Q:

A 2 × 2 matrix B is upper triangular if

0

A 2 × 2 matrix B is upper triangular if [B]21 = 0. Let UT2 be the set of all 2 × 2 upper triangular matrices. Then UT2 is a subspace of the vector space of all 2 × 2 matrices, M22 (you may assume this). Determine the dimension of UT2 providing all of the necessary justifications for your answer.

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A typical matrix from UT2 looks like

where a, b, c C are arbitrary scalars. Observing this we can then write

which says that

is a spanning set for UT2 (Definition SSVS). Is R is linearly independent? If so, it is a basis for UT2. So consider a relation of linear dependence on R,

From this equation, one rapidly arrives at the conclusion that α1 = α2 = α3 = 0. So R is a linearly independent set (Definition LI), and hence is a basis (Definition B) for UT2. Now, we simply count up the size of the set R to see that the dimension of UT2 is dim (UT2) = 3.

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