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10 Nov 2019
4. Let T be a transformation on R3 defined by T1 T3 7 (a) Is T a linear transformation on R3? If it is, find the matrix representation A for T under the standard basis. (b) Find the dimension and a basis A of the kernel Ke(T) of the transformation T (c) Find the dimension and a basis B of the image Im(T) of the transformation T (d) Is the vector 17 in the image Im(T) of T? If it is, find [s, where B is the basis 29 you found in (c).
4. Let T be a transformation on R3 defined by T1 T3 7 (a) Is T a linear transformation on R3? If it is, find the matrix representation A for T under the standard basis. (b) Find the dimension and a basis A of the kernel Ke(T) of the transformation T (c) Find the dimension and a basis B of the image Im(T) of the transformation T (d) Is the vector 17 in the image Im(T) of T? If it is, find [s, where B is the basis 29 you found in (c).
Collen VonLv2
4 Mar 2019