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課程名稱︰線性代數一 課程性質︰數學系大一必修 課程教師︰朱樺 開課學院:理學院 開課系所︰數學系 考試日期(年月日)︰103.11.19 考試時限(分鐘):140min P.S. A*代表共軛 γ=gamma 試題 : (1) (30%) In the following "vector space" V over F with the usual operation, which of the them are isomorphic? (a) V1=C ; F=R (b) V2 is a vector space with 25 elements ;F=F_5 (c) V3=C^3/U,where U={(az,a,aw):a∈C},z,w are not all zero; F=C (d) V4=P(C)/{f∈P(C):f=0 or deg(f)>=2}, P(C) is the space of all polynomal; F=C (e) V5={f∈P(R): f''(x)=0} ;F=R (f) V6={A∈M_2x2(C):A*=-A} ,Where [A11 A12]*=[A11* A12*]; F=R [A12 A22] [A21* A22*] (g) V7={A∈M_2X2(C):A11-A12+A21-A22=0}; F=R (h) V8=N(T),where the linear transformation T:F^3->F^3 is defined by T(x1,x2,x3)=(x1+2x2+3x3,3x1+3x2+x3,2x1+x2+3x3);F=F_5 (i) V9=R(T),where T is defined as in (h); F=F_5 (J) V10=W1+W2,where W1=span({(1,2,3,4+i,0),(0,i,2,1,4),(3-i,2,0,0,0),(4,2i,1,0,0)}) W2=span({(2,3i,0,0,0),(0,i,0,4,0),(3,0,1,0,0),(0,0,1,0,-i)});F=C (2) (10%) Find a basis for the solution space of the system of linear equations 2x1+ x2-4x3 +8x5=0 3x1 -6x3+2x4+ x5=0 2x2 + x4 =0 4x2 +3x4-4x5=0 -4x1+3x2+8x3-2x4+2x5=0 (3) (10%) Construct a polynomial of smallest degree whose graph contains the points (-2,0),(-1,6),(0,4),(1,6),(2,24) (4) (10%) Let S={ [1 0],[0 -1],[-1 2],[2 1] } { [-2 1] [1 1] [ 1 0] [2 -2] } Determine whether the set S is linearly independent in the space (a)M_2X2(R) (b)M_2x2(F_3) (5) (10%) Let αbe the standard basis for P_2(R),β={x^2,2x+2x^2,2+x},and γ={-1,3+x,2-x+x^2} Let T be a linear operator on P_2(R) defined by : x T(f(x))=(x+1)f'(x)-∫f(t)dt/x 0 (a)Find the matrix that change α-coordinates into γ-coordinates. γ (b)Find[T] β (6) (10%) Let T be a linear operator on a vector space V over R such that T^2=Iv Let U={v∈V:T(v)=v},and W={v∈V:T(v)=-v}.Show that V=U⊕W (7) (10%) Let V and W be vector spaces,and let T and U be nonzero linear transformation from V into W. If R(T)∩R(U)={0},Show that T and U are linearly independent. (8) (10%) Let V be an n-dimensional vector space, and let T be a linear operator on V such that T^2=T. Show that there is a basis β for V such that [T] has the form: β [I_k O] [O O] for some k<=n (9) (10%) Let V and W be vector spaces such that dim(V)=dim(W),and let T:V->W be linear. Show that there exist bases βand γfor V and W,respectively,such that γ [T] has the form [I_k O] β [O O] for some k<=n (10) (10%) Let W be the subspace of M_nxn(F) spanned by the matrices C of the form:C=AB-BA. Show that W is the subspace of matrices which have trace zero --



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※ 文章網址: http://webptt.com/m.aspx?n=bbs/NTU-Exam/M.1416725833.A.AC8.html ※ 編輯: corykiki (114.43.247.253), 11/23/2014 15:19:32
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