Let A= ( 2 1 ) ( 1 2 ) (a11=2, a12=1, a21=1, a22=2) Find an...

Consider the Rosenbrock function, f(x) = 100(x2 - x12)2 + (1 -x1)2. Let x*=(1,1), the minimum...

Consider the Rosenbrock function, f(x) = 100(x2 - x12)2 + (1 -x1)2. Let x*=(1,1), the minimum of the function. Let r(x) be the second order Taylor series for f(x) about the base point x*, r(x) will be a quadratic, and therefore can be written: r(x) = A11(x1-x1*)2 + 2A12(x1-x1*)(x2-x2*) + A22(x2-x2*)2 + b1(x1-x1*) + b2(x2-x2*) + c Find all the coefficients in the formula for r(x) - What is A11, A12, A22, b1, b2, and c?

let A=[1 2 4] 2 -2 2 -1 4 2 find an orthonormal basis of the...

let A=[1 2 4] 2 -2 2 -1 4 2 find an orthonormal basis of the column space of A

a. Find an orthonormal basis for R 3 containing the vector (2, 2, 1). b. Let...

a. Find an orthonormal basis for R 3 containing the vector (2, 2, 1). b. Let V be a 3-dimensional inner product space and S = {v1, v2, v3} be an orthonormal set in V. Explain whether the set S can be a basis for V .

Let A equal the 2x2 matrix: [1 -2] [2 -1] and let T=LA R2->R2. (Notice that...

Let A equal the 2x2 matrix: [1 -2] [2 -1] and let T=LA R2->R2. (Notice that this means T(x,y)=(x-2y,2x-y), and that the matrix representation of T with respect to the standard basis is A.) a. Find the matrix representation [T]BB where B={(1,1),(-1,1)} b. Find an invertible 2x2 matrix Q so that [T]B = Q-1AQ

Suppose that the matrix A is an "almost identity". The columns 1, 3, 4,..., n are...

Suppose that the matrix A is an "almost identity". The columns 1, 3, 4,..., n are the vectors e_1, e_2, e_3,...,e_n respectively. But, the second column is some vector a12 a22 a32 ... an2 with a_22 not equal to 0. Find a formula for the matrix A and find a formula for the matrix A-1

Find an inner product such that the vectors ( −1, 2 )T and ( 1, 2...

Find an inner product such that the vectors ( −1, 2 )T and ( 1, 2 )T form an orthonormal basis of R2 2 4.1.11. Prove that every orthonormal basis of R2 under the standard dot product has the form u1 = cos θ sin θ and u2 = ± − sin θ cos θ for some 0 ≤ θ < 2π and some choice of ± sign. .

1. Let A be the 2x2 matrix in M_{2x2}(C), whose first row is (0,1) and second...

1. Let A be the 2x2 matrix in M_{2x2}(C), whose first row is (0,1) and second row is (-1,0). (a) Show that A is normal. (b) Find (complex) eigenvalues of A. (c) Find an orthogonal basis for C^2, which consists of eigenvectors of A. (d) Find an orthonormal basis for C^2, which consists of eigenvectors of A.

In R^2, let u = (1,-1) and v = (1,2). a) Show that (u,v) form a...

In R^2, let u = (1,-1) and v = (1,2). a) Show that (u,v) form a basis. Call it B. b) If we call x the coordinates along the canonical basis and y the coordinates along the ordered B basis, find the matrix A such that y = Ax.

5. Let v1 = (1/3,−2/3,2/3), v2 = (2/3,−1/3,−2/3) and v3 = (2/3,2/3,1/3). (a) Verify that v1,...

5. Let v1 = (1/3,−2/3,2/3), v2 = (2/3,−1/3,−2/3) and v3 = (2/3,2/3,1/3). (a) Verify that v1, v2, v3 is an orthonormal basis of R 3 . (b) Determine the coordinates of x = (9, 10, 11), v1 − 4v2 and v3 with respect to v1, v2, v3.

Let M = ( (−3 1 3 4), (1 2 −1 −2), (−3 8 4 2))...

Let M = ( (−3 1 3 4), (1 2 −1 −2), (−3 8 4 2)) 14. (3 points) Let B1 be the basis for M you found by row reducing M and let B2 be the basis for M you found by row reducing M Transpose . Find the change of coordinate matrix from B2 to B1.