In Exercises 1-4, let S be the collection of vectors in R?that satisfy the given property. In each case, either prove thatS forms a subspace of R² or give a counterexample to showthat it does not.1. x = 02. x2 0, y 2 03. y = 2x4. ху 2 0In Exercises 5-8, let S be the collection of vectors y in R'that satisfy the given property. In each case, either prove thatS forms a subspace of R' or give a counterexample to showthat it does not.5. x = y = z6. z = 2x, y = 0

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Answered: In Exercises 5–8, let S be the…

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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In each part, find a basis for the given subspace of R', and state its dimension. a) All vectors of the form (a, b, 0, d). b) All vectors of the form (a, b, c, d) where a = b+d and c= 26 – d. c) All vectors of the form (a, b, c, d) where a = 26 = -c = 3d.
Day traders typically buy and sell stocks (or other investment instruments) during the trading day and sell all investments by the end of the day. The following table shows the closing prices on September 22, 2015, of 12 stocks selected by your broker, Prudence Swift, as well as the change that day. Tech Stocks Close Change AAPL (Apple) $113.40 -1.81 ADBE (Adobe Systems) $84.66 1.34 EBAY (eBay) $25.61 -0.31 MSFT (Microsoft) $3.90 -0.21 S (Sprint) $4.40 0.02 WIFI (Boingo Wireless) $8.51 0.56 Non-Tech Stocks ANF (Abercrombie & Fitch) $21.81 -0.02 в (Воeing) $133.99 -2.03 F (Ford Motor Co.) $13.91 -0.40 GE (General Electric) $25.10 0.01 GIS (General Mills) $57.12 0.33 JNJ (Johnson & Johnson) $93.26 0.13 On the morning of September 22, 2015, Swift advised you to purchase a collection of three tech stocks and two non-tech stocks, all chosen at random from those listed in the table. You were to sell all the stocks at the end of the trading day. (a) How many possible collections are possible?…
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2. Is the set of vectors of the form a subspace of R? Show your proof. La+2b] 3. Show that the vectors v = (0, 3, 1, -1); v, = (6, 0, 5, 1); v; = (4. -7, 1, 3) form a linearly dependent set in R*? 4. Express V1 in number 3 as linear combination of V2 and V3. 5. For which value of x do the following vectors form a linearly dependent set in R -1 (-1 -1 x,

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In Exercises 5–8, let S be the collection of vectors y in R' that satisfy the given property. In each case, either prove that S forms a subspace of R' or give a counterexample to show that it does not. 5. x = y = z 6. 2 2х, у 0