Please keep in mind that this is a proof using this definition of a Limit of a sequence.

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$\text{Show that if }x_n\geq 0\text{ for all } n\in \Bbb{N} \text{ and } \lim (x_n)=0, \text{ then } \lim (\sqrt{x_n}) = 0.$

3.1.3 Definition A sequence X = (z.) in R is said to converge to z E R, or z is said to be a limit of (Zn), if for every ε > Please keep in mind that this is a proof using this definition of a Limit of a sequence.

3.1.3 Definition A sequence X = (z.) in R is said to converge to z E R, or z is said to be a limit of (Zn), if for every ε > 0 there exists a natural number K(e) such that for allnK(e), the terms xn satisfy n- x

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s how lim tron: ヲ Solutio n- as, lim (%)-o fw eweu성 630 a natural nurnbIN kst -6 Now to show lim (VE) =0 that usiy o) tLs we

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Please keep in mind that this is a proof using this definition of a Limit of a sequence.

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