Def of Row vector and column vector:

For any m-by-n matrix , the vectors ,,, in that are formed from the rows of are called the row vectors of , and the vectors ,,, in formed from the column of are called the column vectors of .

Def of row space, column space and null space:

If is a m-by-n matrix, then the subspace of spanned by row vectors of is called the row space of , and the subspace of spanned by the column vectors of is called the column space of . The solution set of , which is a subspace of , is called the null space of .

Row Space(rsp) of

Column Space(csp) of

Null Space of (The solution set of

Let be a m-by-n matrix, then

Lemma(矩陣column向量空間等於其像集):

Let be a m-by-n matrix then

proof of Lemma:

(By (1))

Theorem(由csp判斷線性方程是否有解):

A system of linear equations is consistent if and only if is in the column space of .

若有解意味著定在A的像集中,由上Lemma,b定在中 >

Proof:

Let be a m-by-n matrix and is consistent.

(by Lemma)

EX:

Theorem(求解AX=b的另一種方法):

If is any solution of a consistent linear system and if is a basis for N(A) then the general solution of is

where are scalars