Cases:
a < p:
4a = a + p
3a = p
Solution 1: a=1, p=3
a = p:
3p = 2p
not possible
p < a < 2p:
4a - p = a + p
3a = 2p
p=3, a=2 violates the assumption p < a < 2p.
a = 2p
2a = a + p
a = p
violates the assumption a=2p
2p < a < 3p:
4a - 4p = a + p
3a = 5p
p=3, a=5 violates the assumption 2p < a < 3p
a = 3p:
a - 2p + a = a + p
a = 3p
Tautology; works with any prime p
Solution 2: 3p, p where p is any prime
3p < a < 4p:
4a - 3p - 2p - 3p = a + p
3a = 9p
a = 3p violates the assumption 3p < a < 4p
a = 4p:
a - 3p = a + p
4p = 0
no solution
4p < a:
Let a = kp + b
Here we need to get down to subcases of k mod 12. It sounds a bit daunting. Rather than that we'll try a brute force approach for the first ten primes:
DEFDBL A-Z
CLS
DATA 2,3,5,7,11,13,17,19,23,29
FOR i = 1 TO 10: READ pr(i): NEXT
FOR prNum = 1 TO 10
p = pr(prNum)
FOR a = 1 TO 100000
lhs = a MOD p + a MOD (2 * p) + a MOD (3 * p) + a MOD (4 * p)
IF lhs = a + p THEN PRINT a, p
NEXT
NEXT
which finds:
a p
6 2
1 3
9 3
17 3
15 5
21 7
33 11
39 13
51 17
57 19
69 23
93 31
which includes only one pair we didn't get analytically: (17,3).
In sum: (1,3), (17,3) and (3p,p) for all prime p.
This continues even if the primes are extended to inclued up to 113.
Edited on December 28, 2012, 9:34 pm
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Posted by Charlie
on 2012-12-28 21:15:36 |
Likely all the cases
