Description
Problem 10.1: (3.6 #11. Introduction to Linear Algebra: Strang) A is an m by
n matrix of rank r. Suppose there are right sides b for which Ax = b has
no solution.
a) What are all the inequalities (< or ≤) that must be true between m, n,
and r?
b) How do you know that ATy = 0 has solutions other than y = 0?
Problem 10.2: (3.6 #24.) ATy = d is solvable when d is in which of the
four subspaces? The solution y is unique when the contains
only the zero vector.
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