Angle

In geometry, an angle is formed by two lines that meet at a point. Each line is called a side of the angle, and the point they share is called the vertex of the angle. The term angle is used to denote both geometric figures and their size or magnitude as associated quantity. Angular measure or measure of angle are sometimes used to distinguish between the measure of the quantity and figure itself. The measurement of angles is intrinsically linked with circles and rotation, and this is often visualized or defined using the arc of a circle centered at the vertex and lying between the sides.

Fundamentals

There is no universally agreed definition of an angle. Angles can be conceived of and used in a variety of ways and while valid definitions may be given for specific contexts, it is difficult to give a single formal definition that is completely satisfactory in capturing all aspects of the general concept of angle.
One standard definition is that an angle is a figure consisting of two rays which lie in a plane and share a common endpoint. Alternatively, given such a figure, an angle might be defined as: the opening between the rays; the area of the plane that lies between the rays; or the amount of rotation about the vertex of one ray to the other.
More generally, angles are also formed wherever two line segments come together, such as at the corners of triangles and other polygons, or at the intersection of two planes or curves, in which case the rays lying tangent to each curve at the point of intersection define the angle.
It is common to consider that the sides of the angle divide the plane into two regions called the interior of the angle and the exterior of the angle. The interior of the angle is also referred to as an angular sector.

Notation and measurement

An angle symbol together with one or three defining points is used to identify angles in geometric figures. For example, the angle with vertex A formed by the rays and is denoted as or . The size or measure of the angle is denoted or.
In geometric figures and mathematical expressions, it is also common to use Greek letters or lower case Roman letters as variables to represent the size of an angle. Angular measure is commonly a scalar quantity, although in physics and some fields of mathematics, signed angles are used by convention to indicate a direction of rotation: positive for anti-clockwise; negative for clockwise.

Units of measurement

Angles are measured in various units, the most common being the degree, radian and turn. These units differ in the way they divide up a full angle, an angle where one ray, initially congruent to the other, performs a compete rotation about the vertex to return back to its starting position.
Degrees and turns are defined directly with reference to a full angle, which measures 1 turn or 360°. A measure in turns gives an angle's size as a proportion of a full angle and a degree can be considered as a subdivision of a turn. Radians are not defined directly in relation to a full angle, but in such a way that its measure is 2 rad, approximately 6.28 rad.
Historically the degree unit was chosen such as the straight angle or half the full angle was attributed the value of 180.

Addition and subtraction

The angle addition postulate states that if D is a point lying in the interior of then: This relationship defines what it means to add any two angles: their vertices are placed together while sharing a side to create a new larger angle. The measure of the new larger angle is the sum of the measures of the two angles. Subtraction follows from rearrangement of the formula.

Types

Common angles

An angle equal to 0° or not turned is called a zero angle.
An angle smaller than a right angle is called an acute angle.
An angle equal to turn is called a right angle. Two lines that form a right angle are said to be normal, orthogonal, or perpendicular.
An angle larger than a right angle and smaller than a straight angle is called an obtuse angle.
An angle equal to turn is called a straight angle.
An angle larger than a straight angle but less than 1 turn is called a reflex angle.
An angle equal to 1 turn is called a full angle, complete angle, round angle or perigon.
An angle that is not a multiple of a right angle is called an oblique angle.
Adjacent and vertical angles

Adjacent angles, are angles that share a common vertex and edge but do not share any interior points. In other words, they are angles side by side or adjacent, sharing an "arm".
Vertical angles are formed when two straight lines intersect at a point producing four angles. A pair of angles opposite each other are called vertical angles, opposite angles or vertically opposite angles, where "vertical" refers to the sharing of a vertex, rather than an up-down orientation. A theorem states that vertical angles are always congruent or equal to each other.
A transversal is a line that intersects a pair of lines and is associated with exterior angles, interior angles, alternate exterior angles, alternate interior angles, corresponding angles, and consecutive interior angles.

Combining angle pairs

When summing two angles, three special cases are named complementary, supplementary, and explementary angles.
Complementary angles are angle pairs whose measures sum to a right angle. If the two complementary angles are adjacent, their non-shared sides form a right angle. In a right-angle triangle the two acute angles are complementary as the sum of the internal angles of a triangle is 180°. The difference between an angle and a right angle is termed the complement of the angle.
Supplementary angles sum to a straight angle. If the two supplementary angles are adjacent, their non-shared sides form a straight angle or straight line and are called a linear pair of angles. The difference between an angle and a straight angle is termed the supplement of the angle.
Explementary angles or conjugate angles sum to a full angle. The difference between an angle and a full angle is termed the explement or conjugate of the angle.
Examples of non-adjacent supplementary angles include the consecutive angles of a parallelogram and opposite angles of a cyclic quadrilateral. For a circle with center O, and tangent lines from an exterior point P touching the circle at points T and Q, the resulting angles ∠TPQ and ∠TOQ are supplementary.

Polygon-related angles

An angle that is part of a simple polygon is called an interior angle if it lies on the inside of that simple polygon. A simple concave polygon has at least one interior angle, that is, a reflex angle. In Euclidean geometry, the measures of the interior angles of a triangle add up to radians, 180°, or turn; the measures of the interior angles of a simple convex quadrilateral add up to 2 radians, 360°, or 1 turn. In general, the measures of the interior angles of a simple convex polygon with n sides add up to radians, or 180 degrees, 2 right angles, or turn.
The supplement of an interior angle is called an exterior angle; that is, an interior angle and an exterior angle form a linear pair of angles. There are two exterior angles at each vertex of the polygon, each determined by extending one of the two sides of the polygon that meet at the vertex; these two angles are vertical and hence are equal. An exterior angle measures the amount of rotation one must make at a vertex to trace the polygon. If the corresponding interior angle is a reflex angle, the exterior angle should be considered negative. Even in a non-simple polygon, it may be possible to define the exterior angle. Still, one will have to pick an orientation of the plane to decide the sign of the exterior angle measure. In Euclidean geometry, the sum of the exterior angles of a simple convex polygon, if only one of the two exterior angles is assumed at each vertex, will be one full turn. The exterior angle here could be called a supplementary exterior angle. Exterior angles are commonly used in Logo Turtle programs when drawing regular polygons.
In a triangle, the bisectors of two exterior angles and the bisector of the other interior angle are concurrent.
In a triangle, three intersection points, each of an external angle bisector with the opposite extended side, are collinear.
In a triangle, three intersection points, two between an interior angle bisector and the opposite side, and the third between the other exterior angle bisector and the opposite side extended are collinear.
Some authors use the name exterior angle of a simple polygon to mean the explement exterior angle of the interior angle. This conflicts with the above usage.
Plane-related angles
The angle between two planes is called a dihedral angle. It may be defined as the acute angle between two lines normal to the planes.
The angle between a plane and an intersecting straight line is complementary to the angle between the intersecting line and the normal to the plane.
Measuring angles

Angle measurement encompasses both direct physical measurement using a measuring instrument such as a protractor, as well as the theoretical calculation of angle size from other known quantities. While the measurement of angles is intrinsically linked with rotation and circles, there are various perspectives as to exactly what is being measured, including amongst others: the amount of rotation about the vertex of one ray to the other; the amount of opening between the rays; or the length of the arc that subtends the angle at the centre of a unit circle.
The measurement of angles is inherently different from the measurement of other physical quantities such as length. Angles of special significance inform the systems and units of angular measurement, which is not the case for length where the units of measurement are arbitrary.
Broadly there are two approaches to measuring angles: relative to a reference angle ; and circular measurement.