Let Find Tr A^n. A is a 2x2 matix A= (3 -2, 4 -3)

Let A be a 2x2 matrix 6 -3 -4 2 first, find all vectors V so...

Let A be a 2x2 matrix 6 -3 -4 2 first, find all vectors V so the distance between AV and the unit basis vector e_1 is minimized, call this set of all vectors L. Second, find the unique vector V0 in L such that V0 is orthogonal to the kernel of A. Question: What is the x-coordinate of the vector V0 equal to. ?/? (the answer is a fraction which the sum of numerator and denominator is 71)

Let f(x) = 2x2 + nx – 6 and g(x) = mx2 + 2x – 4....

Let f(x) = 2x2 + nx – 6 and g(x) = mx2 + 2x – 4. The functions are combined to form the new functions h(x) = f(x) – g(x). Points (2, 4) and (-3, 17) satisfy the new function. Determine the values of m and n

Solve. Find the exact solutions to the following equations. Show every step. (2x2+7x)2-2(2x2+7x)=4

Solve. Find the exact solutions to the following equations. Show every step. (2x2+7x)2-2(2x2+7x)=4

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

Let V=Mn(R) and <A,B>=tr(AB) be a symmetric bilinear form on V. Determine the signature of tr(AB)...

Let V=Mn(R) and <A,B>=tr(AB) be a symmetric bilinear form on V. Determine the signature of tr(AB) for arbitrary n.

find the sum of the series (2^n+3^(n+1)+4^(n+2))/5^n.

find the sum of the series (2^n+3^(n+1)+4^(n+2))/5^n.

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.

Let X ? N(10, 16). Find 1. P(X ? 4) 2. P(?1 < X < 17)...

Let X ? N(10, 16). Find 1. P(X ? 4) 2. P(?1 < X < 17) 3. P(X > 14) 4. P(|X ? 10| > 8)

Let A be a 2x2 matrix and suppose that det(A)=3. For each of the following row...

Let A be a 2x2 matrix and suppose that det(A)=3. For each of the following row operations, determine the value of det(B), where B is the matrix obtained by applying that row operation to A. a) Multiply row 1 by -4 b) Add 4 times row 2 to row 1 c) Interchange rows 2 and 1 Resulting values for det(B): a) det(B) = b) det(B) = c) det(B) =

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.