5t 3s +5t Show that W is a subspace of R* by finding vectors u and v such that W = Span{u,v}. Let W be the set of all vectors of the form 2t 2s Write the vectors in W as column vectors. 5t 3s+5t E su + tv 2t 2s What does this imply about W? O A. W=u+ v O B. W=Span(u,v} O C. W=s+t O D. W=Span(s.t) Explain how this result shows that W is a subspace of R*. Choose the correct answer below. O A. Since u and v are in R and W = u + v, W is a subspace of R* O B. Since s and t are in R and W = u +v, W is a subspace of R* O C. Since s and t are in R and W = Span{u.v}. W is a subspace of R*. D. Since u and v are in R and W= Span{u,v), W is a subspace of R* DOOD 000 O O

5t 3s +5t Show that W is a subspace of R* by finding vectors u and v such that W = Span{u,v}. Let W be the set of all vectors of the form 2t 2s Write the vectors in W as column vectors. 5t 3s+5t E su + tv 2t 2s What does this imply about W? O A. W=u+ v O B. W=Span(u,v} O C. W=s+t O D. W=Span(s.t) Explain how this result shows that W is a subspace of R. Choose the correct answer below. O A. Since u and v are in R and W = u + v, W is a subspace of R O B. Since s and t are in R and W = u +v, W is a subspace of R* O C. Since s and t are in R and W = Span{u.v}. W is a subspace of R. D. Since u and v are in R and W= Span{u,v), W is a subspace of R DOOD 000 O O

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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Linear Algebra

In mathematics, problems can be solved by the arithmetic operators like addition, subtraction, multiplication, and division. In algebra, we represent the numbers by any letter called a variable. If these variables are of degree 1, then it is studied under linear algebra. The first-degree equations involving algebraic expressions are called linear equations. That is, if you represent it by drawing a graph you will get a straight line.

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5t
4
Show that W is a subspace of R* by
3s+5t
finding vectors u and v such that W= Span{u.v}.
Let W be the set of all vectors of the form
2t
2s
Write the vectors in W as column vectors.
5t
3s +5t
+t
= su + tv
2t
2s
What does this imply about W?
O A. W=u+v
O B. W= Span{u,v}
O C. W=s+t
O D. W=Span{s.t)
Explain how this result shows that W is a subspace of R*. Choose the correct answer below.
O A. Since u and v are in R and W= u+ v, W is a subspace of R*
O B. Since s and t are in R and W= u +v, W is a subspace of R*
O C. Since s and t are in R and W= Span{u,v}, W is a subspace of R*,
O D. Since u and v are in R and W = Span{u.v}, W is a subspace of R*

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