Chapter 10.5, Problem 72E

To determine

To find: which number of series is matched with the another number of series.

Answer to Problem 72E

Hence, the two series converge to the same number, that is, $45.$

Explanation of Solution

Given information:

Within the group, each student construct a series that converges to one of the numbers $1$ ,…., $n$ .

Calculation:

The group activity was carried out. Answers varied.

One of the numbers that matched with the series of one of the students in group 1 with the series of one of the students in group 2 was $45.$

Series $1:15,10,\frac{20}{3},\frac{40}{9},\frac{80}{27},\dots$

Sum of this infinite Geometric progression will be

  $S=\frac{a}{1-r}$

where a is first term $\left(=5\text{ in this case}\right)\text{ and }r\text{ is common ratio}$ $\left(\frac{2}{3}\text{ in this case}\right),\text{ also }$ $-1<r<1$

Hence,

  $S_1=\frac{15}{1-\frac{2}{3}}$

  $S_1=\frac{15}{1-\frac{2}{3}}$

  $=45$

Series $2:5,\frac{40}{9},\frac{320}{81},\frac{2560}{729},\dots$

Sum of this infinite Geometric progression will be

  $S=\frac{a}{1-r}$

where $a$ is first term $\left(=5\text{ in this case}\right)$ and $r$ common ratio $\left(=\frac{8}{9}\text{ in this case}\right)$ , also $-1<r<1$

Hence,

  $\begin{array}{cc}{S}_2& =\frac{5}{1-\frac{8}{9}}=5\times 9\\ & =45\end{array}$

As can be seen from above, the two series converge to the same number, that is, $45.$

Hence, the two series converge to the same number, that is, $45.$