Examples of 'null space' in a sentence
Meaning of "null space"
Null space, also known as kernel, refers to the set of vectors in linear algebra that, when multiplied by a given matrix, produce the zero vector. It represents the solutions to the homogeneous equation Ax = 0, where A is the given matrix and x is a vector of variables
How to use "null space" in a sentence
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null space
This right here is the null space.
So your null space will always contain that.
This is the basis of the null space.
So the null space of this matrix is the eigenspace.
That was the dimension of the null space.
The null space is just the solution to this.
Physical meaning of the null space of a matrix.
Properties of a representation of a basis for the null space.
So that was our null space right there.
Our null space we figured out in the last video.
And this is our null space.
That is our null space of that matrix right there.
The solution set is just the null space of r.
Left null space.
Relation to the left null space.
See also
Any vector in our left null space can be represented this way.
I am picking up a neutrino emission from within the null space.
So that is equal to the null space of the matrix.
Now the nullity is the dimension of your null space.
The null space is spanned by the last two columns of in the above example.
And this is going to be true of any null space problem we do.
That means that the null space of this matrix has got to be nontrivial.
So this will be some special member of your null space.
So we know that v is a member of the null space of this matrix right here.
We spent a good deal of time on the idea of a null space.
In the hope that a map of null space will prevent losing other ships.
The kernel of a linear transformation is analogous to the null space of a matrix.
The null space of this matrix is all of the vectors that satisfy this equation.
This is the null space.
It is theorized that the shuttle disappeared into a pocket of null space.
We have the null space.
I have the plan for deploying warning buoys around the null space.
This is saying that v is equal to the null space of this matrix right there.
Where this guy right here is a member of the null space.
The edge of the null space bubble has reached the outer limbs of the station.
A basis of the null space.
We find out that the null space of A contains more than just the zero vector.
We have done multiple problems where we found the null space of matrices.
The left null space of A is the same as the kernel of AT.
And this vector right here is clearly a member of my null space.
So this means that the null space of lambda In minus A is nontrivial.
Well the solution set of this is just the null space.
This is the null space of A.
Or you could say the orthogonal complement of the row space is the null space.
The null space is affecting the annular-confinement beam.
This corresponds to actuator movement in the null space of the mill matrix.
The null space of the matrix is thus one-dimensional.
But in this video let us actually calculate the null space for a matrix.
So it 's equal to the null space of this matrix right there.
These guys form a basis for the null space of B.
