Block Fractals

Background - Perimeter of the Gasket

First we compute the perimeter of the gasket by finding the perimeters of the triangles that bound it outside and inside.

Level 1 Level 2 Level 3 Level 4

Level Triangle Perimeter Number of Triangles Perimeter of that Level 1 2 + sqrt(2) 1 2 + sqrt(2) 2 (2 + sqrt(2))/2 1 (2 + sqrt(2))/2 3 (2 + sqrt(2))/4 3 3*(2 + sqrt(2))/4 = (3/2)*((2 + sqrt(2))/2) 4 (2 + sqrt(2))/8 32 32*(2 + sqrt(2))/8 = (3/2)2*((2 + sqrt(2))/2) ... ... ... ... n (2 + sqrt(2))/2n-1 3n-2 3n-2*(2 + sqrt(2))/2n-1 = (3/2)n-2*((2 + sqrt(2))/2) Summing the perimeters through level n gives (2 + sqrt(2)) + ((2 + sqrt(2))/2)*(1 + (3/2) + ... + (3/2)n-2) Recognizing the last bracketed sum as a finite geometric series, we see it sums to (1 - (3/2)n-1)/(1 - (3/2)) After some reduction, we see the sum of the perimeters through level n is (2 + sqrt(2))*(3/2)n-1 As n -> infinity, the sum of the perimeters -> infinity and so the gasket has infinite perimeter. Perim sum vs level

Return to Gasket perimeter and area.