031 Review Part 2, Problem 3

Let $B={\begin{bmatrix}1&-2&3&4\\0&3&0&0\\0&5&1&2\\0&-1&3&6\end{bmatrix}}.$

(a) Is $B$ invertible? Explain.

(b) Define a linear transformation $T$ by the formula $T({\vec {x}})=B{\vec {x}}.$ Is $T$ onto? Explain.

Foundations:
1. A matrix $A$ is invertible if and only if ${\text{det }}A\neq 0.$
2. A linear transformation $T$ given by $T({\vec {x}})=A{\vec {x}},$ where $A$ is a $m\times n$ matrix, is onto
if and only if the columns of $A$ span $\mathbb {R} ^{m}.$

Solution:

(a)

Step 1:
We begin by calculating ${\text{det }}B.$
To do this, we use cofactor expansion along the second row first and then the first column.
So, we have
${\begin{array}{rcl}\displaystyle {{\text{det }}B}&=&\displaystyle {3(-1)^{2+2}\left\|{\begin{array}{ccc}1&3&4\\0&1&2\\0&3&6\end{array}}\right\|}\\&&\\&=&\displaystyle {3\cdot 1\cdot (-1)^{1+1}\left\|{\begin{array}{cc}1&2\\3&6\end{array}}\right\|}\\&&\\&=&\displaystyle {3(6-6)}\\&&\\&=&\displaystyle {0.}\end{array}}$

Step 2:
Since ${\text{det }}B=0,$ we know that $B$ is not invertible.

(b)

Step 1:
If $T$ was onto, then $B$ spans $\mathbb {R} ^{4}.$
This would mean that $B$ contains 4 pivots.

Step 2:
But, if $B$ has 4 pivots, then $B$ would be invertible, which is not true.
Hence, $T$ is not onto.

Final Answer:
(a) Since ${\text{det }}B=0,$ we have that $B$ is not invertible.
(b) No, see explaination above.

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