Let I b) be a bounded open R be a monotone increasing function on I. (i) If f is bounded above on I, then lim f(x) - x168 (ii) If f is bounded below on I, then lim f(x) - x-at val alic sup f(x). x=(a,b) inf f(x). ze(a,b)

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Let I = (a, b) be a bounded open interval and f:I → R be a monotone increasing function on I. (i) If fƒ is bounded above on I, then lim f(x) sup f(x). x = (a,b) x→6- (ii) If ƒ is bounded below on I, then lim f(x)= inf f(x). ze(a,b) x→a+ to ∞. (iii) If ƒ is unbounded above on I, then lim f(x) (iv) If ƒ is unbounded below on I, then lim f(x) x→b- xat -∞o.