Answer to Question #249496 in Linear Algebra for parth

Question #249496

Let  be an invertible matrix. Select which of the following statements must be true:


1.A2 is invertible

2. Ax=B has a unique solution for any b

3. A can have more rows than columns

4.det(A) =0


1
Expert's answer
2021-10-11T16:01:35-0400

Matrix A is invertible if and only if it is a square matrix and "\\det A\\not=0."

1.Ais invertible.

 True.



"\\det(A^2)=\\det A(\\det A)\\not=0"



2. Ax=B has a unique solution for any b.

True.

If A is an n × n invertible matrix, then the system of linear equations given by Ax = B has the unique solution "x = A^{\u22121}B."


3. A can have more rows than columns.

False.

If A is invertible then A is a square matrix.


4.det(A) =0

False.

If matrix A is invertible then "\\det A\\not=0."


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