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# Angle bisector

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 Title: Angle bisector Author: World Heritage Encyclopedia Language: English Subject: Median (geometry) Collection: Publisher: World Heritage Encyclopedia Publication Date:

### Angle bisector

For the bisection theorem in measure theory, see ham sandwich theorem. For other uses, see bisect.

In geometry, bisection is the division of something into two equal or congruent parts, usually by a line, which is then called a bisector. The most often considered types of bisectors are the segment bisector (a line that passes through the midpoint of a given segment) and the angle bisector (a line that passes through the apex of an angle, that divides it into two equal angles).

In three dimensional space, bisection is usually done by a plane, also called the bisector or bisecting plane.

## Line segment bisector

A line segment bisector passes through the midpoint of the segment. Particularly important is the perpendicular bisector of a segment, which, according to its name, meets the segment at right angles. The perpendicular bisector of a segment also has the property that each of its points is equidistant from the segment's endpoints. Therefore Voronoi diagram boundaries consist of segments of such lines or planes.

In classical geometry, the bisection is a simple compass and straightedge, whose possibility depends on the ability to draw circles of equal radii and different centers. The segment is bisected by drawing intersecting circles of equal radius, whose centers are the endpoints of the segment and such that each circle goes through one endpoint. The line determined by the points of intersection of the two circles is the perpendicular bisector of the segment, since it crosses the segment at its center. This construction is in fact used when constructing a line perpendicular to a given line at a given point: drawing an arbitrary circle whose center is that point, it intersects the line in two more points, and the perpendicular to be constructed is the one bisecting the segment defined by these two points.

Brahmagupta's theorem states that if a cyclic quadrilateral is orthodiagonal (that is, has perpendicular diagonals), then the perpendicular to a side from the point of intersection of the diagonals always bisects the opposite side.

## Angle bisector

An angle bisector divides the angle into two angles with equal measures. An angle only has one bisector. Each point of an angle bisector is equidistant from the sides of the angle.

The interior bisector of an angle is the line, half-line, or line segment that divides an angle of less than 180° into two equal angles. The exterior bisector is the line that divides the supplementary angle (of 180° minus the original angle), formed by one side forming the original angle and the extension of the other side, into two equal angles.[1]

To bisect an angle with straightedge and compass, one draws a circle whose center is the vertex. The circle meets the angle at two points: one on each leg. Using each of these points as a center, draw two circles of the same size. The intersection of the circles (two points) determines a line that is the angle bisector.

The proof of the correctness of these two constructions is fairly intuitive, relying on the symmetry of the problem. It is interesting to note that the trisection of an angle (dividing it into three equal parts) cannot be achieved with the compass and ruler alone (this was first proved by Pierre Wantzel).

### Triangle

The interior angle bisectors of a triangle are concurrent in a point called the incenter of the triangle.

#### Angle bisector theorem

The angle bisector theorem is concerned with the relative lengths of the two segments that a triangle's side is divided into by a line that bisects the opposite angle. It equates their relative lengths to the relative lengths of the other two sides of the triangle.

#### Lengths

If the side lengths of a triangle are $a,b,c$, the semiperimeter $s=\left(a+b+c\right)/2,$ and A is the angle opposite side $a$, then the length of the internal bisector of angle A is[2]

$\frac\left\{2 \sqrt\left\{bcs\left(s-a\right)\right\}\right\}\left\{b+c\right\}.$

If the internal bisector of angle A in triangle ABC has length $t_a$ and if this bisector divides the side opposite A into segments of lengths m and n, then[2]

$t_a^2+mn = bc$

where b and c are the side lengths opposite vertices B and C; and the side opposite A is divided in the proportion b:c.

If the internal bisectors of angles A, B, and C have lengths $t_a, t_b,$ and $t_c$, then[3]

$\frac\left\{\left(b+c\right)^2\right\}\left\{bc\right\}t_a^2+ \frac\left\{\left(c+a\right)^2\right\}\left\{ca\right\}t_b^2+\frac\left\{\left(a+b\right)^2\right\}\left\{ab\right\}t_c^2 = \left(a+b+c\right)^2.$

No two non-congruent triangles share the same set of three internal angle bisector lengths.[4][5]

#### Integer triangles

There exist integer triangles with a rational angle bisector.

