Introductory Linear Algebra/System of linear equations

Proof. Outline: There is a reverse process (i.e. performing the ERO with its reverse process together, in arbitrary orders, will have no effect on matrix) for each type of EROs, which is also a ERO itself, as illustrated below:

• the reverse process of type I ERO ${\displaystyle {𝐫}_i\leftrightarrow {𝐫}_j}$ is also ${\displaystyle {𝐫}_i\leftrightarrow {𝐫}_j}$
• the reverse process of type II ERO ${\displaystyle k{𝐫}_i\to {𝐫}_i}$ is type II ERO ${\displaystyle \frac{1}{k}{𝐫}_i\to {𝐫}_i}$ (if ${\displaystyle k=0}$, this ERO is undefined, this is why ${\displaystyle k}$ must be nonzero for type II ERO, so that it is reversible)
• the reverse process of type III ERO ${\displaystyle k{𝐫}_j+{𝐫}_i\to {𝐫}_i}$ is type III ERO ${\displaystyle -k{𝐫}_j+{𝐫}_i\to {𝐫}_i}$

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Proof. Outline: It suffices to show that the solution set is unchanged if we perform one ERO. E.g.

• Type I ERO:

$${\displaystyle \text{Compare }\{\begin{array}{c}x+2y=3\\ 4x+5y=6\end{array}\text{ and }\{\begin{array}{c}4x+5y=6\\ x+2y=3\end{array}}$$

• Type II ERO:

$${\displaystyle \text{Compare }\{\begin{array}{c}x+2y=3\\ 4x+5y=6\end{array}\text{ and }\{\begin{array}{c}kx+2ky=3k\\ 4x+5y=6\end{array}\iff \{\begin{array}{c}x+2y=3\\ 4x+5y=6\end{array}(k\ne 0)}$$

• Type III ERO:

$${\displaystyle \text{Compare }\{\begin{array}{c}x+2y=3\\ 4x+5y=6\end{array}\text{ and }\{\begin{array}{cc}x+2y=3& (1)\\ (4+k)x+(5+2k)y=6+3k& (2)\end{array}}$$ ${\displaystyle (1)-k(2):}$ $${\displaystyle (4+k-k)x+(5+2k-2k)y=6+3k-3k⟺4x+5y=6}$$

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Proof. The augmented matrix of the homogeneous system of ${\displaystyle m}$ linear equations in ${\displaystyle n}$ unknowns is ${\displaystyle A𝐱=\mathrm{𝟎}}$ is ${\displaystyle (A|\mathrm{𝟎})}$, and thus its RREF has the form ${\displaystyle (R|\mathrm{𝟎})}$ in which ${\displaystyle R}$ is of size ${\displaystyle m\times n}$, since there are ${\displaystyle m}$ linear equations and ${\displaystyle n}$ unknowns.

If ${\displaystyle R}$ has a leading one in each of the first ${\displaystyle n}$ columns, then there are at least ${\displaystyle n}$ rows in ${\displaystyle R}$. However, ${\displaystyle R}$ has only ${\displaystyle m<n}$ rows, a contradiction. Thus, the homogeneous SLE does not have a unique solution.

Since a SLE can either have no solutions (which is impossible for a homogeneous SLE), a unique solution (which is impossible in this case), or infinitely many solutions, it follows that the homogeneous SLE must have infinitely many solutions, and thus have a nontrivial solution.

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