1. Let T: R3 → R3 be the linear transformation that projects vector u onto the vector v = (2, 2, 1). (i) (ii) (ii) Find the rank and nullity of T. Find a basis for the kernel of T. Determine whether T is 1-1, onto, an isomorphism.
1. Let T: R3 → R3 be the linear transformation that projects vector u onto the vector v = (2, 2, 1). (i) (ii) (ii) Find the rank and nullity of T. Find a basis for the kernel of T. Determine whether T is 1-1, onto, an isomorphism.
1. Let T: R3 → R3 be the linear transformation that projects vector u onto the vector v = (2, 2, 1). (i) (ii) (ii) Find the rank and nullity of T. Find a basis for the kernel of T. Determine whether T is 1-1, onto, an isomorphism.
Branch of mathematics concerned with mathematical structures that are closed under operations like addition and scalar multiplication. It is the study of linear combinations, vector spaces, lines and planes, and some mappings that are used to perform linear transformations. Linear algebra also includes vectors, matrices, and linear functions. It has many applications from mathematical physics to modern algebra and coding theory.
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