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(1) What is the dimension of the space R6? (m) Let T : R5 → R. Is it true or false that the null space of T is a subspace of R4? (n) Let T: R3R5. I f R5? s it true or false that the range of l' is a subspace o (o) Find a basis for the span of the set of vectors012
(1) What is the dimension of the space R6? (m) Let...
Let A be an m x 7 matrix of rank r such that Null(A) is a plane, and Ax = b is always consistent. Then the rank r of A is The nullity of A The dimension of Col(A)) is m = Let T(v) = Av. Is T one-to-one? Is T onto? T: RP → R9, where p = and q = 5 2 5 5 No Yes 7 5 No Yes 3 2 0 1 Cannot be determined. Cannot...
6. Suppose A E Rnxm has full rank, that is, rank(A) min(n, n). Let ơi > > Ơr be the singular values of A. Let B E Rnxm satisfy IA-B 2 < σ'. Then B also has full rank. Suppose A E Rnx'n has full rank, that is, rank(A)-r-min(n, n). Let ơi > > ơr be the singular values of A. Let B E Rnxm satisfy IIA-Blla < ơr. Then B also has full rank
6. Suppose A E Rnxm...
12. (True/False) (a) Let AE Rm*n . Then R(A) (b) Let AERm*n. Then N(A) is isomorphic to N(AT) (c) We define < A. B > = Tr (BTA ) where A, B E Rnxn . is isomorphic to R(A Then 〈 . , . 〉 is an inner product on Rmxn. (d) Consider a periodic-function space V with period of 1 sec. Define an inner product on V by <f,a>= f(t )a (t ) dt. Then cos 2 π t...
Question 5 True of False part II: 5 problems, 2 points each. (6). Let w be the x-y plain of R3, then wlis any line that is orthogonal to w. (Select) (7). Let A be a 3 x 3 non-invertible matrix. If Ahas eigenvalues 1 and 2, then A is diagonalizable. Sele (8). If an x n matrix A is diagonalizable, then n eigenvectors of A form a basis of " [Select] (9). Letzbean x 1 vector. Then all matrices...
A8.2 Let A be an m × n matrix and B be an n × p matrix. (a) Show that col(B) C null(A) if and only if AB = 0. (b) Show that if AB = 0, then rank(A) + rank(B) 〈 n.
A8.2 Let A be an m × n matrix and B be an n × p matrix. (a) Show that col(B) C null(A) if and only if AB = 0. (b) Show that if AB = 0,...
3. (15 pts.) Let A e Rmxn be a full rank matrix, m > n. Suppose that Let r = Ax-b. Prove that reprthogonal to Az minimizes llAz-b12.
3. (15 pts.) Let A e Rmxn be a full rank matrix, m > n. Suppose that Let r = Ax-b. Prove that reprthogonal to Az minimizes llAz-b12.
7. Let E C R be nonempty, n E N, and K, L E Z such that K/n is an upper bound for E, but L/n is not an upper bound for E. (a) Show that there exists an for E, but (m - 1)/n is not an upper bound for E. (Hint: Prove by contradiction, and use induction. Drawing a picture might help) m < K such that m/n is an upper bound integer L (b) Show that m...
2a) Let a, b e R with a < b and let g [a, bR be continuous. Show that g(x) cos(nx) dx→ 0 n →oo. as Hint: Let ε > 0, By uniform continuity of g, there exists δ > 0 such that 2(b - a Choose points a = xo < x1 < . . . < Xm such that Irh-1-2k| < δ. Then we may write rb g (z) cos(nx) dx = An + Bn where 7m (g(x)...
Problem 1. (15 points) Answer the following true or false (ao proof or argurment needed). (a). True or False: solutions. There exists a system of linear equations which has exactly two TrUR (b). True or False: most one IfA is an m x n matrix with null(A) = 0 then AE = 6 has at solution. yhjL (c). True or False: If A and B are invertible nxn matrices then AB is invertible and (AB)-1 = A-B- Fals R. Then...