I've been working on Project euler Problem 57 (Love the site!). For this problem a conversion is required between a finite continued fraction and a normal fraction. I devised an algorithm that basically takes the inverse of the last number in a list, add it to the next-to-last and continues until the final fraction remains. For problem 67 it worked maverlously, but this time it stops working after the second iteration (I have to perform the algorithm on multiple continued fractions).
This is the piece of code (I used an external module, namely sympy):
import time from sympy import * from sympy import fraction, Rational, Symbol def cont_fract_to_fraction(cont_frac_list): a=cont_frac_list[-1] b=cont_frac_list[-2] new_reduced=Rational(b,1)+ Rational(1,a) cont_frac_list[-2]=new_reduced del cont_frac_list[-1] if len(cont_frac_list)==1: print cont_frac_list #To check return cont_frac_list else: cont_fract_to_fraction(cont_frac_list) def numerator_higher_denominator(fraction): num=str(fraction) den=str(fraction) if len(num)>len(den): return 1 else: return 0 start=time.time() tally=0 for k in xrange (1, 101): sqrt_eval= for x in xrange (1, k+2): sqrt_eval.append(2) sqrt_eval=cont_fract_to_fraction(sqrt_eval) print sqrt_eval ##To double check #fraction_result=fraction(soln) To introduce later #tally+=numerator_higher_denominator(fraction_result) To introduce later elapsed=time.time()-start print "Solution: ", tally, "Solved in: ", elapsed
I basically test just to see if it gets all the final fraction and the print from the function, before the return, gives the answer, but the print after I assigned the value to sqrt_eval prints None. Here is a test run:
###Test run#### [3/2] #--> function print [3/2] #--> sqrt_eval print [7/5] None [17/12] None [41/29] None [99/70] None [239/169] None [577/408] None [1393/985] None [3363/2378] None [8119/5741] None [19601/13860] None
I've been searching thouroughly for an answer and can't quite find one. Help me debug this, if you can, without altering the code much.