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).

Which of the following sets is a subspace? Set of all vectors in R 3 satisfying the equation x + y - z 2 = 0. Set of all vectors in R 3 satisfying the equation x + y - z = 0. Set of all vectors x in R n satisfying the equation c middot x = 0 where c R n.

Find a basis for each of these subspaces of R4: All vectors whose components arc equal. All vectors whose components add to zero. All vectors that are perpendicular to (1, 1, 0, 0) and (1,0, 1, 1). The column space (in R2) and nullspace (in R5) of U =

Let A = , b = Find all vectors x R3 such that Ax = 0 Recall that 0 is the zero vector whose entries are all zeroes. Find all vectors x R3 such that Ax = b Denote by ker(A) = {x R3|Ax = 0}. Show that if x, y ker(A), and alpha R, then x + y ker(A), and alpha x ker(A). The set ker(A) is called the kernel of the matrix A. The set of vectors b such that Ax = b for some x is called the image of A.