--description--

We say that a $d$-digit positive number (no leading zeros) is a one-child number if exactly one of its sub-strings is divisible by $d$.

For example, 5671 is a 4-digit one-child number. Among all its sub-strings 5, 6, 7, 1, 56, 67, 71, 567, 671 and 5671, only 56 is divisible by 4.

Similarly, 104 is a 3-digit one-child number because only 0 is divisible by 3. 1132451 is a 7-digit one-child number because only 245 is divisible by 7.

Let $F(N)$ be the number of the one-child numbers less than $N$. We can verify that $F(10) = 9$, $F({10}^3) = 389$ and $F({10}^7) = 277\,674$.

Find $F({10}^{19})$.

--hints--

oneChildNumbers() should return 3079418648040719.

assert.strictEqual(oneChildNumbers(), 3079418648040719);

--seed--

--seed-contents--

function oneChildNumbers() {

  return true;
}

oneChildNumbers();

--solutions--

// solution required