Computing characteristic polynomial of $4 times 4$ matrix

Question

Given the following matrix
$$A = begin{bmatrix} 1 & -3 & 0 & 3 \ -2 & -6 & 0 & 13 \ 0 & -3 & 1 & 3 \ -1 & -4 & 0 & 8end{bmatrix}$$
I need to calculate $|lambda I - A|$.
I get to a very complicated determinant. Is there an easier way? The answer says it’s $(lambda - 1)^4$.

Bernard · Answer

Hint:
First expand along the 3rd column:
$$lambda I-A= begin{vmatrix}
lambda-1 &3&0&-3 \ 2&lambda+6& 0&-13 \ 0&3&lambda-1&-3\ 1&4&0&lambda-8
end{vmatrix}=(lambda-1)begin{vmatrix}
lambda-1 &3&-3 \ 2&lambda+6& -13 \   1&4&lambda-8
end{vmatrix}$$
Now, either you apply directly Sarrus' rule, or you simplify the 3rd order determinant (we'll denote it $D$) with elementary operations to make a determinant with more zeros:
$$D=begin{vmatrix}
lambda-1 &3&0 \ 2&lambda+6&lambda-7  \ 1&4&lambda-4
end{vmatrix}=begin{vmatrix}
lambda-1 &3&0 \ 0&lambda-2 &1-lambda\ 1&0&lambda-4
end{vmatrix}.$$

Jneven · Answer

$$lambda I- A=
begin{bmatrix}
lambda -1&3&0&-3 \
2&lambda + 6&0&-13 \
0&3&lambda -1&-3 \
1&4&0&lambda-8
end{bmatrix}
 $$
By developing the determinant using the third column, we'll have:
$$det(lambda I -A)=  (lambda -1) cdot begin{bmatrix}
lambda -1&3&-3 \
2&lambda + 6&-13 \
1&4&lambda-8
end{bmatrix} $$  $$=  (lambda -1)left( (lambda -1)cdot begin{bmatrix}lambda + 6&-13 \ 4& lambda-8 end{bmatrix} - 3 cdot begin{bmatrix}2&-13 \ 1& lambda-8 end{bmatrix} 
 +3 cdot begin{bmatrix}2&lambda +6 \ 1& 4 end{bmatrix} right)$$
by solving this, you will get your answer. I don't think it's too complicated to handle. notice that  $$begin{bmatrix}lambda + 6&-13 \ 4& lambda-8 end{bmatrix}, begin{bmatrix}2&-13 \ 1& lambda-8 end{bmatrix} 
, begin{bmatrix}2&lambda +6 \ 1& 4 end{bmatrix}$$ are three minors which you will have to find their determinant.

Computing characteristic polynomial of $4 times 4$ matrix

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