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Circle theorems - Higher - OCRThe alternate segment theorem - Higher

Circles have different angle properties described by different circle theorems. Circle theorems are used in geometric proofs and to calculate angles.

Part of MathsGeometry and measure

The alternate segment theorem - Higher

The angle between a and a is equal to the angle in the alternate segment.

Circle contaning triangle with 2 pairs of identical angles, inside and outside the triangle

Example

Calculate the missing angles \(x\), \(y\) and \(z\).

Circle containing triangle at tangent

The angle in a semicircle is 90掳.

\(y = 90掳\)

Angles in a triangle add up to 180掳.

\(z = 180 - 30 - 90 = 60^\circ\)

Using the alternate segment :

angle \(x = z\)

\(x = 60^\circ\)

Proof

Let angle CDB = \(x\).

Circle on tangent, EDC, with triangle (ADB) inside circle and external angle x labelled

The angle between a tangent and the is 90掳.

Angle BDO = \(90 - x\)

Triangle DOB is an triangle so angle DBO is \(90 - x\).

Internal angles of triangle (ODB) labelled, 90-x

Angles in a triangle add up to 180掳.

Angle DOB = \(180 - \text{BDO} - \text{DBO}\)

Angle DOB = \(180 - (90 - x) - (90 - x) = 2x\)

The angle at the centre is double the angle at the circumference.

Circle on tangent, EDC, with triangle (ADB) inside circle. Internal angles of triangle (ODB) labelled, 90-x and 2x

Angle DAB = \(x\)

Therefore BDC = DAB.