Media Summary: GoldWave f(x)=((x^1)*cos((y^1)*pi*t) +(x^2)*cos((y^2)*pi*t) +(x^3)*cos((y^3)*pi*t) +(x^4)*cos((y^4)*pi*t) +(x^5)*cos((y^5)*pi*t) ... f\left( x,a,N \right)=\sum\limits_{k=1}^{N}{\frac{{{e}^{i\pi {{k}^{a}}x}}}{\pi {{k}^{a}}}} a = Initially introduced by Karl Weierstraß [1] in 1872 the so-called Weierstraß
Weierstrass Function Animation B 0 - Detailed Analysis & Overview
GoldWave f(x)=((x^1)*cos((y^1)*pi*t) +(x^2)*cos((y^2)*pi*t) +(x^3)*cos((y^3)*pi*t) +(x^4)*cos((y^4)*pi*t) +(x^5)*cos((y^5)*pi*t) ... f\left( x,a,N \right)=\sum\limits_{k=1}^{N}{\frac{{{e}^{i\pi {{k}^{a}}x}}}{\pi {{k}^{a}}}} a = Initially introduced by Karl Weierstraß [1] in 1872 the so-called Weierstraß In this video we look at the historical context and intuition behind the An example of a continuous, nowhere differentiable weierstrass function to sound a=0.9 b=7 n:0-17 12sec @ filter