Problem statement: Given n and equation n*x % (x-n) = 0. How many solution. Thank in advance, and sorry for my poor English.
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Problem statement: Given n and equation n*x % (x-n) = 0. How many solution. Thank in advance, and sorry for my poor English.
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This solution is wrong the reason is stated in the replies.
I'm not 100% sure about my solution but here you go.
since n*x%(x — n) = 0 then nx — m(x — n) = 0.
nx — mx + mn = 0
moving things around we get
nx = mx — mn => mx — mn = nx turning this into a congruence
equation
we choose x as the mod
we get mx = mn (mod x) => mn = 0 (mod x)
since we know the constant is n then mn — nx = 0
by solving for m we get m = x
by substituting in the first equation we get
nx — x(x — n) = 0
nx — xx + xn = 0
2nx — xx = 0
by solving for n we get n = x/2.
If there is anything wrong please note it out
we always have more than 1 answer, for example n = 6, x = 3 and n = 6, x = 4. The number of dividers of the number n is similar to the number of answers, but this is not true
Yes you are right I think the problem is in this line:
we get mx = mn (mod x) => mn = 0 (mod x)
since we know the constant is n then mn — nx = 0
I considered the constant to remain n but since one of the two numbers changed then this is wrong.
Just use that n*x % (x-n) = n*(x-n + n) % (x-n) = (n*(x-n) + n^2) % (x-n) = n^2 % (x-n).
So the number of solutions is just the numbers of divisors of n2.
thank you