The Opposite(Antonym) of “nonsingular”
The antonyms of nonsingular are singular and zero determinant. The antonyms singular and zero determinant convey a different meaning from nonsingular in the context of mathematics.
Explore all Antonyms of “nonsingular”
- singular
- zero determinant
Definitions and Examples of singular, zero determinant
Learn when and how to use these words with these examples!
Refers to a matrix that has no inverse, or a linear equation system that has no unique solution.
Example
The matrix is singular, which means it has no inverse.
Refers to a matrix with a determinant of zero, which means it has no inverse.
Example
The determinant of the matrix is zero, which makes it a zero determinant matrix.
Key Differences: singular vs zero determinant
- 1Singular refers to a matrix that has no inverse or a linear equation system that has no unique solution.
- 2Zero determinant refers to a matrix with a determinant of zero, which means it has no inverse.
Effective Usage of singular, zero determinant
- 1Mathematics: Use these antonyms to describe matrices and linear equation systems.
- 2Academic Writing: Incorporate these antonyms in academic writing to demonstrate a clear understanding of mathematical concepts.
- 3Problem Solving: Utilize these antonyms to solve mathematical problems involving matrices and linear equation systems.
Remember this!
The antonyms singular and zero determinant convey a different meaning from nonsingular in the context of mathematics. Use these words to describe matrices and linear equation systems, incorporate them in academic writing, and utilize them to solve mathematical problems.