4. (12 pts) Show the matrix operator T: RR given by the following equations is one-to-one;...
no calculator please 4. (12 pts) Show the matrix operator T: RR given by the following equations is one-to-one; Find the standard matrix for the inverse operator T-I, and find T-(W1, W2, w3). w1 = x +22-23 w2 = 2.v 1 + 2x2 - 23 W3 = x - 2.12
4. (12 pts) Show the matrix operator T: R3 R3 given by the following equations is one-to-one; Find the standard matrix for the inverse operator T-1, and find T-(W1, W2, W3). w1 = x1 +22-23 W2 = 2x1 +2:22 - 23 W3 = 21 - 2202
Problem 4. Let B = {V1, 02, 03} CR, where [3] [1] 01 = 12, 02 = 12103 = 1 [1] [2] 4.1. Show that the matrix A = (v1 V2 V3) E M3(R) is invertible by finding its inverse. Conclude that B is a basis for R3. 4.2. Find the matrices associated to the coordinate linear transformation T:R3 R3, T(x) = (2]B- and its inverse T-1: R3 R3. Use your answers to find formulas for the vectors 211 for...
3. (12 pts) Find a subset of vectors that forms a basis for the space spated by 11 = (1.22. - 1), 1 = (-3, -6, -6,3). Es =(4,9,9,-4), 4 = (-2,-1,-1,2), 3 =(5,8,9,-5). Then express the other vector(s) as a linear combination of the basis vectors 4. 12 pts) Show the matrix operator T: - R given by the following equations is one-to-one Find the standard matrix for the inverse operator T-!, and find T-2, 43, ).
3. (10 pts) The equations of motion of a mass and spring chain are given below in matrix form. 2m 0 3k -ki + -k 2k where m= 1 kg. The first (lowest) modal frequency and the second modal vector are given as am wum W1 2k k 10 radians/sec, and $2 = (-2). k (a) Determine the second modal frequency W2, i.e. the modal frequency associated with the modal vector 02. You should obtain a numerical answer with units....
Please explain how to get variance covariance matrix and how to get the final solution: ρρ 4. The correlation matrix of the random variables Y,,Y,,Y,, Y4 is 12 3 0 < ρ < l , and each random variable has variance σ2 . Let W1-Y1 +Ý, +Ý, , and let W2 Y +Y +Y,. Find the variance covariance matrix of (W,W2) Jo 1 1 01 L : I :).andi Solution: The matrix M of the linear transformations is M =...
only do (e)-(g) The linear operator L : R3 + R3 is given by its matrix A = Al,s wit respect to the standard basis S = {(1, 22, 23}, where To 0 11 -10- 20 [4 00 (a) Find the characteristic polynomial PL(x) of L; (b) What are the eigenvalues of L and what are their algebraic multiplicities? (e) What are the geometric multiplicities of eigenvalues of L? Is L diagonal- izable? (d) Find a basis B of eigenvectors...
Problem 3. 0 Figure 2 Given: f(t) = { 2.5, -1.5 <=<= 1.5 f(t) = { 0 otherwise See figure(2) above. A) Find the Fourier transform for f( (see figure 2) and sketch its waveform. B) Determine the values of the first three frequency terms (w1, W2, W3) where F(w) = 0. C) Given x(t) = 1.58(-0.8) edt Determine whether or not Fourier transform exists for x(t). If yes, find the Fourier transfe not explain why it does not. Problem...
Find the standard matrix of T ( Call it A) Is T one-to-one? Justify your answer Is T onto ? Justify your answer -> Question 5. (20 pts) Let T : R? R? be a linear transformation such that T(:21,22) = (21 - 222, -21 +3.22, 3.11 - 2:02). (1). Find the standard matrix of T (call it A). (2). Is T one-to-one? Justify your answer. (3). Is T onto? Justify your answer.
4. Let T be the linear operator on F which is represented in the standard ordered basis by the matrix c0 0 01 Let W be the nll space of T - c/. (a) Prove that W is the subspace spanned by 4 (b) Find the monic generators of the ideals S(u;W), S(q;W), s(G;W), 1 4. Let T be the linear operator on F which is represented in the standard ordered basis by the matrix c0 0 01 Let W...