Let u = (3,6, –6), v= (0, –1,0), w= (6,9, h – 6). Determine the value for h so that w is in the span of the vectors u and v. h = Determine the value for h so that u is in the span of the vectors v and w. h = Select an Answer 1. If h equals the value in the first question above, determine whether or not the set {u, v, w} is linearly independent. Select an Answer Linearly Independent Linearly Dependent ton this problem.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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Let u = (3,6, –6), v = (0, –1, 0), w = (6,9, h – 6).
Determine the value for h so that w is in the span of the vectors u and v.
h =
Determine the value for h so that u is in the span of the vectors v and w.
h
Select an Answer
1. If h equals the value in the first question above, determine whether or not the set {u, v, w} is linearly independent.
Select an Answer
Linearly Independent
|Linearly Dependent
t on this problem.
Transcribed Image Text:Let u = (3,6, –6), v = (0, –1, 0), w = (6,9, h – 6). Determine the value for h so that w is in the span of the vectors u and v. h = Determine the value for h so that u is in the span of the vectors v and w. h Select an Answer 1. If h equals the value in the first question above, determine whether or not the set {u, v, w} is linearly independent. Select an Answer Linearly Independent |Linearly Dependent t on this problem.
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