(9) (i) (3 marks) Give an example of TEL(C2) such that im(T) = ker(T). (ii) (3...
Let TEL(V). Choose the correct answer for ker(+*) im(*)+ ker(1) ker(T)- im(T)- im(T)
(10) Let TEL(P3(C)) be defined by T(P(x)) = p” (x) – p(0), where the prime symbol denotes differentiation. (i) (5 marks) Let y = {x2 + 2x – 3, x, x3 – 1,1} be an ordered basis and ß the standard ordered basis for P3(C). Determine the matrix representation [T]3. (ii) (4 marks) Determine a basis for ker(T).
3. In the following question, we are going to prove that ker(T) = { } if and only if T is one-to- one. (Writing prove is like writing a little essay, with some good logical connection between each sentence.) (a) Let T:V - W a linear transformation between two vector spaces. Suppose ker(T)={0}. Show that T is one-to-one. (Hint: proof by contradiction, by assuming both ker(T)=ð and T is not one-to-one. Now, apply definition of kernel and one-to-one, what is...
Let be an arbitrary function and A X. i) Show that A ii) Give an example to show that in general A = . iii) Show that, if is injective, then A = iv) Show that, if X and Y are modules; is a homomorphism of modules and A is a submodule of X such that ker, then we also have A = We were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe...
10. Define: (4 marks) Affective disorder: Give one example: ii) Anxiety disorder: Give one example: 1. Describe the impact of acquired brain injury in Canada. with supporting information. (6 marks) "y in Canada. Include a minimum of 3 details
4.(5 pts)Give an example of a 3 x 3 matrix with eigenvalues of 2, 2, and -3 that is diagonalizable. Show that it is, in fact, diagonalizable, and find C and D such that C (you may make this as trivial as you wish!) AC = D 5.(5 pts) Give an example of a 3 x 3 matrix with eigenvalues of 2, 2, and -3 that is NOT diagonalizable. Show WHY it is not diagonalizable. 6. (5 pts) Let T:...
3. (6 marks) Find an example of a vector space V, and a linear transformation T : V + V such that R(T) = ker(T). Your vector space V must have dimension > 2. You may find it helpful to let V be a euclidean space and T a matrix transformation, but that is not necessary. You must explain why your example works.
3. (6 marks) Find an example of a vector space V, and a linear transformation T : V +V such that R(T) = ker(T). Your vector space V must have dimension > 2. You may find it helpful to let V be a euclidean space and T a matrix transformation, but that is not necessary. You must explain why your example works.
Problem 1: Give an example of a 6 x 6 matrix A such that it satisfies all the following conditions (i) The Spectrum of A, O(A) = {-1,2,3}. (ii) dim(Ker(A – 31)) = 1. (iii) dim(Ker(A – 21)) = dim(Ker(A – 21)2) = 2. (iv) dim(Ker(A + 1)) = 1, dim(Ker(A + 1)2) = 2, dim(Ker(A + 1)3) = 3.
Fourier Series. Thank you in advance. Q 2(a) [6 Marks] (i) Sketch 3 successive cycles of the periodic function g(t):[4 marks) g() gt3). (ii) Is g(t)an even or odd function of? [2 marks] [14 Marks] (i) Show that the Fourier series coefficients of gl), as defined in part 2(a), may Q 2(b) [11 marks]: be written as follows 0, EVEN (ii) Obtain a value for the constant [3 marks] [5 Marks Q 2(c) What is the power, or mean-squared value,...