Problem

A square matrix is called upper triangular if all of the entries below the main diagona...

A square matrix is called upper triangular if all of the entries below the main diagonal are zero. Thus, the form of an upper triangular matrix is

where the entries marked * are arbitrary. A more formal definition of such a matrix

Prove that the product of two upper triangular n × n matrices is upper triangular.

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Solutions For Problems in Chapter 3.2

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