第五章n维向量空间习题一1.解:a-b=a+(-b)=(1,1,0)T+(0,-1,-1)T=(1,0,-1)T3a+2b-c=3a+2b+(-c)=(3,3,0)T+(0,2,2)T+(-3,-4,0)T=(0,1,2)T2.解:3(a1-a)+2(a2+a)=5(a3+a)3a1+2a2+(-3+2)a=5a3+5a3a1+2a2+(-a)=5a3+5a3a1+2a2+(-a)+a+(-5)a3=5a3+5a+a+(-5)a33a1+2a2+(-5)a3=6a61[3a1+2a2+(-5)a3]=616a21a1+31a2+(-65)a3=a将a1=(2,5,1,3)T,a2=(10,1,5,10)T,a3=(4,1,-1,1)T代入a=21a1+31a2+(-65)a3中可得:a=(1,2,3,4)T.3.(1)V1是向量空间.由(0,0,⋯,0)V1知V1非空.设a=(x1,x2,⋯,xn)V1,b=(y1,y2,⋯,yn)V1,则有x1+x2+⋯+xn=0,y1+y2+⋯+yn=0.因为(x1+y1)+(x2+y2)+⋯+(xn+yn)=(x1+x2+⋯+xn)+(y1+y2+⋯+yn)=0所以a+b=(x1+y1,x2+y2,⋯,xn+yn)V1.对于kR,有kx1+kx2+⋯+kxn=k(x1+x2+⋯+xn)=0所以ka=(kx1,kx2,⋯,kxn)V1.因此V1是向量空间.(2)V2不是向量空间.因为取a=(1,x2,⋯,xn)V2,b=(1,y2,⋯,yn)V2,但a+b=(2,x2+y2,⋯,xn+yn)V2.因此V2不是向量空间.习题二1.求向量b关于向量组a1,a2,a3,a4的线性组合表达式:(1)解:设向量b关于向量组a1,a2,a3,a4的线性组合表达式为:b=k1a1+k2a2+k3a3+k4a4其中,k1,k2,k3,k4为待定常数.则将b=(0,2,0,-1)T,a1=(1,1,1,1)T,a2=(1,1,1,0)T,a3=(1,1,0,0)T,a4=(1,0,0,0)T向量b关于向量组a1,a2,a3,a4的线性组合表达式中可得:(0,2,0,-1)T=k1(1,1,1,1)T+k2(1,1,1,0)T+k3(1,1,0,0)T+k4(1,0,0,0)T根据对分量相等可得下列线性方程组:10201213214321kkkkkkkkkk解此方程组可得:k1=-1,k2=1,k3=2,k4=-2.因此向量b关于向量组a1,a2,a3,a4的线性组合表达式为:b=-a1+a2+2a3-2a4.(2)与(1)类似可有下列线性方程组:121332223212143214321kkkkkkkkkkkkk由方程组中的第一和第二个方程易解得:k2=4,于是依次可解得:k1=-2,k3=-9,k4=2.因此向量b关于向量组a1,a2,a3,a4的线性组合表达式为:b=-2a1+4a2-9a3+2a4.2.(1)解:因为向量组中向量的个数大于每个向量的维数,由推论2知a1,a2,a3,a4线性相关.(2)解:400510111220510111331621111321aaa因为3321aaaR所以a1,a2,a3线性无关.(3)解:00021011142012601117131442111321aaa因为32321aaaR所以a1,a2,a3线性相关.(4)解:500410111320410111211301111321aaa因为3321aaaR所以a1,a2,a3线性无关.3.证明:假设有常数k1,k2,k3,使k1b1+k2b2+k3b3=0又由于b1=a1,b2=a1+a2,b3=a1+a2+a3,于是可得k1a1+k2(a1+a2)+k3(a1+a2+a3)=0即(k1+k2+k3)a1+(k2+k3)a2+k3a3=0因为a1,a2,a3线性无关,所以有000332321kkkkkk解得000321kkk因此向量组b1,b2,b3线性无关.4.设存在常数k1,k2,k3,k4使k1b1+k2b2+k3b3+k4b4=0因为b1=a1+a2,b2=a2+a3,b3=a3+a4,b4=a4+a1于是可得:k1(a1+a2)+k2(a2+a3)+k3(a3+a4)+k4(a4+a1)=0整理得:(k1+k4)a1+(k2+k1)a2+(k2+k3)a3+(k3+k4)a4=0,(下用两种方法解)法一:因为a1,a2,a3,a4为同维向量,则(1)当向量组a1,a2,a3,a4线性无关时,k1+k4=0,k2+k1=0,k2+k3=0,k3+k4=0可解得:k2=-k1,k4=-k1,k3=k1取k10可得不为0的常数k1,k2,k3,k4使k1b1+k2b2+k3b3+k4b4=0因此b1,b2,b3,b4线性相关。(2)当向量组a1,a2,a3,a4线性相关时,k1+k4,k2+k1,k2+k3,k3+k4中至少存在一个不为0,因此易知k1,k2,k3,k4不全为0,于是可得b1,b2,b3,b4线性相关。法二:因为a1,a2,a3,a4为任意向量,所以当000043322141kkkkkkkk,而该方程组的系数矩阵对应的行列式01100011000111001,所以有非零解所以b1,b2,b3,b4线性相关。5.证明:假使向量组b1,b2,⋯,bm线性相关.即存在不全为0的常数k1,k2,⋯,km,使:k1b1+k2b2+⋯+kmbm=0由题意不妨设a1=(a11,a12,⋯,a1r),a2=(a21,a22,⋯,a2r),⋯⋯⋯⋯⋯⋯⋯,am=(am1,am2,⋯,amr)则相应地,b1=(a11,a12,⋯,a1r,a1r+1,⋯a1n),b2=(a21,a22,⋯,a2r,a2r+1,⋯a2n),⋯⋯⋯⋯⋯⋯⋯,bm=(am1,am2,⋯,amr,amr+1,⋯amn)由k1b1+k2b2+⋯+kmbm=0可得:k1a11+k2a21+⋯+kmam1=0k1a12+k2a22+⋯+kmam2=0⋯⋯⋯⋯⋯⋯⋯,k1a1r+k2a2r+⋯+kmamr=0k1a1r+1+k2a2r+1+⋯+kmamr+1=0⋯⋯⋯⋯⋯⋯⋯,k1a1n+k2a2n+⋯+kmamn=0去前面r个分量可得:k1(a11,a12,⋯,a1r)+k2(a21,a22,⋯,a2r)+⋯+km(am1,am2,⋯,amr)=0即k1a1+k2a2+⋯+kmam=0由假设知k1,k2,⋯,km不全...
