first factorize 2730 = 13*7*5*3*2
So we are done if we can show that n^13 == n (mod k), for k=2,3,5,7, and 13.
Use both forms of the Little Theorem...
n^p == n (mod p), for all prime p and a^(p-1) == 1 (mod p) for prime p, when p does not divide n.
Clearly n^13 == n mod 13 ---- (1)
So we are done if we can show that n^13 == n (mod k), for k=2,3,5,7, and 13.
Use both forms of the Little Theorem...
n^p == n (mod p), for all prime p and a^(p-1) == 1 (mod p) for prime p, when p does not divide n.
Clearly n^13 == n mod 13 ---- (1)
n^13 = n = 0 mod 7 if n is multiple of 7
if n is co-prime to 7 then
Also n^7 == n (mod 7) and
n^6 == 1 (mod 7), so
(n^7)*(n^6) = n^13 == n mod 7 ---(2)
n^6 == 1 (mod 7), so
(n^7)*(n^6) = n^13 == n mod 7 ---(2)
n^13 = n = 0 mod 5 if n is multiple of 5
if n is coprime to 5
Again, n^5 == n (mod 5)
and n^4 == 1 (mod 5) => n^8 == 1 (mod 5)
Hence n^13 == n (mod 5) ---(3)
n^2 = 1 mod 3
so n^12 = 1 mod 3 Taking power 6
n^13 = n mod 3 . (4)
n^2 = n mod 2
so n^12 = n^ 6 mod 2 = n^3 mod 2
so n^13 = n^4 mod 2 = n^2 mod 2 = n mod 2 ...5
so from 1,2,3,4,5 we get
n^ 13 = n mod 2730
Again, n^5 == n (mod 5)
and n^4 == 1 (mod 5) => n^8 == 1 (mod 5)
Hence n^13 == n (mod 5) ---(3)
n^13 = n = 0 mod 3 if n is multiple of 3
if n is coprime to3
n^2 = 1 mod 3
so n^12 = 1 mod 3 Taking power 6
n^13 = n mod 3 . (4)
n^13 = n = 0 mod 2 if n is multiple of 2
if n is coprime to 2
n^2 = n mod 2
so n^12 = n^ 6 mod 2 = n^3 mod 2
so n^13 = n^4 mod 2 = n^2 mod 2 = n mod 2 ...5
so from 1,2,3,4,5 we get
n^ 13 = n mod 2730
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