπ₯
Logs
dx
dy
f(π₯+a)
b2-4ac
Foundation
Higher
A Level
Foundation
Higher
A Level
Foundation
Higher
A Level