calculus - Prove: Monotonic And Bounded Sequence- Converges

Monday, 25 August 2014

calculus - Prove: Monotonic And Bounded Sequence- Converges

Let $a_n$ be a monotonic and bounded sequence, WLOG let assume it is monotonic increasing.
$a_n$ is bounded therefore there is a Supremum, $Sup(a_n)=a$ , therefore $a_nOn the other hand due to $Sup(a_n)=a$ , there is $N$ such that $a-\epsilontherefore $a-\epsilon< a_n

Is the proof valid? does it apply to strictly monotonic sequence too?

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Monday, 25 August 2014

calculus - Prove: Monotonic And Bounded Sequence- Converges

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real analysis - How to find $lim_{hrightarrow 0}frac{sin(ha)}{h}$

Monday, 25 August 2014

calculus - Prove: Monotonic And Bounded Sequence- Converges

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real analysis - How to find limhrightarrow0fracsin(ha)hlim_{hrightarrow 0}frac{sin(ha)}{h}

real analysis - How to find $lim_{hrightarrow 0}frac{sin(ha)}{h}$