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A square matrix N is called nilpotent if some power of it is the zero matrix, that is, if there is an exponent m 21
A square matrix N is called nilpotent if some power of it is the zero matrix, that is, if there is an exponent m 21 such that N m = 0 . Use determinant properties to prove that a nilpotent matrix cannot be invertible. Find an example of a 2x2 nilpotent matrix that is not the zero matrix
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Financial Algebra advanced algebra with financial applications
Authors: Robert K. Gerver
1st edition
978-1285444857, 128544485X, 978-0357229101, 035722910X, 978-0538449670
