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Consider a set X ≠ ∅. Let f and g be functions f : X → R and g : X → R both having
bounded ranges. Show that
inf{f(x) | x ∈ X} + inf{g(x) | x ∈ X} ≤ inf{f(x) + g(x) | x ∈ X}------------------------ (1)
------------------------------------------≤ inf{f(x) | x ∈ X} + sup{g(x) | x ∈ X}-------- (2)
------------------------------------------≤ sup{f(x) + g(x) | x ∈ X}----------------------- (3)
------------------------------------------≤ sup{f(x) | x ∈ X} + sup{g(x) | x ∈ X}------- (4)
Also, give examples to show that each inequality is strict.
Okay, so I really want to use the triangle inequality here, but I'm not really sure how to "throw in" absolute values since they are not present in the problem already. Also, I don't want help on all of the inequalities here but would definitely appreciate help on the first two. I think that once I get the idea that I will be able to do the rest of the problem myself. Also, not really sure how to give examples as the problem that I am having with this is understanding the inf, sup on functions. I would totally understand this problem if it were related to some sets without the functions. Anyway, any help is really appreciated and thanks in advance!
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