Examples of 'invertible' in a sentence
Meaning of "invertible"
Invertible describes something that can be reversed or turned inside out
Show more definitions
- Capable of being inverted or turned.
- Able to be inverted, having an inverse.
- Capable of being changed or converted.
How to use "invertible" in a sentence
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invertible
An invertible matrix can be regarded as a change of basis.
A matrix has a logarithm if and only if it is invertible.
We will study invertible matrices in detail later.
A function that has an inverse is said to be invertible.
A function is invertible if and only if it is a bijection.
But let us say we know that f is invertible.
But it is not invertible as it is not surjective.
In general the differential need not be invertible.
A matrix is invertible if and only if its determinant is nonzero.
The polar decomposition of an invertible matrix is unique.
Groups of invertible elements of the residue ring modulo m.
Restricting domains of functions to make them invertible.
An invertible link is the link equivalent of an invertible knot.
Conversely suppose that a is invertible with inverse b.
To be invertible a function must be both an injection and a surjection.
See also
There are plenty of matrices that are not invertible.
A morphism that is invertible in this sense is called an isomorphism.
All positive definite matrices are also invertible.
The stevedore knot is invertible but not amphichiral.
Nonzero if and only if the matrix is invertible.
A chiral knot that is invertible is classified as a reversible knot.
We only need show every nonzero x is invertible.
Lie group of invertible linear transformations.
Each one of these composite submatrices is invertible.
A matrix that is not invertible is singular.
Functions that have inverse functions are said to be invertible.
As the sum of two invertible matrices.
Groups are monoids for which every morphism is invertible.
A function is invertible if and only if it contains no two ordered.
Check whether the test matrix is invertible.
The inverse of only invertible matrices can be found.
The supplementary process advantageously is an invertible process.
Vi f is left invertible and right invertible.
Fix a prime number ℓ which is invertible in k.
A square matrix that is not invertible is called singular or degenerate.
These transforms are generally designed to be invertible.
They also form an invertible submatrix.
Consequently every orthogonal matrix is invertible.
To produce said phase invertible composition.
Every positive definite matrix is therefore invertible.
But maybe we can construct an invertible matrix with it.
Invertible if and only if it is regular.
A transformation monoid whose elements are invertible is a permutation group.
A matrix is invertible if and only if it is row equivalent to the identity matrix.
So that tells us that this is invertible.
The countersubject is written in invertible counterpoint at the octave or fifteenth.
I want to show that this is invertible.
A diagonal matrix is invertible if and only if its eigenvalues are nonzero.
This operator is not always invertible.
Let and be invertible matrices.
