Show that there is a nonnegative integer n such that the set of n-equivalence classes of states of M is the same as the set of (n + I)-equivalence classes of states of M. Then show for this integer n, the set of n-equivalence classes of states of M equals the set of *-equivalence classes of states of M.

# Show that there is a nonnegative integer n such that the

## Problem 12.3.59 Chapter 12.3

Discrete Mathematics and Its Applications | 6th Edition

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Discrete Mathematics and Its Applications | 6th Edition

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