1549901369-Elements_of_Real_Analysis__Denlinger_

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106 Chapter 2 • Sequences


11. Consider the sequence {xn} defined inductively by x 1 = 1, and \:Jn E N,
Xn+i = ~Xn + 6. Prove that {xn} converges, and find its limit.
1
12. Define {xn} inductively by X1 = 1 and Xn+l = Xn +-.Prove that {xn}
Xn
is monotone increasing, but diverges.
1
13. Define {xn} inductively by x 1 = 2 and Xn+l = 2--. Write out the first
Xn
few terms of this sequence and conjecture a formula for Xn. Prove this
formula by mathematical induction, and use it to find lim Xn·
n->oo

{

1 · 3 · 5 · 7 · · · · · (2n - 1) }
1 4. Prove that ( ) converges.^10
2 · 4 · 6 · 8 · · · · · 2n



  1. Use the method of Example 2.5. 12 to calculate .JIO to four decimal places.




  2. Use the method of Example 2 .5.12 to calculate J45 to five decimal places.




  3. Use the methods of this section to give an easy proof of Theorem 2.3.7.




  4. Prove Theorem 2.5.13 (b).




19. Prove Theorem 2.5.14 (b).

. n 1.
20. About how large 1s Sn = L k when n = 500, 000?


21.

22.

k=l
n 1
\:Jn EN, let Sn = ~ k(k + l). Prove that {Sn} converges, and find its

limit. Hint: Find an easy formula for Sn by writing it out as a sum and
using the "partial fraction decomposition" of k(k ~ l)

n 1
\:Jn E N, let Tn = L k 2. Prove that {Tn} converges. [Hint: use the
k=l
monotone convergence theorem combined with Exercise 21.]


  1. Prove or disprove (if false, give a counterexample.):
    (a) If {xn} and {yn} are both monotone increasing, then so is their sum
    {xn + Yn}·
    (b) If {xn} and {Yn } are both monotone increasing, then so is their
    difference { Xn -Yn}.

  2. In fact, the limit is 0 , but the proof is postponed until Exercise 8.2.44.

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