Compute the Feigenbaum delta from the logistic map. The logistic map is given by
,and the Feigenbaum delta is defined as
where 
and where 
is the value of μ for which 
is in the orbit of the period-N cycle with 
. Here is a resonable outline:
Loop 1 Start at period-
with 
, and increment n with each iteration Compute initial guess for using 
, 
and 
. Loop 2 Iterate Newton's method, either a fixed number of times or until convergence
Initialize logistic map
Loop 3 Iterate the logistic map times Compute x and 
Loop 3 (end)
One step of Newton's method
Loop 2 (end)
Save and compute 
Loop 1 (end)
Grading will be done on the converged values of up to 
. Set 
. a0 = 2; a1 = 1+ sqrt(5); d=4;
der = res*(1-res)+ a*(1-2*res)*der;
d = (vpa(a1)-vpa(a0))/(vpa(a)-vpa(a1));
fprintf('Approximaci n mero % us %.15f/n', k,double(d));
total_time= end_time-start_time
