Examples of 'linear combinations' in a sentence
Meaning of "linear combinations"
Linear combinations refer to a mathematical concept where two or more quantities are multiplied by specific coefficients and then summed together. This concept is commonly used in linear algebra and is particularly important in vector space representation and solving systems of linear equations
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- plural of linear combination
How to use "linear combinations" in a sentence
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linear combinations
But linear combinations of a and b are going to create a plane.
So we would be having the linear combinations of nine vectors in.
Linear combinations of these two guys.
A total of n second linear combinations are obtained at this step.
Linear combinations of these basis functions.
Latent variables are linear combinations of the observed variables.
Let me show you a concrete example of linear combinations.
We are taking linear combinations of our column vectors.
It does not change all of the possible linear combinations.
Supermodes are linear combinations of the local modes.
The principal components are linear combinations.
These linear combinations are called the components.
These are all just linear combinations.
Linear combinations of semimartingales are semimartingales.
That is compatible with linear combinations.
See also
Or they are linear combinations of these vectors.
Solutions to this equation are linear combinations of.
These involve linear combinations of the variables measured.
And we know what all of the linear combinations mean.
Through the linear combinations of these few bandlets.
Show that the set of all linear combinations of.
Linear combinations of quantum states.
Which can be represented by linear combinations of the atomic orbitals.
Linear combinations of each other.
This equivalence explains why linear combinations are called polynomials.
Linear combinations of that guy.
These new variables are linear combinations of the original variables.
Linear combinations of the rows corresponds to multiplication of these expressions.
A set of all integral linear combinations of a finite number of vectors.
You can solve easily by using substitution or linear combinations.
So they are just linear combinations of these things up here.
At time all of the reachable states are linear combinations of and.
Of linear combinations of the inputs.
Polynomials and linear combinations.
They are linear combinations of the charged wino and charged higgsinos.
Be looking at their linear combinations.
We already had linear combinations so we might as well have a linear transformation.
Coefficients of the linear combinations.
Their linear combinations are.
The scan follows the values of these linear combinations.
This is all the possible linear combinations of the column vectors of a.
Two criteria have been compared for the selection of linear combinations.
The factors are defined as linear combinations of the observed variables.
Other linear combinations of these parameters can in principle be used for transmission.
The new variables are linear combinations of the old ones.
Linear combinations of measurements which allow to simplify the problem are presented and discussed.
So any vector here can be represented as linear combinations of these guys.
The concept of linear combinations is central to linear algebra and related fields of mathematics.
So these guys can definitely be represented as linear combinations of these guys.
Principal components are linear combinations of the original variables and are uncorrelated.
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Rotary tables linear system handling software
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