Let a=(1,0,3), b=(0,2,0), c=(1,2,0) in R^3
and let x=(1,3), y=(0,2), z=(0,1).
How do i decide whether
L: a->x, b->y, and c->z
Is a linear map, show it is unique, and if so find a basis for its kernel and image.
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Let a=(1,0,3), b=(0,2,0), c=(1,2,0) in R^3
and let x=(1,3), y=(0,2), z=(0,1).
How do i decide whether
L: a->x, b->y, and c->z
Is a linear map, show it is unique, and if so find a basis for its kernel and image.