Subtended arc

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In geometry, an arc subtended by an angle is a curve whose endpoints are on the angle's two rays. The precise meaning varies with the context. For example, one may speak of the arc of a circumference subtended by an angle whose vertex is a point on the circumference. A simple theorem of plane geometry states that equal angles subtend arcs of equal length in such a situation. The converse is also true: equal arc lengths subtend equal angles.

Similarly, a solid angle subtends a surface or a solid object. A solid angle is the area on a unit sphere cut out by the envelope of the vectors defining the perimeter of the surface or object. The solid angle delimited by a circular cone of opening angle (i.e. apex angle) θ is

2 \pi \left (1 - \cos {\theta \over 2} \right).

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