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Unformatted text preview: A.
(Hint: Choose something simple as Example 4 did.)
c. Verify that
qualify to form a basis. What condition must be satisfied?
d. Write the representation of w.r.t. the basis
.
e. Find the change of basis matrix Q and verify that ̅
. Solution
a. Rank = 4, Nullity = 0
[ b.
c. [ [ , which has rank 4. Therefore all columns are linearly independent and this qualifies as a basis. d. [ e. Same as part c. 7 December 2012 7 Dept. of ECE, Drexel University...
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This document was uploaded on 04/04/2014.
 Spring '14

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