# Moving modulus operator to the other side of the equation

I have a mathematical problem that is part of my programming problem

I have a statement like

a = b%30;

How can I calculate b in terms of a?

I gave it a thought but couldn't figure it out.

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By definition,

b == 30*n + a

for some integer n.

Note that there are multiple b values that can give you the same a:

>>> b = 31
>>> b % 30
1
>>> b = 61
>>> b % 30
1
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so there isn't a specific way to go about determining value of b using a in this case right? –  Shenoy Tinny Jan 3 at 22:23
If % is the remainder operator as found in most programming languages, then your solution is incorrect for a between -29 and -1. Even if it is the modulus, your solution b == 30*n + a does not work for a>=30. –  Pascal Cuoq Jan 3 at 22:23
@PascalCuoq Presumably a will always be in the range [0,29]. –  arshajii Jan 3 at 22:25
@ShenoyTinny If you have no further information about a and b, then you can't determine their unique values. –  arshajii Jan 3 at 22:26
Why presume when it is so simple to give the shape of solutions for all values of a? –  Pascal Cuoq Jan 3 at 22:31

First, obviously, there are in general several solutions for b for a given a.

If % is the remainder operator found in most programming languages, then the sign of a is critical. You know that this is a website for programming questions, right?

If |a|>=30, then there are no solutions

If a = 0, the solutions are the multiples of 30.

If 0 < a < 30, the solutions are all the b such that b = 30 * k + a for some positive integer k.

If -30 < a < 0, the solutions are all the b such that b = - (30 * k - a) for some positive integer k.

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@arshajii ideone.com/G1dJ9T –  Pascal Cuoq Jan 3 at 22:39
Yes, I retract that comment. [-29, 29] is the correct range, I believe. –  arshajii Jan 3 at 22:44