发布时间 : 星期二 文章线性代数第一章习题答案更新完毕开始阅读088fbe6eaf1ffc4ffe47acb8
12131?a12?a12?a23?a1?abac?cdaede; (1)02; (2)1?a23?a2; (3)bd1111?a32?a33?a3bfcf?efxyx?y2?1?432141(4)yx?yx;(5)?3364; (6)
3?121.
x?yxy54?1071232?498?2506212300解 (1)012r01?r2?r3012?0. 1111111?a12?a13?a1c1?a112(2)1?a3?c122?a23?a21?a212?0. 1?a2?ac2?c1333?a31?a312?abacae?bce?bce(3)bd?cdde?adfb?cer1?r2adf002e bfcf?efbc?er3?r102c0r?bce2?r3?adf02c0?4abcdef.
002exyx?yy(4)yx?yxcx?y1?c2?c2x?2y32x?2yx?yx
x?yxy2x?2yxyr2(x?y)yx?y3?r2r0x?y 2?r10?yy?x?(2x?2y)x(y?x)?(2x?2y)y2?2(x?y)(xy?x2?y2)??2(x3?y3).
(5)由于行列式中的第一列和第三列元素对应成比例,所以
2?1?43?336454?107?0.
?498?221412141 (6)
3?121r4?r1?r23?12112321232?0. 506200003.把下列行列式化为上三角形行列式,并计算其值:
5
3110?5110?51?0001?1313?1313?5?241016?520013?15?710002?4?1?32?4r1?r4?1?3318?5?103?16?273?5?10?9?13001325?10717?2?24?3?19511?31r3?3r4?7r3?r43r3?r1?r41r4?r2r2?2r1000?1?5231?95?18331?1113?15?7?3?4?12?52?2416373?5?10(1)
?521; (2)
?232?51010001?5000?9?13013.
解:
3?521r2?5r1r3?2r1r4?3r1(1)
?31?1911132?3r3?5r2?r35?118?103?1?20717?2?7
?52001325?1?8r3?12r2r4?8r25
??5?1?2?(?2)?2?40.
1?95?18(2)
?232
r4?r2?17r3000??312.
4.用行列式性质证明下列等式:
ax?byay?bzaz?bxax?byb1?c1b2?c2b3?c32222az?bx33xyzxzx; y(1)ay?bzaz?bxa1?kb1ax?by?(a?b)yay?bzc1c32222zb1b2b32222a1a3c1c2; c3(2)a2?kb2a3?kb3a2222c2?a2(a?1)(b?1)(c?1)(d?1)(a?2)(b?2)(c?2)(d?2)(a?3)(b?3)(c?3)(d?3)(3)
bcd?0.
证明 (1)左边按第1列分开xayzay?bzaz?bxax?byaz?bxyay?bzaz?bxax?byaz?bxax?by ay?bzax?by?bzay?bzx6
分别再按第2列xyaz?bxxzaz?bx分开a2yzax?by?abyxax?by
zxay?bzzyay?bzyyaz?bxyzaz?bx?abzzax?by?b2zxax?by
xxay?bzxyay?bz分别再按第3列xyzxyxxzzxzx3zx?a2byy?a2分开ayzbyxx?ab2yxy
zxyzxzzyyzyzyyzyyxyzzyzx?a2bzzx?ab2zzy?ab2zxx?b3zxy
xxyxxzxyyxyzxyzyzx?a3yzx?0?0?0?0?b3zxy
zxyxyzxyzxyz?a3yzx?(?1)2b3yzx?右边. zxyzxya1?kb1b1c1b1c12)左边
c2?c3abcca11?kc22?kb221a2b2c1?右边. a3?kb3b3c3a3b3c3c2a?14a?46a?9a22?c1a2a?12624b?4c22?2c13)左边
c3?c1b2b?16b?9b22b?126c22c?14c?46c?9c3?3c14?c1cc22c?126?0.
d22d?14d?46d?9d22d?1265.计算下列n阶行列式:
123?n?1n?103?n?1n(1)?1?20?n?1n;
??????1?2?3?0n?1?2?3??(n?1)0 7
((11a1a1?b1a1?a1bab?bbba?ba1?a2?01a2a1?a2?xa2?a2a21?120?2??2?2a2a2a2?b2?a2???bb???an?1an?1an?1?an?1?bn?1(2)1?1ab;
?(3)b?bb; ??0a2?01a??00???a3a3a2?a3?x?a3a3330??3?310220?00??363?00??????a1000?an?11???an?1an?1an?1???n?1n?1n?1?0nnn?n02n2n2n?2nn?n!.
(4)
?01a1a1a1?a1a1;
?an?11ananan?anan?1?an?x(5).
an?2?an?1?xan?1解 (1)
?1??1?1
?(n?1)???n?12(n?1)2(n?1)?n?10ri?r10i?2,3,?,n?0011a1a1?b1a1?a1a2a2a2?b2?a2???an?1an?1an?1?an?1?bn?1(2)1?1
?8