Incorrect assumption of isosceles triangles.This also includes the inverse trigonometric functions. The incorrect trigonometric function is used and so the side or angle being calculated is incorrect. The missing side is calculated by incorrectly adding the square of the hypotenuse and a shorter side, or subtracting the square of the shorter sides. The only case of this is when both angles are 90^o. Opposite angles are the same for a cyclic quadrilateralĪs angles in the same segment are equal, the opposing angles in a quadrilateral are assumed to be equal.Angle at the centre is supplementary to opposing angleĪs the shape is a quadrilateral, the angle at the centre is assumed to be supplementary and add to 180^o.The angle ABC = 56^o as it is in the alternate segment to the angle CAE. Here, angle ABC is incorrectly calculated as 180 - 56 = 124^o. The angle is taken from 180^o which is a confusion with opposite angles in a cyclic quadrilateral. Opposite angles in a cyclic quadrilateral.Top tip: Use arrows to visualise which way the alternate segment angle appears: The chord BC is assumed to be parallel to the tangent and so the angle ABC is equal to the angle at the tangent.
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