Right now I am trying to solve Project Euler 71.
Consider the fraction, n/d, where n and d are positive integers. If n
If we list the set of reduced proper fractions for d ≤ 8 in ascending order of size, we get:
1/8, 1/7, 1/6, 1/5, 1/4, 2/7, 1/3, 3/8, 2/5, 3/7, 1/2, 4/7, 3/5, 5/8, 2/3, 5/7, 3/4, 4/5, 5/6, 6/7, 7/8
It can be seen that 2/5 is the fraction immediately to the left of 3/7.
By listing the set of reduced proper fractions for d ≤ 1,000,000 in ascending order of size, find the numerator of the fraction immediately to the left of 3/7.
The Current Code:
from fractions import Fraction import math n = 428572 d = 1000000 x = Fraction(3,7) best = Fraction(0) while d > 1: if Fraction(n,d) >= x: n-=1 else: y = Fraction(n,d) if (x - y) < (x - best): best = y d -= 1 n = int(math.ceil(d*0.428572)) print(best.denominator)
from fractions import Fraction import math
Needed for Fractions and math.ceil.
n = 428572 d = 1000000
These two variables represent the
d stated in the original problem. The numbers start out this way because this is a slightly bigger representation of
3/7 (will be converted to Fraction later).
x = Fraction(3,7) best = Fraction(0)
x is just a quick reference to
Fraction(3,7) so I don't have to keep typing it.
best is used to keep track what fraction is closest to
3/7 but still left of it.
while d > 1:
d <= 1 and
n has to be less than
1 what is the point of checking? Stop check then.
if Fraction(n,d) >= x: n-=1
If the fraction ends up being bigger than or equal to
3/7 it isn't to the left of it, so keep subtracting from
n till it is to the left of
else: y = Fraction(n,d) if (x - y) < (x - best): best = y
If it is to the left of
3/7 see if
y (which is equal to the fraction we need to check) is closer to 0. The one closer to zero will be the least left, or closest to
d -= 1 n = int(math.ceil(d*0.428572))
Regardless of whether best changes or not, the denominator needs to be changed. So subtract one from the denominator and set n the Fraction(n,d) slightly greater (added extra ceil method to make sure it is greater!) than
3/7 to prune the test space.
Finally print what the question wants.
4 (like the test case) gives the desired result of
5 for the denominator. Keeping it as is gives:
Can someone please explain to me what I am doing wrong?