Examples of 'is invertible' in a sentence
Meaning of "is invertible"
is invertible: In mathematics, particularly in the context of linear algebra, a matrix or transformation is said to be invertible if there exists an inverse that undoes the operation of the original matrix or transformation
How to use "is invertible" in a sentence
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is invertible
Conversely suppose that a is invertible with inverse b.
A matrix is invertible if and only if its determinant is nonzero.
A matrix has a logarithm if and only if it is invertible.
A function is invertible if and only if it is a bijection.
But let us say we know that f is invertible.
A morphism that is invertible in this sense is called an isomorphism.
Nonzero if and only if the matrix is invertible.
The stevedore knot is invertible but not amphichiral.
We only need show every nonzero x is invertible.
A chiral knot that is invertible is classified as a reversible knot.
Each one of these composite submatrices is invertible.
A function is invertible if and only if it contains no two ordered.
Check whether the test matrix is invertible.
A diagonal matrix is invertible if and only if its eigenvalues are nonzero.
Fix a prime number ℓ which is invertible in k.
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A matrix is invertible if and only if it is row equivalent to the identity matrix.
Groups are monoids for which every morphism is invertible.
We have now shown that f is invertible if and only if it is a bijection.
So that tells us that this is invertible.
Phase is invertible.
Consequently every orthogonal matrix is invertible.
The piece is invertible.
The operation used to encrypt the category key is invertible.
Assume that is invertible.
Is invertible and.
I want to show that this is invertible.
So f is invertible.
Every change of coordinate matrix is invertible.
Suppose is invertible.
This proposed precoding operation is invertible.
Hence it is invertible.
One can view a group G as a category with a single object in which every morphism is invertible.
Every function is invertible.
Each membrane is invertible in response to the direction of fluid flow through the lumen.
So we know that this is invertible.
Then ff is invertible in SS.
And hence that π is invertible.
If a knot is invertible and amphichiral, it is fully amphichiral.
The given matrix is invertible.
Furthermore, is invertible because it is a product of invertible matrices.
We know that a matrix is invertible.
Note that a triangular matrix is invertible precisely when its diagonal entries are invertible non-zero.
The Gabor transform is invertible.
Suppose A is invertible and that μ is an eigenvalue of A + δA.
And therefore it is invertible.
Group with a partial function replacing the binary operation ; Category in which every morphism is invertible.
Whenever is invertible.
So, we started with the idea that f is invertible.
Every positive definite matrix is invertible and its inverse is also positive definite.
Show that if is such that, then is invertible.
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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
