3. Let V and W be n and m dimensional F-vector spaces and let B and A be bases for V andW respectively. Let YB V → Fn and A: W→ Fm denote the coordinate isomorphisms.Let S V W be a linear transformation.(a) Prove that 7 maps Ker S onto null[S] and 7 maps imS onto col[S]. 2(b) Conclude that null[S] ≈ (ker S) and col[S] ≈ imS are isomorphisms.(c) Write a statement that connects rank and nullity of [S] to the kernel and image of S.

Answered: Image /qna-images/answer/275ebd08-7522-41f9-86c3-d2b45e6b1937.jpg

Answered: 3. Let V and W be n and m dimensional…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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4. Let B = {v1, v2, V3} and C = {w1, w2, w3} be bases for R3, with vectors defined below. -(:) -() --() v1 = V2 = V3 = and --(:) --E) --() 1 wi = , w2 = 1 , W3 = 1 Let L: R³ → R³ be the linear transformation defined by L: Find [L]B and [L]c, the matrices associated to L with respect to B and with respect to C.
Define T: R² R² by T() = T 21 =[ =[ U2 that T is a linear transformation. ● a) Let u = I1 and 7 = X2 = 3x12x2 2x2 V1 be two vectors in R2 and let c be any scalar. Prove U₂
4. Let VCR" be a subspace. Let F: V→V and G: V → V be invertible linear transformations. Denote by F¹: V→V and G¹: V → V the inverses of F and G respectively. Is the map H: V → V defined by H(v):= F(G(F¹(G¹(v)))), for v € V, a linear transformation? Justify your answer.
Consider two finite dimensional (real) vector spaces V and W with dim(V) = n and dim(W) = k. Define L(V, W) to be the set of linear transformations: L(V, W) = {T: The map T: VW is linear} 1. Define addition and scaling on L(V, W). 2. Sketch a proof that L(V, W) is a vector space. 3. Prove that L(V, W) is finite dimensional by finding an explicit basis for it.
Let T: V-->W be a linear transformation between finite-dimensional vector spaces V and W Let B and C be bases for V and W, respectively, and let A= [ T]C<--B. Use the results of this section to give a matrixbased proof of the Rank Theorem
Let M₂x2 be the vector space of all 2 x 2 matrices and define a linear transformation T: M2x2 → M2x2 by a [id] Describe the kernel of T. C T(A) = A + AT, where A = O No answer text provided. odlo 0 -a ° 0 O [1] :d is a real number} [9] : b is a real number} -b O (1 :d is a real number} (d c is a real number} °41 :d is a real number} : a,b,c,d are real numbers} [9] : b is a real number}
4. Let V be a vector space. Prove that a) The zero transformation T(v) = b) The identity transformation T(v) = v for all v EV is a linear transformation. = 0 for all v EV is a linear transformation. CS Scanned with CamScanner
a) let T : R3 → R be a linear transformation defined by T(a, b, c) = 2a−b+ 5c. Find y ∈ R3such that T(x) =< x, y > for all x ∈ R3.b) Let T : V → V be a linear operator over a finite dimensional vector space V . Prove thatdim(ker(T)) + dim(ImmT) = Dim(V )
True or false
Suppose that T: R2 --> R2 is a linear transformation such that T (i) = (1,2) and T (j) =(2,4_ . Show that T is not onto by finding one vector in the codomain that is not the image of any vector in the domain. Is T one-to-one?
4) Please correctly and detailed justification are required

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