Question: We defined by RO! the set of all function from [0, 1] = {te R : 0 We defined by the set Of all function

We defined by the set Of all function from [O , {t

We defined by RO! the set of all function from [0, 1] = {te R : 0

We defined by the set Of all function from [O , {t R:ostfl} to R. There is a subset P of the ring for which (RIO'II, P) is an ordered ring. (If a ring can be ordered need to follow: 1. P Q. 2. For all r, y P, then x + y P and Ty e P. 3. For every x P, only one possibilities holds : P, x P, or r = OR Indicate whether the statement is true or false and justify the answer with a proof or a counterexample

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