### Definition of Incenter

1. n. The center of the circle inscribed in a triangle.

### Definition of Incenter

1. Noun. (alternative spelling of incentre) ¹

¹ Source: wiktionary.com

### Definition of Incenter

1. the point where the three lines bisecting the angles of a triangle meet [n -S]

### Medical Definition of Incenter

1. The center of the circle inscribed in a triangle. Source: Websters Dictionary (01 Mar 1998)

### Incenter Pictures

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### Lexicographical Neighbors of Incenter

 incensedincenserincensersincensesincensingincensionincensionsincensiveincensorincensors incensoryincensurableincentincentedincenter (current term)incentersincentingincentiveincentive optionincentive program incentive schemeincentive stock optionincentivelessincentivelyincentivesincentiviseincentivisedincentivisesincentivising

### Literary usage of Incenter

Below you will find example usage of this term as found in modern and/or classical literature:

1. Plane Geometry: With Problems and Applications by Herbert Ellsworth Slaught, Nels Johann Lennes (1918)
"The incenter. The point in which the bisectors of the ... of a triangle meet is called the incenter of the triangle. ..."

2. Elements of Plane and Spherical Trigonometry by Edwin Schofield Crawley (1907)
"... and the center of this circle is called the incenter of the triangle. ... be the incenter of ABC, then the following equation in areas is true ..."

3. Plane Geometry by William Betz, Harrison Emmett Webb, Percey Franklyn Smith (1912)
"The point O is called the incenter of the A ABC. EXERCISES 1. ... Does the incenter of a triangle always fall within the triangle ? 3. ..."

4. Plane Geometry by Mabel Sykes, Clarence Elmer Comstock (1918)
"Bisectors of the angles incenter NOTE. Be prepared to prove the theorems on ... The centroid, incenter, circumcenter, and orthocenter of an equilateral ..."

5. The Elements of Plane and Spherical Trigonometry by Thomas Ulvan Taylor, Charles Puryear (1902)
"Let О be the circumcenter and / the incenter of the triangle A ВС (Fig. 40). Draw the diameter DE perpendicular to BC. I is in the bisector of the angle BA ..."

6. Plane and Solid Geometry by Isaac Newton Failor (1906)
"553 Find the locus of the incenter of an inscribed triangle whose base is fixed. [Let I be the incenter. ZA is constant (§ 275) ; . •. ..."