# Acute bisectrix – Definition & Meaning

Conclusion

The term “acute bisectrix” is a mathematical term that refers to a line that bisects an angle in such a way that the resulting angles on either side of the line are acute angles. This line is an important concept in geometry and is used in a variety of mathematical applications.

## Definitions

An acute bisectrix is a line that bisects an angle in such a way that the resulting angles on either side of the line are acute angles. This means that the angle formed by the two resulting angles is less than 90 degrees.

## Origin

The term “acute bisectrix” comes from the Latin word “bisectrix,” which means “to cut in two.” The word “acute” refers to the fact that the resulting angles on either side of the line are acute angles.

## Meaning in different dictionaries

The term “acute bisectrix” is not commonly found in most dictionaries. However, it is defined in mathematical dictionaries as a line that bisects an angle in such a way that the resulting angles on either side of the line are acute angles.

## Associations

The acute bisectrix is an important concept in geometry and is used in a variety of mathematical applications. It is often used in the construction of geometric figures, such as triangles and quadrilaterals.

## Synonyms

Some synonyms for the term “acute bisectrix” include “acute angle bisector” and “bisecting line.”

## Antonyms

There are no antonyms for the term “acute bisectrix.”

## The same root words

The root words of “acute bisectrix” are “acute” and “bisectrix.”

## Example Sentences

1. The acute bisectrix of the angle divides the angle into two acute angles.
2. The construction of the triangle required the use of an acute bisectrix.
3. The acute bisectrix is an important concept in geometry.

The acute bisectrix is a mathematical concept that is used in a variety of applications. It is a line that bisects an angle in such a way that the resulting angles on either side of the line are acute angles. This concept is important in the construction of geometric figures and is an important concept in geometry.