Maths Gcse Aqa Higher
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Scatter-Graphs-And-Correlation Aqa Higher2 主题
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Cumulative-Frequency-And-Box-Plots Aqa Higher4 主题
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Histograms Aqa Higher3 主题
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Statistical-Diagrams Aqa Higher5 主题
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3D-Pythagoras-And-Trigonometry Aqa Higher1 主题
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Sine-Cosine-Rule-And-Area-Of-Triangles Aqa Higher4 主题
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Pythagoras-And-Trigonometry Aqa Higher4 主题
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Area-And-Volume-Of-Similar-Shapes Aqa Higher1 主题
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Congruence-Similarity-And-Geometrical-Proof Aqa Higher5 主题
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Volume-And-Surface-Area Aqa Higher3 主题
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Circle-Theorems Aqa Higher7 主题
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Angles-In-Polygons-And-Parallel-Lines Aqa Higher3 主题
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Functions Aqa Higher3 主题
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Introduction Aqa Higher7 主题
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Percentages Aqa Higher3 主题
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Powers-Roots-And-Standard-Form Aqa Higher4 主题
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Prime-Factors-Hcf-And-Lcm Aqa Higher4 主题
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Number-Operations Aqa Higher10 主题
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Product-Rule-For-Counting Aqa Higher
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Systematic-Lists Aqa Higher
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Related-Calculations Aqa Higher
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Multiplication-And-Division Aqa Higher
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Addition-And-Subtraction Aqa Higher
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Negative-Numbers Aqa Higher
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Irrational-Numbers Aqa Higher
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Order-Of-Operations-Bidmas-Bodmas Aqa Higher
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Mathematical-Symbols Aqa Higher
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Product-Rule-For-Counting Aqa Higher
Angles-In-Cyclic-Quadrilaterals Aqa Higher
Exam code:8300
Cyclic quadrilaterals
Circle theorem: Opposite angles in a cyclic quadrilateral add up to 180°
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A quadrilateral that is formed by four points on the circumference of a circle, (a cyclic quadrilateral), will have pairs of opposite angles that add up to 180°
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To spot this theorem in a diagram
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look for quadrilaterals that have all four points on the circumference
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When explaining this theorem in an exam you must use the keywords:
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Opposite angles in a cyclic quadrilateral add up to 180°
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The theorem only works for cyclic quadrilaterals
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The diagram below shows a common scenario that is not a cyclic quadrilateral
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Examiner Tips and Tricks
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Cyclic quadrilaterals are often easy to spot in a busy diagram
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Mark on their angles (even if you think you don’t need them) as they may help you later on!
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Worked Example
The circle below has centre, O.
Find the value of 
.
Identify both the cyclic quadrilateral and the radius perpendicular to the chord
Add to the diagram as you work through the problem
The radius bisects the chord and so creates two congruent triangles
Use this to work out 72° (equal to the equivalent angle in the other triangle)
And 18° (angles in a triangle add up to 180°)
Then use that opposite angles in a cyclic quadrilateral add up to 180°
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