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blacktoad151Lv1
6 Nov 2019
Show that the given sets of vectors are subspaces of R^m.
1. The set of all m-vectors whose first component is 0 (ofR^m).
2. The set of all vectors (x,y,z) such that x+y+z=0 (ofR^3).
Show that the given set of vectors do not form subspaces ofR^m.
1. The set of all m-vectors whose first component is 2 (ofR^m).
Show that the given sets of vectors are subspaces of R^m.
1. The set of all m-vectors whose first component is 0 (ofR^m).
2. The set of all vectors (x,y,z) such that x+y+z=0 (ofR^3).
Show that the given set of vectors do not form subspaces ofR^m.
1. The set of all m-vectors whose first component is 2 (ofR^m).
Jamar FerryLv2
26 Aug 2019