Differential Forms wuch O- forms on I dimensional space an interval S=[a, b] cR w =...
4. Let T be a linear operator on the finite-dimensional space V with eharacteristie polynomial and minimal polynomial Let W be the null space of (T c) Elementary Canonical Forms Chap. 6 226 (a) Prove that W, is the set of all vector8 α in V such that (T-cd)"a-0 for some positive integer 'n (which may depend upon α). (b) Prove that the dimension of W, is di. (Hint: If T, is the operator induced on Wi by T, then...
Given four vector s at equilibrium: T, N, F, and W in a 3 dimensional space Point O is at the origin of the coordinate system and has coordinates of (0, 0,0) Given that T is parallel to OB, N isparallel to OA, Fis parallel to OC, and W is a given vector of coordinate 〈 0,-5,0 〉 use unit vectors to calculate the magnitude of T, F, and N A (2,5,-1) B-6,3,4) c (2,-1-4)
Differential equation
1. Chapter 4 covers differential equations of the form an(x)y("4a-,(x)ye-i) + +4(x)y'+4(x)-g(x) Subject to initial conditions y)oyy-Co) Consider the second order differential equation 2x2y" + 5xy, + y-r-x 2- The Existence of a Unique Solution Theorem says there will be a unique solution y(x) to the initial-value problem at x=而over any interval 1 for which the coefficient functions, ai (x) (0 S is n) and g(x) are continuous and a, (x)0. Are there any values of x for...
APM 346 (Summer 2019), Homework 1. 5. Consider the two-dimensional vector space of functions on the interval [0, 1 V = {a sin mz + bcos π.rla, b e R). (a) Prove that B is a basis for V. (Hint: Wronskian!) (b) Find the matrix representation [T]B of the operator T in the basis B, for (i) T = 4; (ii) T = ar .
APM 346 (Summer 2019), Homework 1. 5. Consider the two-dimensional vector space of functions on...
I need 6(d),7(a) (b) (c) (d). Thank you
in case you can't see the pics.
(a) the NSA 16) (5 ) F o r the RSA SA (d) (5 ) etc) formo CSA) has this w o rth with the RExplain 7. Determine whether each wat is either trofale. If we give justification known fact if Cae, give a comer example (a) (4 points) 2. are vectors of a subpace W of R", then so are all vectors of Span(2.57...
Use your I n y o u r own w o r d s, e x p l a i n p er i o d i c m o t i o n, a n d g i v e e x a m p l e s. In your own words, explain energy in simple harmonic motion. Describe stress, strain, and elastic deformation, and give examples.
(a) Let A be a fixed mx n matrix. Let W := {x ER" : Ax = 0}. Prove that W is a subspace of R". (b) Consider the differential equation ty" – 3ty' + 4y = 0, t> 0. i. Let S represent the solution space of the differential equation. Is S a subspace of the vector space C?((0.00)), the set of all functions on the interval (0,0) having two continuous derivatives? Justify ii. Is the set {tº, Int}...
Problem 5. Given a vector space V, a bilinear form on V is a function f : V x V -->R satisfying the following four conditions: f(u, wf(ū, ) + f(7,i) for every u, õ, wE V. f(u,ū+ i) = f(u, u) + f(ū, w) for every ā, v, w E V. f(ku, kf (ū, v) for every ū, uE V and for every k E R f(u, ku) = kf(u, u) for every u,uE V and for every k...
Problem 4. Give an example of a linear operator T on a
finite-dimensional vector space such that T is not nilpotent, but
zero is the only eigenvalue of T. Characterize all such
operators.
Problem 5. Let A be an n × n matrix whose characteristic
polynomial splits, γ be a
cycle of generalized eigenvectors corresponding to an
eigenvalue λ, and W be the subspace spanned
by γ. Define γ′ to be the ordered set obtained from γ by
reversing the...
You are given that a 4-dimensional pseudo-Riemannian space-time has the interval ds2dudvf (u) dx2 g?(u) dy*, (u, v, x, y) in terms of the coordinates x^ = (i) Use the standard variational principle 2 ds dt = 0 dt ti to find the r-equation governing the geodesic, with parameter t, between given points t and t2 (ii) Deduce from the x-geodesic equation obtained in (i) that f' T.. T. =. ur f where a prime denotes differentiation with respect to...