Will it ever converge?

If KS travels half the distance to the bus stop for every move, will he ever reach the bus stop?

The answer is that I will never reach the bus stop, but could make arbitrarily close to it. This excellent example of an geometric progression is called the dichotomy paradox.

Credits: www.learner.org

We all know that to prove that a GP converges, show $|r|<1$ . But I’ve heard a handful of students asking why. So today, lets break it down together.

The very idea of |r|

If $r = 0$ , it’s obvious that my GP converges.

If $1<r<0$ or $0<r<1$ , we can suggest that r is simply a decimal number less than +/-1, then r^n will simply get smaller as n increases, until it is arbitrarily so small that it’s almost 0. Even if we say r = 0.99999, 0.99999^1000 will not give you 1, it instead, gives you a really small number.

I hope these helps to clear the air for this condition. A food for thought, if I am not given the value of r, will I still be able to prove if it converges? 🙂

About

KS Teng

KS has been teaching H2/H1 Mathematics and IB mathematics for the more than 10 years. Having taught students from all various Junior Colleges, KS adapts to students' abilities and help them better understand the topics. As someone who loves to teach mathematics and sees it as a truly useful tool in life, KS seeks to enable students to appreciate math. Therefore, his tuition mission is to motivate and cultivate students to be independent and confident thinkers.

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APGP, Sequence & Series related articles – The Culture
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April 24th, 2016 05:20 PM

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