(New page: =MA351 MA 351 Homework 8= (Copied from User_talk:Sun21.) ---- ==3.2 #24 == When a vector [V] is in the span of Ker(A), it means that the linear transformation of [V]([A])=the zer...) |
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Revision as of 07:04, 21 October 2010
MA351 MA 351 Homework 8
(Copied from User_talk:Sun21.)
3.2 #24
When a vector [V] is in the span of Ker(A), it means that the linear transformation of [V]([A])=the zero vector.
So... The vector that makes the vector A zero is in the span of Ker(A)
3.2 #28
Use theorem 3.2.4.
But first determine whether each column is linearly independent.
3.2 #45
Use summary 3.1.8 on Pg. 109
Note that ker(A)=zero vector, that means all columns in A are linearly independent.
3.3 #28
to form a basis of R4, the RREF of A must be I4.
