solution of 1/x+1/y=1/n
Theorem 1.
Given an integer n, if there exist integers x and y such that
| 1x+1y=1n, |
then one has
| x | = | n(u+v)u | ||
| y | = | n(u+v)v |
where u and v are integers such that uv divides n.
Proof.
To begin, cross multiply to obtain
| xy=n(x+y). |
Since this involves setting a product equal to another
product, we can think in terms of factorization. To
clarify things, let us pull out a common factor and
write x=kv and y=ku, where k is the greatest
common factor and u is relatively prime to v. Then,
cancelling a common factor of k, our equation becomes
the following:
| kuv=n(u+v) |
This is equivalent
to
| uv∣n(u+v) |
Since u and v are relatively prime, it follows that u is relatively prime to u+v and that v is relatively prime to u+v as well. Hence, we must have that uv divides n,
Now we can obtain the general solution to the equation. Write n=muv with u and v relatively prime. Then, substituting into our equation and cancelling a u and a v, we obtain
| k=m(u+v), |
so the solution to the original equation is
| x | = | mv(u+v) | ||
| y | = | mu(u+v) |
Using the definition of m, this can be rewritten as
| x | = | n(u+v)u | ||
| y | = | n(u+v)v. |
∎
| Title | solution of 1/x+1/y=1/n |
|---|---|
| Canonical name | SolutionOf1x1y1n |
| Date of creation | 2013-03-22 16:30:44 |
| Last modified on | 2013-03-22 16:30:44 |
| Owner | rspuzio (6075) |
| Last modified by | rspuzio (6075) |
| Numerical id | 13 |
| Author | rspuzio (6075) |
| Entry type | Theorem |
| Classification | msc 11D99 |