To show that the Cantor set has zerolength. Also to show that the total length of all the intervals removed is 1 , and hence the leftovers must have length zero. Concept Introduction: Cantor set C is defined as a set of points that lies on a single line segment which is having number of remarkable and deep properties. The foundation of the modern point-set topology is Cantor set. C has structure at arbitrarily small scales. C is self-similar. The dimension of C is not an integer.

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Chapter 11.2, Problem 1E

Interpretation Introduction

Interpretation:

To show that the Cantor set has zerolength. Also to show that the total length of all the intervals removed is 1, and hence the leftovers must have length zero.

Concept Introduction:

Cantor set C is defined as a set of points that lies on a single line segment which is having number of remarkable and deep properties. The foundation of the modern point-set topology is Cantor set.

C has structure at arbitrarily small scales.

C is self-similar.

The dimension of C is not an integer.

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