031 Review Part 2, Problem 10

(a) Suppose a $6\times 8$ matrix $A$ has 4 pivot columns. What is ${\text{dim Nul }}A?$ Is ${\text{Col }}A=\mathbb {R} ^{4}?$ Why or why not?

(b) If $A$ is a $7\times 5$ matrix, what is the smallest possible dimension of ${\text{Nul }}A?$

Foundations:
1. The dimension of ${\text{Col }}A$ is equal to the number of pivots in $A.$
2. By the Rank Theorem, if $A$ is a $m\times n$ matrix, then
${\text{dim Nul }}A+{\text{dim Col }}A=n.$

Solution:

(a)

Step 1:
Since $A$ has 4 pivot columns,
${\text{dim Col }}A=4.$

Step 2:
Since $A$ is a $6\times 8$ matrix, ${\text{Col }}A$ contains vectors in $\mathbb {R} ^{6}.$
Since a vector in $\mathbb {R} ^{6}$ is not a vector in $\mathbb {R} ^{4},$ we have
${\text{Col }}A\neq \mathbb {R} ^{4}.$

(b)

Step 2:
If we want to minimize ${\text{dim Nul }}A,$ we need to maximize ${\text{dim Col }}A.$
To do this, we need to find out the maximum number of pivots in $A.$
Since $A$ is a $7\times 5$ matrix, the maximum number of pivots in $A$ is 5.
Hence, the smallest possible value for ${\text{dim Nul }}A$ is
${\begin{array}{rcl}\displaystyle {{\text{dim Nul }}A}&=&\displaystyle {5-{\text{dim Col }}A}\\&&\\&\geq &\displaystyle {5-5}\\&&\\&\geq &\displaystyle {0.}\end{array}}$

Final Answer:
(a) ${\text{dim Col }}A=4$ and ${\text{Col }}A\neq \mathbb {R} ^{4}$
(b) $0$

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