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Euler's Totient function, `phi(n)` (sometimes called the phi function), 
is used to determine the number of numbers less than n which are relatively prime to n. 
For example, as 1, 2, 4, 5, 7, and 8, are all less than nine and relatively prime to nine, `phi(9)=6`.

n  | Relatively Prime | phi(n) | n/phi(n)
---|------------------|--------|-------
2  | 1                | 1      |  2
3  | 1,2              | 2      |  1.5
4  | 1,3              | 2      |  2
5  | 1,2,3,4          | 4      |  1.25
6  | 1,5              | 2      |  3
7  | 1,2,3,4,5,6      | 6      |  1.1666...
8  | 1,3,5,7          | 4      |  2  
9  | 1,2,4,5,7,8      | 6      |  1.5
10 | 1,3,7,9          | 4      |  2.5

It can be seen that n=6 produces a maximum `n/phi(n)` for `n <= 10`.

Find the value of `n <= 1,000,000` for which `n/phi(n)` is a maximum.
statics data 2017-11-08 17:39:50 +01:00			Euler's Totient function, `phi(n)` (sometimes called the phi function),
			`is used to determine the number of numbers less than n which are relatively prime to n.`
			For example, as 1, 2, 4, 5, 7, and 8, are all less than nine and relatively prime to nine, `phi(9)=6`.

			`n \| Relatively Prime \| phi(n) \| n/phi(n)`
			`---\|------------------\|--------\|-------`
			`2 \| 1 \| 1 \| 2`
			`3 \| 1,2 \| 2 \| 1.5`
			`4 \| 1,3 \| 2 \| 2`
			`5 \| 1,2,3,4 \| 4 \| 1.25`
			`6 \| 1,5 \| 2 \| 3`
			`7 \| 1,2,3,4,5,6 \| 6 \| 1.1666...`
			`8 \| 1,3,5,7 \| 4 \| 2`
			`9 \| 1,2,4,5,7,8 \| 6 \| 1.5`
			`10 \| 1,3,7,9 \| 4 \| 2.5`

			It can be seen that n=6 produces a maximum `n/phi(n)` for `n <= 10`.

			Find the value of `n <= 1,000,000` for which `n/phi(n)` is a maximum.