例题 5.2

求矩阵 $A = 215 14 - 3 - 1 21$ 的逆.

解法一

对矩阵 $(A, E_{3})$ 作初等行变换：

(A, E_{3}) = 215 14 - 3 - 1 21 100010001 r_{1} \leftrightarrow r_{2} 125 41 - 3 2 - 1 1 010100001 r_{2} - 2 r_{1} r_{3} - 5 r_{1} 100 4 - 7 - 23 2 - 5 - 9 010 1 - 2 - 5 001 r_{3} - 3 r_{2} 100 4 - 7 - 2 2 - 5 6 01 - 3 1 - 2 1 001 r_{1} + 2 r_{3} r_{2} - 4 r_{3} 100 01 - 2 14 - 29 6 - 6 13 - 3 3 - 6 1 2 - 4 1 r_{3} + 2 r_{2} 100010 14 - 29 - 52 - 6 1323 3 - 6 - 11 2 - 4 - 7 - \frac{1}{52} r_{3} 100010 14 - 29 1 - 6 13 - \frac{23}{52} 3 - 6 \frac{11}{52} 2 - 4 \frac{7}{52} r_{2} + 29 r_{3} r_{1} - 14 r_{3} 100010001 \frac{10}{52} \frac{9}{52} - \frac{23}{52} \frac{2}{52} \frac{7}{52} \frac{11}{52} \frac{6}{52} - \frac{5}{52} \frac{7}{52}

故 $A^{- 1} = \frac{1}{52} 109 - 23 2711 6 - 5 7$ .

解法二

对矩阵 $(E _{3} A)$ 作初等列变换：

(E _{3} A) = 215100 14 - 3 010 - 1 21001 c_{1} \leftrightarrow c_{2} 14 - 3 010 215100 - 1 21001 c_{2} - 2 c_{1} c_{3} + c_{1} 14 - 3 010 0 - 7 111 - 2 0 06 - 2 011 c_{2} + c_{3} 14 - 3 010 0 - 1 91 - 1 1 06 - 2 011 - c_{2} c_{3} - 6 c_{2} \frac{1}{52} c_{3} 14 - 3 010 01 - 9 - 1 1 - 1 001 \frac{6}{52} - \frac{5}{52} \frac{7}{52} c_{1} - 4 c_{2} c_{2} + 9 c_{3} 10334 - 3 4 010 \frac{2}{52} \frac{7}{52} \frac{11}{52} 001 \frac{6}{52} - \frac{5}{52} \frac{7}{52} c_{1} - 33 c_{3} 100 \frac{10}{52} \frac{9}{52} - \frac{23}{52} 010 \frac{2}{52} \frac{7}{52} \frac{11}{52} 001 \frac{6}{52} - \frac{5}{52} \frac{7}{52}

所以 $A^{- 1} = \frac{1}{52} 109 - 23 2711 6 - 5 7$ .