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Teachers Notes This is a brief but very interesting look, at the Von Koch Snowflake Curve. After introducing the curve and discussing its generation, the students are simply asked to derive the perimeter formula for nth iteration. We then move on to discuss the curve’s finite area and reveal, (by reference to the formula) its infinite perimeter. Students are encouraged to generate a spreadsheet from the formula for the first 50 terms in the sequence to convince themselves of the infinity of the perimeter. (Spreadsheet is at slide 16). There is a printable worksheet if needed at slide 18 (some students may wish to make jottings/notes on it). If you want to extend still further for the very able, then you might wish to see if they can work out the area An for the nth iteration.

The Von Koch Snowflake

The Von Koch Snowflake

The Von Koch Snowflake

The Von Koch Snowflake

The Von Koch Snowflake

The Von Koch Snowflake P0 = L 1 3 L 1 3 L 1 3 L The curve is generated from an equilateral triangle by trisecting the sides and constructing this smaller equilateral triangle on each of the sides. This is then repeated ad infinitum. 1 3 L

The Von Koch Snowflake P0 = L P1 = 4 3 L 1 3 L 1 3 L 1 3 L Thinking about the increased length of this side, what will the first new perimeter, P1 be? 1 3 L

The Von Koch Snowflake P0 = L P1 = 4 3 L P2 =( )2 4 3 L 1 3 L 1 3 L 1 Derive a general formula for the perimeter of the nth curve in this sequence, Pn. 1 3 L

The Von Koch Snowflake P0 = L P1 = 4 3 L P2 =( )2 4 3 L 1 3 1 3 Derive a general formula for the perimeter of the nth curve in this sequence, Pn. Pn =( )n 4 3 L 1 3

P1 = 4 3 L P0 = L A0 A1 A2 A3 P2 =( )2 4 3 L P3 =( )3 4 3 L The area An of the nth curve is finite. This can be seen by constructing the circumscribed circle about the original triangle as shown. A2 A3 P2 =( )2 4 3 L P3 =( )3 4 3 L

P1 = 4 3 L P0 = L A0 A1 Pn =( )n 4 3 L A2 A3 P2 =( )2 4 3 L P3 =( )3 4 It is a surprising fact therefore that the perimeter of the curve is infinite. Pn =( )n 4 3 L A2 A3 P2 =( )2 4 3 L P3 =( )3 4 3 L

P1 = 4 3 L P0 = L A0 A1 Pn =( )n 4 3 L A2 A3 P2 =( )2 4 3 L P3 =( )3 4 Whatever fixed value you care to make the perimeter of any curve in the sequence it can always be exceeded by choosing a large enough value for n. Pn =( )n 4 3 L A2 A3 P2 =( )2 4 3 L P3 =( )3 4 3 L

P1 = 4 3 L P0 = L A0 A1 Pn =( )n 4 3 L A2 A3 P2 =( )2 4 3 L P3 =( )3 4 Use a spreadsheet to compute the first 50 values for the perimeter. Set P0 = 1. Pn =( )n 4 3 L A2 A3 P2 =( )2 4 3 L P3 =( )3 4 3 L

P0 1 P1 1.333 P26 1771.769 P2 1.778 P27 2362.359 P3 2.370 P28 3149.812 P4 3.160 P29 4199.749 P5 4.214 P30 5599.666 P6 5.619 P31 7466.221 P7 7.492 P32 9954.961 P8 9.989 P33 13273.282 P9 13.318 P34 17697.709 P10 17.758 P35 23596.945 P11 23.677 P36 31462.593 P12 31.569 P37 41950.125 P13 42.092 P38 55933.499 P14 56.123 P39 74577.999 P15 74.831 P40 99437.332 P16 99.775 P41 132583.110 P17 133.033 P42 176777.480 P18 177.377 P43 235703.306 P19 236.503 P44 314271.075 P20 315.337 P45 419028.100 P21 420.449 P46 558704.133 P22 560.599 P47 744938.844 P23 747.465 P48 993251.792 P24 996.620 P49 1324335.722 P25 1328.827 P50 1765780.963

The Von Koch Snowflake The perimeter of the Von Koch Snowflake Curve is infinite. Just as the coast line of the UK is infinite. The smaller the ruler that you use to measure the coast line, the longer it becomes. Coast line  11 000 miles