--description--

The radical of $n$, $rad(n)$, is the product of distinct prime factors of $n$. For example, $504 = 2^3 × 3^2 × 7$, so $rad(504) = 2 × 3 × 7 = 42$.

We shall define the triplet of positive integers (a, b, c) to be an abc-hit if:

1. $GCD(a, b) = GCD(a, c) = GCD(b, c) = 1$
2. $a < b$
3. $a + b = c$
4. $rad(abc) < c$

For example, (5, 27, 32) is an abc-hit, because:

1. $GCD(5, 27) = GCD(5, 32) = GCD(27, 32) = 1$
2. $5 < 27$
3. $5 + 27 = 32$
4. $rad(4320) = 30 < 32$

It turns out that abc-hits are quite rare and there are only thirty-one abc-hits for $c < 1000$, with $\sum{c} = 12523$.

Find $\sum{c}$ for $c < 120000$.

--hints--

abcHits() should return 18407904.

assert.strictEqual(abcHits(), 18407904);

--seed--

--seed-contents--

function abcHits() {

  return true;
}

abcHits();

--solutions--

// solution required