(1) Consider (= ((a,ß)la.ßER} Define addition and scalar multiplication on ( as follows: foreach (a. B). (a', B') EC and a E R.(a, ß)+(a',B')-(a+ a',B + B') and a(a.B) (aa, aß)%3DDetermine whether ( with the given operations is a vector space. Justify your answer.(11) Let S (x,X2, X3) where x, = (1,2,1), x (1,0, 2), x, = (1, 1,0). Does S span R?Explain briefly.%3D%3D

Answered: Image /qna-images/answer/9fdfc31d-9644-4345-835f-ed3a3c2ca3f1.jpg

Answered: (1) Consider (= ((a,ß)la.BER} Define…

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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The set W={( 2х х —2х `); x ER} is Select one: O a. Closed under both vector addition and scalar multiplication O b. None of the above O c. Closed under scalar multiplication only O d. Closed under vector addition only
4. Use indicial notation to prove the following vector identity (Ả × B) · (Ĉ × Ď) = (Ã · Ĉ)(D · B) – (Ã · D)(B · C)
Evaluate Whem olubom sd how Eijkεjkl Elmn Emni に good of where Eijk are components of the alternating tensor.
Instead of using the standard definitions of addition and scalar multiplication in R³, suppose these two operations are defined as follows. (x1, Y1, 21) + (x2, Y2, 2) = (x1 + x2 + 1, y1 + y2 + 1, 21 + 22 + 1) c(x, y, z) = (cx +c - 1, cy + e – 1, cz + e – 1) With these new definitions, Show that it satisfies the Axioms 5,6, and 7
Let i =, =, and i =. Please do all of the following. (a) Compute i x w. (b) Compute the scalar triple product (ü x w) - Ë.
Let v = (60, – 5, – 5) and w = (– 4, – 30, 22) be ordered triples in R’. Find two scalars c1 and c2 such that C1V + c2w = (44, – 20, 8). - List the exact values of c1 and c2 separated by commas:
Find the transpose, conjugate, and adjoint of (i) Transpose is idempotent: (4¹) = A. (ii) Transpose respects addition: (A + B) = A¹+ B¹. (iii) Transpose respects scalar multiplication: (c. A)¹ = c A. These three operations are defined even when m‡n. The transpose and adjoint are both functions from CX to Cxm These operations satisfy the following properties for all c E C and for all A, B € CX". (iv) Conjugate is idempotent: A = A. (v) Conjugate respects addition: A 6-3i 0 1 B = A + B (vi) Conjugate respects scalar multiplication: C. A = c. A. (vii) Adjoint is idempotent: (4†)t = 4. (viii) Adjoint respects addition: (A + B) =A+B+. (ix) Adjoint relates to scalar multiplication: (CA)t = c · At 2 + 12i 5+2.1i 2+5i -19i 17 3-4.5i
II. Solve all problems completely. Let V = {x : x € R*} (set of positive real numbers) with the operations 1. x +y x+y and r•x= x". 2 = Is vector addition associative? Show your solution. b. What is the "zero" element in V? Is it unique? Explain your answer. Is V closed under scalar multiplication? Explain your answer. d. Is the distributive law of vector multiplication over addition (M2) satisfied? Show your solution. а. С.
27. Using the Levi-Civita symbol expand the following vector products: (i) (ii) Vx(Ā×B) X (XB) noitonut siiebbe st

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