4. This question is about linear transformations and subspaces. Let L: R4 R³ be a lineartransformation for which L(e) = 0. Let H be the hyperplane determined by w= 0 (the variableswe use in R¹ are x, y, z, w). Prove using the definition that the subset L(H) R³ is a subspace.Discuss how to determine its dimension.

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Answered: 4. This question is about linear…

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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Let S be the parallelogram then determine the area of parallelogram by the vectors [h | 1 and let A = h and [0 h+1] h=102 Also compute the area of the image of parallelogram under the linear transformation ""
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
4. Let V and W be finite dimensional vector spaces. Let T : V –→ W be a linear transformation of V into W. (a) Let H be a subspace of V. Let T(H) be the set of all images of the vectors in H under the transformation T. Show that T(H) is a subspace of W and dim T(H) < dim H (b) Now suppose that T is one-to-one. Show that dim T(H)= dim H.
-(.. Suppose that T: V V is a linear transformation and V is a finite dimensional vector space. Suppose that U is a subspace of V such that T(U) = T(V). Prove that U + ker(T) = V. %3D

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