1.5 KiB
1.5 KiB
id | challengeType | title |
---|---|---|
5900f4f81000cf542c51000b | 5 | Problem 396: Weak Goodstein sequence |
Description
The sequence terminates when gk becomes 0.
For example, the 6th weak Goodstein sequence is {6, 11, 17, 25, ...}: g1 = 6. g2 = 11 since 6 = 1102, 1103 = 12, and 12 - 1 = 11. g3 = 17 since 11 = 1023, 1024 = 18, and 18 - 1 = 17. g4 = 25 since 17 = 1014, 1015 = 26, and 26 - 1 = 25.
and so on.
It can be shown that every weak Goodstein sequence terminates.
Let G(n) be the number of nonzero elements in the nth weak Goodstein sequence. It can be verified that G(2) = 3, G(4) = 21 and G(6) = 381. It can also be verified that ΣG(n) = 2517 for 1 ≤ n < 8.
Find the last 9 digits of ΣG(n) for 1 ≤ n < 16.
Instructions
Tests
tests:
- text: <code>euler396()</code> should return 173214653.
testString: assert.strictEqual(euler396(), 173214653, '<code>euler396()</code> should return 173214653.');
Challenge Seed
function euler396() {
// Good luck!
return true;
}
euler396();
Solution
// solution required