1.6.5) Given a nonempty set SC R, prove the following statements about suprema. Also formulate and prove analogous results for infima. Hint: We are not assuming that S is bounded, so first prove these re- sults assuming S is bounded, and then separately consider the case of an unbounded set S. (a) If S has a maximum element then x = sup(S). (b) If te R, then sup(S+t) = sup(S) +t, where S+t= {x+t:x € S}. (S)

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1.6.5) Given a nonempty set SCR, prove the following statements about
suprema. Also formulate and prove analogous results for infima.
Hint: We are not assuming that S is bounded, so first prove these re-
sults assuming S is bounded, and then separately consider the case of an
unbounded set S.
(a) If S has a maximum element x, then x =
sup(S).
(b) If te R, then sup(S+t) = sup(S) +t, where S+t= {x+t:x € S}.
(c) If c 0, then sup(cS) = csup(S), where cS = {cx : x E S}.
(d) If an < bn for every n, then sup a, < sup b2.
Transcribed Image Text:1.6.5) Given a nonempty set SCR, prove the following statements about suprema. Also formulate and prove analogous results for infima. Hint: We are not assuming that S is bounded, so first prove these re- sults assuming S is bounded, and then separately consider the case of an unbounded set S. (a) If S has a maximum element x, then x = sup(S). (b) If te R, then sup(S+t) = sup(S) +t, where S+t= {x+t:x € S}. (c) If c 0, then sup(cS) = csup(S), where cS = {cx : x E S}. (d) If an < bn for every n, then sup a, < sup b2.
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