15.三元线性方程组x1?x2?x3?1的全部解为( A )。
?1???1???1???????A.0?k11?k20 (k1,k2为任意常数) ???????0??0??1????????0???1???1???????B.?1??k1?1??k2?0? (k1,k2为任意常数)
?1??0??1????????1???1???1???????C.?1??k1?1??k2?0? (k1,k2为任意常数)
?0??0??1????????1???1???1???????D.?1??k1?1??k2?0? (k1,k2为任意常数)
?1??0??1???????四、计算题:
1112?x21.解方程
232?1212.设D?00?1?1 1?131132323?0.
1x18?x112, 求 D. 0211000011?000?00?01?0?0?10?0000?1101100.
3.计算n阶行列式 D =
4.设矩阵A,B分别为
?23 1???1?3?1?????2?1A=00?1,B? 0 1 1.求 (AB?B). ?????10 2???1 0 1????? 6
?A15.设A???0??3 01?0??32????1?,A?,A?0?10,A. 其中试求1??2???A2??45??0 01???6.求x,y,t,u,使得3???xy??x6??4??????12u?????tu?????t?ux?y??. 3???0 1?1??1?33?????7.求矩阵X使XA=B,其中A?2 1 0,B?4 32. ?????1?1 1??1?25?????8.设X为n阶矩阵且满足AX - B = 0,试求X,其中
?111???011??001?A??????000???000??111101?n??123?n?1???1?012?n?2n?1???001?n?3n?2?1??,B???. ????????000??1?12?????1?01??000??9.设向量组?1?(1,1,0,1),?2?(2,1,1,3),?3?(1,1,0,0),?4?(0,1,?1,?1),,试求此向量组的秩和它的一个极大无关组.
?1?010.设A=??3??0
?1 2 0 7321003251?0??,求Rank(A). 0??1?五、求解下列各题:
?1??1?01.讨论齐次线性方程组AX=0,其中A=????0??0?01100001?00?????000?10110001??0??x1???x0??,X??2?.
?????????x?0??n?1??1)当n为何值时,此方程组有唯一零解,或有非零解?
2)求出当n = 4时方程组的全部解.
2.当?取何值时,下面线性方程组有非零解,并求出此时的全部解.
?(??2)x1 ?3x2 ?2x3?0??x1?(??8)x2 ?2x3?0. ??2x1 ?14x2?(??3)x3?0?3.试讨论下面方程组中?取何值时,它有唯一解,无穷多解或无解,并求出有解时的全部解:
7
?(1??)x1?x2?x3?1??x1?(1??)x2?x3?1 ?x?x?(1??)x?123?14.设向量?1?(1??,1,1),?2?(1,1??,1),?3?(1,1,1??),??(0,?,?2),
1) 当?取何值时,?可用?1,?2,?3线性表示; 2) 当?取何值时,?不能用?1,?2,?3线性表示. 5.当a,b为何值时,方程组
?x1?x2?x3?x4?x5?1?3x?2x?x?x?3x?a?12345 ? 有无穷多解?并求此时的全部解.
x?2x?2x?6x?3345?2??5x1?4x2?3x3?3x4?x5?b?x1?4x2?2x3??1?2x?3x?x?5x??7?1234 ?3x?7x?x?5x??8234?1??x2?x3?x4??16.求线性方程组 的全部解.
7.求下面线性方程组的全部解:
?x1?3x2?6x3?2x4??7??2x?5x?10x?3x?10?1234 ?
x?2x?4x?023?1??x2?2x3?3x4??108.当a,b取何值时,下面三元线性方程组有唯一解,无穷多解或无解?
?ax1?x2?x3?4? ?x1?bx2?x3?3 ?x?2bx?x?423?1
六、证明题:
1.若n阶矩阵A满足A+ A- E = 0,其中E为n阶单位矩阵,试证矩阵A+E为可逆矩阵. 2.设A为n阶矩阵且A= 0 (n为自然数),则E- A是可逆矩阵且
n2(E?A)?1=E?A?A2???An?1(其中E为n阶单位矩阵).
3.设?1,?2,?3线性无关,则?1??2,?2??3,?3??1亦线性无关.
4.设向量组?1,?2,?,?m(1)与向量组?1,?2,?,?m,?(2)有相同的秩,则?可用?1,?2?,?m线性表示.
8
??x1?x2?a15.证明线性方程组 ??x3?x4?a2x
满足ab?1?a2?1?b2时有解.
1?x3?b1??x2?x4?b26.设A为正交矩阵,试证其伴随矩阵A?亦.
北京邮电大学高等函授教育、远程教育
《工程数学》综合练习解答
通信工程、计算机科学与技术专业(本科)
《线性代数》部分
一、判断题:
1.√ , 2.×, 3. ×, 4. ×, 5. ×, 6. √, 7. ×, 8. ×, 9. √, 12. √,13. ×, 14. ×, 15. √ 16. √ 17. ×, 18. √, 19. ×, 20. 23. √, 24. ×, 25. ×, 26. ×.
二、填空题:
1. 0;
2. 7, -3, -21;
3. -12;
4. 3, -3, 1,2,-2;
?? 5.?ka?1kbkc??kbkc?1ka??,
2k3, ?1?
?1???; ?kckakb?1????1??
6. 无关, 不能;
7.???4?1??2?2?3,
是;
??1?
8. A?0,
Rank(A)=n; 9.
1; 81 ;10. ? 3?22?3,??1??2 1?, ?2????10 0??0 1?? 10 0??11?1? 3?,
??1?22??2?? 0 00 2??; 11. n, A? ,?1; ? 0 01?1????0010??1000?12. ?0100?????0300???1000?,010?;
13. ?2, ?;
??0001??0?????0001???
9
10. ×, 11. ,21. ×, 22. ,
, √√√14.?1?(?2,1,0)?,?2?(?3,0,1)?,
k1?1?k2?2(k1,k2为任意常数);
15.?1?(2,1,0,0)?,?2?(0,0,?1,1)?,??(1,0,2,0)??k1?1?k2?2.(k1,k2为任意常数) 16.
?1??2, ?1?k(?1??2)(k为任意常数)
17. ?2.
三、单项选择:
题号 选项 1 A 2 C 3 D 4 B 5 C 6 D 7 D 8 A 9 C 10 B
题号 选项 11 B 12 A 13 C 14 B 15 A
四、计算题:
1 101?x21. 原式=
0 10?3 2 3 0 0?3(1?x2)(2x?8)?0
?3x?6?32?x求得 x??1,x?4.
1?1012. D=
0000111?1?4,
4101?? 故有 D=16.
210113. D按第一行展开?0000=1+(-1)
n?1
00??1?00110?0011??(?1)n?1???10000?11(n?1)阶000?
0000 ?1101(n?1)阶00?2,当n为奇数时=?.?0,当n为偶数时10