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| Divisible? Yes and No. (Posted on 2011-08-15) |
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Prove that 3^105+4^105 is divisible by 13*49*181*379 but is not divisible by either 5 or 11.
Solution
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Comment 3 of 3 | 
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If a and b are odd integers with ab = 105, and if 3a + 4a = 0 (mod m), then:
3a = - 4a = (-4)a (mod m). Therefore: 3ab = (-4)ab = - 4ab
giving : 3105 + 4105 = 0 (mod m). So 3105 + 4105 is divisible by m.
Using this result in each case:
33 + 43 = 27 + 64 = 91 = 0 (mod 13), so 13 divides 3105 + 4105
37 + 47 = 2187 + 16384 = 18571 = 0 (mod 49) so 49 divides 3105 + 4105
35 + 45 = 243 + 1024 = 1267 = 0 (mod 181) so 181 divides 3105 + 4105
37 + 47 = 2187 + 16384 = 18571 = 0 (mod 379) so 379 divides 3105 + 4105
It follows that 3105 + 4105 is divisible by 13*49*181*379, since 13, 49, 181
and 379 have no common factors,
Now on a different tack: 3105 = (3)(34)26 = 3*8126 = 3*126 = 3 (mod 5)
and: 4105 = (4)(42)52 = 4*1652 = 4*152 = 4 (mod 5)
So 3105 + 4105 = 2 (mod 5) and therefore is not divisible by 5.
Also: 3105 = (35)21 = 24321 = 121 = 1 (mod 11)
and: 4105 = (45)21 = 102421 = 121 = 1 (mod 11)
So 3105 + 4105 = 2 (mod 11) and therefore is not divisible by 11.
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Posted by Harry
on 2011-08-16 23:11:17 |
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