contestada

Suppose that L1 : V β†’ W and L2 : W β†’ Z arelinear transformations and E, F, and G are orderedbases for V, W, and Z, respectively. Show that, if Arepresents L1 relative to E and F and B representsL2 relative to F and G, then the matrix C = BA representsL2 β—¦ L1: V β†’ Z relative to E and G. Hint:Show that BA[v]E = [(L2 β—¦ L1)(v)]G for all v ∈ V.

Respuesta :

akindelemf

Answer:

a) v ∈ ker(L) if only if [tex][V]_{E}[/tex] ∈ N(A)

b) w ∈ L(v) if and only if [tex][W]_{F}[/tex] is in the column space of A

See attached

Step-by-step explanation:

See attached the proof Considering the vector spaces V and W with other bases E and F respectively.

Let L be the Linear transformation form V and W and A is the matrix representing L relative to E and F

Ver imagen akindelemf
Ver imagen akindelemf

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