3
answers
0
watching
299
views
1 Aug 2018
4. Let S= 1 1 , and consider the subspace W = Span(S) of R. (a) Show that S is an orthogonal basis for W. (b) Let x = 2. Find projw(x). 11 (c) Let x = 12 be an arbitrary vector in R3. Find projw(x) and then find a matrix A such that projw(x) = Ax.
4. Let S= 1 1 , and consider the subspace W = Span(S) of R. (a) Show that S is an orthogonal basis for W. (b) Let x = 2. Find projw(x). 11 (c) Let x = 12 be an arbitrary vector in R3. Find projw(x) and then find a matrix A such that projw(x) = Ax.
13 Jun 2023
brain-a380Lv10
8 Nov 2022
Already have an account? Log in
Collen VonLv2
2 Aug 2018
Already have an account? Log in