At least one characteristic roots of every singular matrix is equal to____?
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Roots of every singular matrix is equal to zero
Step-by-step explanation:
Given
Every singular matrix have some characteristic roots
To find
The properties of singular matrix are,
The determinant of singular matrix is 0.
The singular matrix is defined only for square matrices.
A non-invertible matrix is referred to as singular matrix, i.e. when the determinant a matrix is zero, we cannot find its inverse.
Singular matrix is defined only for square matrices.
There will be no multiplicative inverse for this matrix.
So, the characteristic roots of every singular matrix is equal to zero
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