perplexus.info :: Just Math : Looks like Cauchy

Looks like Cauchy (Posted on 2019-04-17)

For all positive integers k, define f(k)=k²+k+1. Compute the largest positive integer n such that

2019f(1²)f(2²)...f(n²)>=(f(1)f(2)...f(n))²

No Solution Yet Submitted by Danish Ahmed Khan

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Weak solution

| Comment 2 of 3 |

f(k)^2=k^4+2k^3+3k+2+2k+1

f(k^2)=k^4+k^2+1

The ratio of these values forms a nice pattern:

k=1, 3/1

k=2, 7/3

k=3, 13/7

k=4, 21/13

k=5, 31/21

So the product of these is just the last numerator, which we need to be at most 2019. Continuing the table

k=44, 1981/1893 (smaller)

k=45, 2071/1981 (too big)

Without looking too hard into why this works, the solution is n=44

Posted by Jer on 2019-04-18 11:07:17

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