Asked by A
Prove : If an n*n matrix A can be expressed as a product of elementary matrices, Ax = b is consistent for every n*1 matrix b.
My thoughts on the question :
Since A can be expressed as a product of elementary matrices and elementary matrices are invertible, A can be expressed as a product of invertible matrices. Hence, A is invertible.
Now let us consider Ax = b
Since A is invertible and if A^-1 is it's inverse matrix,
(A^-1)Ax = (A^-1)b
x = (A^-1)b
Now how do we show that, Ax = b is consistent for every n*1 matrix b, in this case(when A is an n*n matrix which can be expressed as a product of elementary matrices)
Thank you!
My thoughts on the question :
Since A can be expressed as a product of elementary matrices and elementary matrices are invertible, A can be expressed as a product of invertible matrices. Hence, A is invertible.
Now let us consider Ax = b
Since A is invertible and if A^-1 is it's inverse matrix,
(A^-1)Ax = (A^-1)b
x = (A^-1)b
Now how do we show that, Ax = b is consistent for every n*1 matrix b, in this case(when A is an n*n matrix which can be expressed as a product of elementary matrices)
Thank you!
Answers
Answered by
oobleck
don't consistent matrices have non-zero determinants?
If A is invertible, its determinant is non-zero.
If A is invertible, its determinant is non-zero.
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