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13 Nov 2019
Can somebody provide me the step by step solution to these problems I tried my best But couldn't solve it Thank you!
2. Consider an equilateral triangle with area A 1. for each side the the triangle, we choose the middle third as a base for 3 other smaller equilateral triangles. For each the the new triangles, we again choose the middle third and place triangles on them. If we continue adding triangles in this fashion ad infinitum, we will have constructed the Koch Snouflake. Let Ao be the area of the single triangle, let A1 be the area of the first and second iterations, and An be the total area found for n iterations. (a) Draw the first 4 iterations of the Koch snowflake. (b) Write out the first four terms of the sequence (An). (c) Compute the total of area of the Koch snowflake. (d) How long is the perimeter? 3. Evaluate the integral dr by expressing the integral as an infinite sum. Note: lr] denotes the floor of r,
Can somebody provide me the step by step solution to these problems I tried my best But couldn't solve it Thank you!
2. Consider an equilateral triangle with area A 1. for each side the the triangle, we choose the middle third as a base for 3 other smaller equilateral triangles. For each the the new triangles, we again choose the middle third and place triangles on them. If we continue adding triangles in this fashion ad infinitum, we will have constructed the Koch Snouflake. Let Ao be the area of the single triangle, let A1 be the area of the first and second iterations, and An be the total area found for n iterations. (a) Draw the first 4 iterations of the Koch snowflake. (b) Write out the first four terms of the sequence (An). (c) Compute the total of area of the Koch snowflake. (d) How long is the perimeter? 3. Evaluate the integral dr by expressing the integral as an infinite sum. Note: lr] denotes the floor of r,
Bunny GreenfelderLv2
25 May 2019