The internal angle bisectors of a convex quadrilateral either form a cyclic quadrilateral or they are concurrent. In the latter case the quadrilateral is a tangential quadrilateral.

#### Rhombus

Each diagonal of a rhombus bisects opposite angles.

## Bisectors of the sides of a polygon

### Triangle

#### Medians

Each of the three medians of a triangle is a line segment going through one vertex and the midpoint of the opposite side, so it bisects that side (though not in general perpendicularly). The three medians intersect each other at the centroid of the triangle, which is its center of mass if it has uniform density; thus any line through a triangle's centroid and one of its vertices bisects the opposite side. The centroid is twice as close to the midpoint of any one side as it is to the opposite vertex.

#### Perpendicular bisectors

The interior perpendicular bisector of a side of a triangle is the segment, falling entirely on and inside the triangle, of the line that perpendicularly bisects that side. The three perpendicular bisectors of a triangle's three sides intersect at the circumcenter (the center of the circle through the three vertices). Thus any line through a triangle's circumcenter and perpendicular to a side bisects that side.

In an acute triangle the circumcenter divides the interior perpendicular bisectors of the two shortest sides in equal proportions. In an obtuse triangle the two shortest sides' perpendicular bisectors (extended beyond their opposite triangle sides to the circumcenter) are divided by their respective intersecting triangle sides in equal proportions.[6]:Corollaries 5 and 6

For any triangle the interior perpendicular bisectors are given by $p_a=\tfrac\left\{2aT\right\}\left\{a^2+b^2-c^2\right\},$ $p_b=\tfrac\left\{2bT\right\}\left\{a^2+b^2-c^2\right\},$ and $p_c=\tfrac\left\{2cT\right\}\left\{a^2-b^2+c^2\right\},$ where the sides are $a \ge b \ge c$ and the area is $T.$[6]:Thm 2

The two bimedians of a convex quadrilateral are the line segments that connect the midpoints of opposite sides, hence each bisecting two sides. The two bimedians and the line segment joining the midpoints of the diagonals are concurrent at a point called the "vertex centroid" and are all bisected by this point.[7]:p.125

The four "maltitudes" of a convex quadrilateral are the perpendiculars to a side through the midpoint of the opposite side, hence bisecting the latter side. If the quadrilateral is cyclic (inscribed in a circle), these maltitudes are concurrent at (all meet at) a common point called the "anticenter".

Brahmagupta's theorem states that if a cyclic quadrilateral is orthodiagonal (that is, has perpendicular diagonals), then the perpendicular to a side from the point of intersection of the diagonals always bisects the opposite side.

## Area bisectors and perimeter bisectors

### Triangle

There are an infinitude of lines that bisect the area of a triangle. Three of them are the medians of the triangle (which connect the sides' midpoints with the opposite vertices), and these are concurrent at the triangle's centroid; indeed, they are the only area bisectors that go through the centroid. Three other area bisectors are parallel to the triangle's sides; each of these intersects the other two sides so as to divide them into segments with the proportions $\sqrt\left\{2\right\}+1:1$.[8] These six lines are concurrent three at a time: in addition to the three medians being concurrent, any one median is concurrent with two of the side-parallel area bisectors.

The [1] The sides of the deltoid are arcs of hyperbolas that are asymptotic to the extended sides of the triangle.[8]

A cleaver of a triangle is a line segment that bisects the perimeter of the triangle and has one endpoint at the midpoint of one of the three sides. The three cleavers concur at (all pass through) the center of the Spieker circle, which is the incircle of the medial triangle. The cleavers are parallel to the angle bisectors.

A splitter of a triangle is a line segment having one endpoint at one of the three vertices of the triangle and bisecting the perimeter. The three splitters concur at the Nagel point of the triangle.

Any line through a triangle that splits both the triangle's area and its perimeter in half goes through the triangle's incenter (the center of its incircle). There are either one, two, or three of these for any given triangle. A line through the incenter bisects one of the area or perimeter if and only if it also bisects the other.[9]

### Parallelogram

Any line through the midpoint of a parallelogram bisects the area[10] and the perimeter.

### Circle and ellipse

All area bisectors and perimeter bisectors of a circle or other ellipse go through the center, and any chords through the center bisect the area and perimeter. In the case of a circle they are the diameters of the circle.

## Bisectors of diagonals

### Parallelogram

The diagonals of a parallelogram bisect each other.