Putting It Together: Sequences and Series
Marble bust of Zeno of Citium.
As you can see, at every stage the total distance only grows by smaller and smaller amounts. In fact, we are adding the terms of a geometric series whose common ratio is equal to [latex]r={\large\frac{1}{2}}[/latex].
But the process doesn’t really stop, right? What would be the sum of infinitely many terms of the series?
Let [latex]S = \dfrac{1}{2} + \dfrac{1}{4} + \dfrac{1}{8} + \dfrac{1}{16} + \dfrac{1}{32} + \cdots[/latex], which represents the sum of all stages of the journey.
Here, we have initial term [latex]a_1={\large\frac{1}{2}}[/latex], and because [latex]-1 < r < 1[/latex], we can use the formula for the sum of an infinite geometric series.
[latex]S ={\Large\frac{a_1}{1 - r}}={\Large\frac{\frac{1}{2}}{1 - \frac{1}{2}}}={\Large\frac{\left(\frac{1}{2}\right)}{\left(\frac{1}{2}\right)}}= 1.[/latex]
Notice that the formula correctly sums the infinitely many distances that make up the full mile. What Zeno did not realize is that an infinite series could have a finite sum!Licenses & Attributions
CC licensed content, Original
- Putting It Together: Sequences and Series. Authored by: Lumen Learning. License: CC BY: Attribution.
- 4 number lines depicting Zeno's Paradox. Authored by: Shaun Ault for Lumen. License: CC BY: Attribution.
CC licensed content, Shared previously
- Marble bust of Zeno of Citium. Authored by: Jeremy Weate. License: CC BY: Attribution.
