2. Let A be an (m x n)-matrix and B an (n x t)-matrix over R. (a) Show that row(AB) C row (B). Further, if A is invertible (m = n), then row(AB) = row(B). %3D %3D (b) Show that rank(AB) < rank(B). Further, if A is invertible (m = n), then rank(AB) = rank(B). %3D %3D

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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please help with question 2a and 2b ONLY NEVER MIND THE OTHER CONTENT

(d) Let A := 0 1 1 2
2 1 2 3
,u :=
2 and v := [1 22 1]. Then, u E col(A) and vg row
2. Let A be an (m x n)-matrix and B an (n x t)-matrix over R.
(a) Show that row(AB) C row(B).
Further, if A is invertible (m = n), then row(AB) = row(B).
(b) Show that rank(AB) < rank(B).
Further, if A is invertible (m = n), then rank(AB) = rank(B).
Transcribed Image Text:(d) Let A := 0 1 1 2 2 1 2 3 ,u := 2 and v := [1 22 1]. Then, u E col(A) and vg row 2. Let A be an (m x n)-matrix and B an (n x t)-matrix over R. (a) Show that row(AB) C row(B). Further, if A is invertible (m = n), then row(AB) = row(B). (b) Show that rank(AB) < rank(B). Further, if A is invertible (m = n), then rank(AB) = rank(B).
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