Question: Construct a Taylor polynomial approximation that is accurate to within 103, over the interval [0.5,0.5], using x0=0, for f(x)=ln(1+x) Input the lowest power of x,n,
Construct a Taylor polynomial approximation that is accurate to within 103, over the interval [0.5,0.5], using x0=0, for f(x)=ln(1+x) Input the lowest power of x,n, required then colon then the first three non zero coefficients rounded to four decimal places, including zeros, separated by colons. For example if your answer is power =3 and Polynomial approximation = T(x)=1+x/3x3/5 Then inpur 3:1.0000:0.3333:0.2000
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