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设论述域是{a<sub>0</sub>,a<sub>1</sub>,a<sub>2</sub>···a<sub>n</sub>}试证明下列关系式:
<img src='https://img2.soutiyun.com/ask/2021-01-28/980687024369602.png' />
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设S={a<sub>1</sub>,a<sub>2</sub>,...,a<sub>8</sub>},B,悬S的子集,由Br;和B:所表达的子集是什么?应如何规定子集{a<sub>1</sub>,a<sub>2</sub>,...,a<sub>7</sub>}和{a<sub>1</sub>,a<sub>8</sub>}.
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设A为n阶矩阵,β<sub>1</sub>,β<sub>2</sub>,···,β<sub>n</sub>为A的列子块,试用β<sub>1</sub>,β<sub>2</sub>,···,β<sub>n</sub>表示A<sup>T</sup>A。
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设全集U={-2,-1,0,1,2},集合A={1,2},B={-2,1,2},则A∪(<sub>U</sub>B)等于()
A.?
B.{1}
C.{1,2}
D.{-1,0,1,2}
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设G={S<sub>1</sub>,S<sub>2</sub>;A)为一矩阵对策,则A=-A<sup>T</sup>为斜对称矩阵(亦称这种对策为对称对策),则(1)V<sub>G</sub>=0;(2)T<sub>1</sub>(G)= T<sub>2</sub>(G),其中T<sub>1</sub>(G)和T<sub>2</sub>(G)分别为局中人I和II的最优策略集。
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设a<sub>1</sub>>b<sub>1</sub>>0,记n=2,3,···证明:数列{a<sub>n</sub>}与{b<sub>n</sub>}的极限都存在且等于
设a<sub>1</sub>>b<sub>1</sub>>0,记<img src='https://img2.soutiyun.com/ask/2021-02-03/981198184073394.png' />n=2,3,···
证明:数列{a<sub>n</sub>}与{b<sub>n</sub>}的极限都存在且等于<img src='https://img2.soutiyun.com/ask/2021-02-03/981198207491733.png' />
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设a<sub>1</sub>=(5,-8,-1,2)<sup>T</sup>,a<sub>2</sub>=(2,-1,4,-3)<sup>T</sup>,a<sub>3</sub>=(-3,2,-5,4)<sup>T</sup>,从方程a≇
设a<sub>1</sub>=(5,-8,-1,2)<sup>T</sup>,a<sub>2</sub>=(2,-1,4,-3)<sup>T</sup>,a<sub>3</sub>=(-3,2,-5,4)<sup>T</sup>,从方程a<sub>1</sub>+2a<sub>2</sub>+3a<sub>3<img src='https://img2.soutiyun.com/ask/2020-11-26/97526278028527.png' /></sub>
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设向量组A:a<sub>1</sub>,a<sub>2</sub>;B:a<sub>1</sub>,a<sub>2</sub>,a<sub>3</sub>;C:a<sub>1</sub>,a<sub>2</sub>,a<sub>4</sub>的秩为R<sub>A</sub>=R<sub>B⌘
设向量组A:a<sub>1</sub>,a<sub>2</sub>;B:a<sub>1</sub>,a<sub>2</sub>,a<sub>3</sub>;C:a<sub>1</sub>,a<sub>2</sub>,a<sub>4</sub>的秩为R<sub>A</sub>=R<sub>B</sub>=2,R<sub>c</sub>= 3,求向量组D:a<sub>1</sub>,a<sub>2</sub>.2a<sub>3</sub>- 3a<sub>4</sub>的秩.
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设V是数域K上的一个线性空间,f<sub>1</sub>,…,f<sub>s</sub>是V的s个非零线性函数,证明:存在向量a∈V,使f<sub>i</sub>(α)≠0,i=1,…,s
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设a∈R<sup>n</sup>,a=(a<sub>1</sub>,a<sub>2</sub>,...,a<sub>n</sub>)<sup>T</sup>≠0 求证: 是正交矩阵。
设a∈R<sup>n</sup>,a=(a<sub>1</sub>,a<sub>2</sub>,...,a<sub>n</sub>)<sup>T</sup>≠0
求证:
<img src='https://img2.soutiyun.com/ask/2020-08-16/966461113345045.png' />
是正交矩阵。
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设A为n阶矩阵,证明:当k<sub>1</sub>≠0,k<sub>2</sub>≠0时,k<sub>1</sub>ξ<sub>1</sub>=k<sub>2</sub>ξ<sub>2</sub>不是A的特征向量.
