Let A be an invertible n\times n matrix, and let

Agaiepsh

Agaiepsh

Answered question

2021-12-02

Let A be an invertible n×n matrix, and let B be an n×p matrix. Show that the equation AX=B has a unique solution A1B.

Answer & Explanation

Heack1991

Heack1991

Beginner2021-12-03Added 13 answers

A is an invertible n×n matrix and B is an n×p matrix. A is invertible, therefore, matrix A1B satisfies AX=B. 
A(A1B)=1B =IB =B 
Say X be any solution of AX = B. By left multiplication of both sides by A1 we have: 
A1(AX)=A1B 
IX=A1B 
X=A1B 
AX=B has a unique solution. 

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