线性代数第二版答案.doc

线性代数第二版答案 篇一：工程数学线性代数课后 同济第五版 1 2 3 4 5 篇二：线性代数第二章答案 第二章 矩阵及其运算 1? 已经明白线性变换? ??x1?2y1?2y2?y3?x2?3y1?y2?5y3? ??x3?3y1?2y2?3y3 求从变量x1? x2? x3到变量y1? y2? y3的线性变换? 解 由已经明白? ?x1??221??y1? ?x2???315??y2?? ?x??323??y???2??3?? ?y1??221??x1???7?49??y1???故y2??315??x2???63?7??y2?? ?y??323??x??32?4?????3????y3??2?? ??y1??7x1?4x2?9x3 ?y2?6x1?3x2?7x3? ??y3?3x1?2x2?4x3 2? 已经明白两个线性变换 ?1 ???y1??3z1?z2?x1?2y1?y3 ?x2??2y1?3y2?2y3? ?y2?2z1?z3? ???y3??z2?3z3?x3?4y1?y2?5y3 求从z1? z2? z3到x1? x2? x3的线性变换? 解 由已经明白 ?x1??201??y1??201???31 ?x2????232??y2????232??20?x??415??y??415??0?1??2?????3?? ??613??z1? ??12?49??z2?? ??10?116??z????3?0??z1?1??z2? ?z?3???3? ??x1??6z1?z2?3z3 因此有?x2?12z1?4z2?9z3? ??x3??10z1?z2?16z3 ?111??123? 3? 设A??11?1?? B???1?24?? 求3AB?2A及ATB? ?1?11??051????? ?111??123??111? 解 3AB?2A?3?11?1???1?24??2?11?1? ?1?11??051??1?11??????? ?058??111???21322? ?3?0?56??2?11?1????2?1720?? ?290??1?11??429?2??????? ?111??123??058? ATB??11?1???1?24???0?56?? ?1?11??051??290??????? 4? 计算以下乘积? ?431??7? (1)?1?23??2???570??1????? ?431??7??4?7?3?2?1?1??35? 解 ?1?23??2???1?7?(?2)?2?3?1???6?? ?570??1??5?7?7?2?0?1??49????????? ?3? (2)(123)?2???1??? ?3? 解 (123)?2??(1?3?2?2?3?1)?(10)??1??? ?2? (3)?1?(?12)? ?3??? ?2?(?1)2?2???24??2? 解 ?1?(?12)??1?(?1)1?2????12?? ?3??3?(?1)3?2???36??????? ?131??0?12?2140?? (4)???1?31? ? 1?134?????40?2? ?131??0?12??6?78?2140?? 解 ???1?31???20?5?6?? 1?134???????40?2? ?a11a12a13??x1??? (5)(x1x2x3)a12a22a23?x2?? ????aaa?132333??x3? 解 ?a11a12a13??x1??? (x1x2x3)a12a22a23?x2? ????aaa?132333??x3? ?x1? ?(a11x1?a12x2?a13x3 a12x1?a22x2?a23x3 a13x1?a23x2?a33x3)?x2? ?x??3? 5? 设A??22?a11x12?a22x2?a33x3?2a12x1x2?2a13x1x3?2a23x2x3? ?1 ?12?? B??1?13???0?? 征询? 2?? (1)AB?BA吗? 解 AB?BA? 由于AB???3 ?44?? BA??1?36???2?? 因此AB?BA? 8?? (2)(A?B)2?A2?2AB?B2吗? 解 (A?B)2?A2?2AB?B2? 由于A?B?? ?2?22?? 5??2??2?25???2(A?B)2???2? 但2???814?? ?1429?5????38??68???1A2?2AB?B2???411???812??3?????0???1016?? ?1527?4????因此(A?B)2?A2?2AB?B2? (3)(A?B)(A?B)?A2?B2吗? 解 (A?B)(A?B)?A2?B2? 由于A?B?? ?2?22?? A?B??0?05???2?? 1??22??02???06?? (A?B)(A?B)???25??01??09??????? 10???28?? ?38?而A2?B2??????????411??34??17? 故(A?B)(A?B)?A2?B2? 6? 举反列说明以下命题是错误的?（也可参考书上的答案） (1)假设A2?0? 那么A?0? 解 取A???0 ?0 ?1 ?01?? 那么A2?0? 但A?0? 0??1?? 那么A2?A? 但A?0且A?E? 0?? (2)假设A2?A? 那么A?0或A?E?解 取A?? (3)假设AX?AY? 且A?0? 那么X?Y ? 解 取 1A???0?0?? X??11?? Y??1??11??00?????1?? 1?? 那么AX?AY? 且A?0? 但X?Y ? 7? 设A?? 解 ?10?? 求A2? A3? ? ? ?? Ak? ???1?10?10???10?? A2????1????1??2?1???????10??10???10?? A3?A2A???2?1???1??3?1??????? 0?? 1?? ? ? ? ? ? ?? 1Ak???k?? ??10? 8? 设A??0?1?? 求Ak ? ?00???? 解 首先观察 ??10???1A2??0?1??0??00???00?????33?2A3?A2?A??0?3?00???44?3A4?A3?A??0?4?00???55?4A5?A4?A??0?5 ?00? ??k?kA??0??0k?k?10???22?1?1???0?22??? ?2?????00??3??3?2?? ?3??6?2?4?3?? ?4??10?3?5?4?? ?5????? ? ?? ? ? ? ? ? ?? ?k0k(k?1)k?2?2k?k?1?k 用数学归纳法证明? 篇三：线性代数第二章答案