设A为n阶矩阵,<img src='https://img2.soutiyun.com/ask/2021-03-05/983793334730841.png' />证明:当k<sub>1</sub>≠0,k<sub>2</sub>≠0时,k<sub>1</sub>ξ<sub>1</sub>=k<sub>2</sub>ξ<sub>2</sub>不是A的特征向量.
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设A={1,2,3,4},A<sub>1</sub>={1,2},A<sub>2</sub>={1},A<sub>3</sub>=∅,求A<sub>1</sub>,A<sub>2</sub>,A<sub>3</sub>和A的特征函数X<sub>A1</sub>,X<sub>A2</sub>,X<sub>A3</sub>和X<sub>A</sub>。
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设a<sub>1</sub>,a<sub>2</sub>,…,a<sub>n</sub>为互不相同的效,F(x)=(x-a<sub>1</sub>)(x-a<sub>2</sub>)…(x-a<sub>n</sub>)。证明:任何多
设a<sub>1</sub>,a<sub>2</sub>,…,a<sub>n</sub>为互不相同的效,F(x)=(x-a<sub>1</sub>)(x-a<sub>2</sub>)…(x-a<sub>n</sub>)。证明:任何多项式f(x)用F(x)除所得的余式为
<img src='https://img2.soutiyun.com/ask/2020-07-30/964972727738352.png' />
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设a<sub>1</sub>=(1,1,0),a<sub>2</sub>=(0,1,1),a<sub>3</sub>=(3,4,0),求a<sub>1</sub>-a<sub>2</sub>及3a<sub>1</sub>+2a<sub>2</sub>-a<sub>3</sub>。
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设a<sub>1</sub>,...,a<sub>s</sub>线性无关,并且
<img src='https://img2.soutiyun.com/shangxueba/ask/50436001-50439000/50437857/965055888080397.png' />
证明:β<sub>1</sub>,…,β<sub>i</sub>线性无关的充分必要条件是:
<img src='https://img2.soutiyun.com/shangxueba/ask/50436001-50439000/50437857/965055915379958.png' />
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设向量组B:b<sub>1</sub>,b<sub>2</sub>,…,b<sub>r</sub>能由向量组A:a<sub>1</sub>,a<sub>2</sub>,…a<sub>r</sub>线性表示为(b<sub>1</sub>,b<sub>2⌘
设向量组B:b<sub>1</sub>,b<sub>2</sub>,…,b<sub>r</sub>能由向量组A:a<sub>1</sub>,a<sub>2</sub>,…a<sub>r</sub>线性表示为(b<sub>1</sub>,b<sub>2</sub>,…,b<sub>r</sub>)=(a<sub>1</sub>,a<sub>2</sub>,…,a<sub>r</sub>)K,其中K为s×r矩阵,且A组线性无关。证明B组线性无关的充要条件是矩阵K的秩R(K)=r。
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(a)当s<sub>1</sub>=1/2,s<sub>2</sub>任意时,求出克莱布希一高登系数.提示:这里需要求的是下式中的A和B使得
(a)当s<sub>1</sub>=1/2,s<sub>2</sub>任意时,求出克莱布希一高登系数.提示:这里需要求的是下式中的A和B
<img src='https://img2.soutiyun.com/shangxueba/ask/65523001-65526000/65524384/968937592528158.png' />
使得|sm)是S<sup>2</sup>的一个本征态.用教材中式 4.179一式4.182的方法.如果你忘记了(例如)<img src='https://img2.soutiyun.com/ask/2020-09-14/9689376229849.png' />对|s<sub>2</sub>m<sub>2</sub>)的作用,查阅式4.136和式4.137的前一行.
<img src='https://img2.soutiyun.com/ask/2020-09-14/968937663920242.png' />
式中,正负号取决于s=s2<img src='https://img2.soutiyun.com/ask/2020-09-14/96893768119923.png' />1/2.
(b)用教材中表4.8里的三个或四个条日核对这一普遍结论.
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设n≥2.f<sub>1</sub>(x),f<sub>2</sub>(x),..,f<sub>n-2</sub>(x)是关于次数小于或等于n-2的多项式,a<sub>1</sub>,a<sub>2</sub>,..
