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Euler's Totient function, `phi(n)` [sometimes called the phi function], 
is used to determine the number of positive numbers less than or equal to 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`.

The number 1 is considered to be relatively prime to every positive number, so `phi(1)=1`.

Interestingly, `phi(87109)=79180`, and it can be seen that `87109` is a permutation of `79180`.

Find the value of `n`, `1 < n < 10^7`, for which `phi(n)` is a permutation of n and the ratio `n/phi(n)` produces a minimum.
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 positive numbers less than or equal to 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`.

			The number 1 is considered to be relatively prime to every positive number, so `phi(1)=1`.

			Interestingly, `phi(87109)=79180`, and it can be seen that `87109` is a permutation of `79180`.

			Find the value of `n`, `1 < n < 10^7`, for which `phi(n)` is a permutation of n and the ratio `n/phi(n)` produces a minimum.