non-invertible Sentence Examples
- The matrix A is non-invertible because its determinant is zero.
- The matrix B is non-invertible as its columns are linearly dependent.
- The linear transformation represented by the matrix C is non-invertible because it does not have a one-to-one relationship between inputs and outputs.
- The function f(x) = x^3 is non-invertible because it does not have a unique inverse function.
- The encryption algorithm is non-invertible, meaning that it is impossible to recover the original plaintext from the encrypted ciphertext.
- The system of equations Ax = b has no unique solution because the matrix A is non-invertible.
- The homogeneous system of equations Ax = 0 has non-trivial solutions because the matrix A is non-invertible.
- The operator T is non-invertible since it does not preserve the multiplicative identity.
- The non-invertible nature of the matrix Q prevents us from finding its inverse explicitly.
- The non-invertible transformation F does not allow us to uniquely map elements back to their original domain.
non-invertible Meaning
Wordnet
non-invertible (a)
not admitting an additive or multiplicative inverse
Synonyms & Antonyms of non-invertible
No Synonyms and anytonyms found
FAQs About the word non-invertible
not admitting an additive or multiplicative inverse
No synonyms found.
No antonyms found.
The matrix A is non-invertible because its determinant is zero.
The matrix B is non-invertible as its columns are linearly dependent.
The linear transformation represented by the matrix C is non-invertible because it does not have a one-to-one relationship between inputs and outputs.
The function f(x) = x^3 is non-invertible because it does not have a unique inverse function.