设n≥2.f<sub>1</sub>(x),f<sub>2</sub>(x),..,f<sub>n-2</sub>(x)是关于次数小于或等于n-2的多项式,a<sub>1</sub>,a<sub>2</sub>,...,a<sub>n</sub>为任意数,证明:行列式
<img src='https://img2.soutiyun.com/ask/2021-01-17/979772528327203.png' />
并举例说明条件“次数≤n-2”是不可缺少的.
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试构造一个的同构,这里S={a<sub>1</sub>,a<sub>2</sub>,a<sub>3</sub>}.
试构造一个<img src='https://img2.soutiyun.com/ask/2021-02-03/981199897680406.png' />的同构,这里S={a<sub>1</sub>,a<sub>2</sub>,a<sub>3</sub>}.
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设λ<sub>1</sub>,λ<sub>2</sub>都是n阶矩阵A的特征值,λ<sub>1</sub>≠λ<sub>2</sub>,,且a<sub>1</sub>与a<sub>2</sub>分别是A的对应于λ<sub>1</sub>与λ<sub>2</sub>的特征向量,则().
A.c<sub>1</sub>=0且c<sub>2</sub>=0时,a=c<sub>1</sub>a<sub>1</sub>+c<sub>2</sub>a<sub>2</sub>必是A的特征向量
B.c<sub>1</sub>≠0且c<sub>2</sub>≠0时,a=c<sub>1</sub>a<sub>1</sub>+c<sub>2</sub>a<sub>2</sub>必是A的特征向量
C.c<sub>1</sub>,c<sub>2</sub>=0时,a<sub>1</sub>=c<sub>1</sub>a<sub>1</sub>+c<sub>2</sub>a<sub>2</sub>必是A的特征向量
D.c<sub>1</sub>≠0而c<sub>2</sub>=0时,a=c<sub>1</sub>a<sub>1</sub>+c<sub>2</sub>a<sub>2</sub>必是A的特征向量
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设3(a<sub>1</sub>-a)+2(a<sub>2</sub>+a)=5(a<sub>3</sub>+a),其中a=(2,5,1,3)<sup>T</sup>,a<sub>2</sub>=(10,1,5,10)<sup>T</sup>,a<sub>3</sub>=(4,1,-1,1)<sup>T</sup>.求a向量由另外三个向量的线性表示.
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如果向量组a<sub>1</sub>,a<sub>2</sub>,...,a<sub>s</sub>可由向量组β<sub>1</sub>,β<sub>2</sub>,...,β<sub>t</sub>,线性表出,求证:
<img src='https://img2.soutiyun.com/ask/2020-08-16/966459622838793.png' />
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题6-23图(a)所示机构,两杆O<sub>1</sub>A和O<sub>2</sub>C的长度均为160mm,各以匀角速度w=0.5rad/s绕定轴O<sub>1</sub>,O<sub>2</sub>转动,并带动菱形薄片ABCD运动,M点按方程OM=s=50t<sup>2</sup>(s以mm计,l以s计)沿菱形的对角线运动,设I=1.5s时,AC⊥AO<sub>1</sub>。试求此时点M的绝对速度和绝对加速度。
<img src='https://img2.soutiyun.com/shangxueba/ask/51363001-51366000/51365565/976395726039143.png' />
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设a<sub>1</sub>,a<sub>2</sub>,a<sub>3</sub>为正数1>2>3.证明:方程在区间(1,2)与(2,3)内各有一根.
设a<sub>1</sub>,a<sub>2</sub>,a<sub>3</sub>为正数<img src='https://img2.soutiyun.com/ask/2020-11-28/975436278461242.png' />1><img src='https://img2.soutiyun.com/ask/2020-11-28/975436278461242.png' />2><img src='https://img2.soutiyun.com/ask/2020-11-28/975436278461242.png' />3.证明:方程
<img src='https://img2.soutiyun.com/ask/2020-11-28/975436328089081.png' />
在区间(<img src='https://img2.soutiyun.com/ask/2020-11-28/975436278461242.png' />1,<img src='https://img2.soutiyun.com/ask/2020-11-28/975436278461242.png' />2)与(<img src='https://img2.soutiyun.com/ask/2020-11-28/975436278461242.png' />2,<img src='https://img2.soutiyun.com/ask/2020-11-28/975436278461242.png' />3)内各有一根.
