ホーム - Project Euler

Problem 71¶

Ordered Fractions¶

Consider the fraction, $\dfrac n d$, where $n$ and $d$ are positive integers. If $n \lt d$ and $\operatorname{HCF}(n,d)=1$, it is called a reduced proper fraction.

If we list the set of reduced proper fractions for $d \le 8$ in ascending order of size, we get:
$$\frac 1 8, \frac 1 7, \frac 1 6, \frac 1 5, \frac 1 4, \frac 2 7, \frac 1 3, \frac 3 8, \mathbf{\frac 2 5}, \frac 3 7, \frac 1 2, \frac 4 7, \frac 3 5, \frac 5 8, \frac 2 3, \frac 5 7, \frac 3 4, \frac 4 5, \frac 5 6, \frac 6 7, \frac 7 8$$

It can be seen that $\dfrac 2 5$ is the fraction immediately to the left of $\dfrac 3 7$.

By listing the set of reduced proper fractions for $d \le 1,000,000$ in ascending order of size, find the numerator of the fraction immediately to the left of $\dfrac 3 7$.

順序分数¶

nとdを正の整数として, 分数 n/d を考えよう. n<d かつ HCF(n,d)=1 のとき, 真既約分数と呼ぶ.

d ≤ 8について既約分数を大きさ順に並べると, 以下を得る:

3/7のすぐ左の分数は2/5である.

d ≤ 1,000,000について真既約分数を大きさ順に並べたとき, 3/7のすぐ左の分数の分子を求めよ.