031 Review Part 3, Problem 11

Suppose $\{{\vec {u}},{\vec {v}}\}$ is a basis of the eigenspace corresponding to the eigenvalue 0 of a $5\times 5$ matrix $A.$

(a) Is ${\vec {w}}={\vec {u}}-2{\vec {v}}$ an eigenvector of $A?$ If so, find the corresponding eigenvalue.

If not, explain why.

(b) Find the dimension of ${\text{Col }}A.$

Foundations:
1. An eigenvector ${\vec {x}}$ of a matrix $A$ corresponding to the eigenvalue $\lambda$ is a nonzero vector such that
$A{\vec {x}}=\lambda {\vec {x}}.$
2. By the Rank Theorem, if $A$ is a $m\times n$ matrix, then
${\text{rank }}A+{\text{dim Col }}A=n.$

Solution:

(a)

Step 1:
First, notice
${\vec {w}}\neq {\vec {0}}$
since $\{{\vec {u}},{\vec {v}}\}$ is a basis of the eigenspace corresponding to the eigenvalue 0 of $A.$
Also, we have
$A{\vec {u}}={\vec {0}}$ and $A{\vec {v}}={\vec {0}}$
since ${\vec {u}}$ and ${\vec {v}}$ are eigenvectors of $A$ corresponding to the eigenvalue 0.

Step 2:
Now, we have
${\begin{array}{rcl}\displaystyle {A{\vec {w}}}&=&\displaystyle {A({\vec {u}}-2{\vec {v}})}\\&&\\&=&\displaystyle {A{\vec {u}}-2A{\vec {v}}}\\&&\\&=&\displaystyle {{\vec {0}}-2\cdot {\vec {0}}}\\&&\\&=&\displaystyle {{\vec {0}}.}\end{array}}$
Hence, ${\vec {w}}$ is an eigenvector of $A$ corresponding to the eigenvalue $0.$

(b)

Step 1:
Since $\{{\vec {u}},{\vec {v}}\}$ is a basis for the eigenspace of $A$ corresponding to the eigenvalue 0, we know that
${\text{dim Nul }}A=2.$

Step 2:
Then, by the Rank Theorem, we have
${\begin{array}{rcl}\displaystyle {5}&=&\displaystyle {{\text{dim Col }}A+{\text{dim Nul }}A}\\&&\\&=&\displaystyle {{\text{dim Col }}A+2.}\end{array}}$
Hence, we have
${\text{dim Col }}A=3.$

Final Answer:
(a) See solution above.
(b) ${\text{dim Col }}A=3$

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