# Slicing Using Factorizing

Algebra Level 2

For positive integers $$x,y$$ where:

$xy=100$

and $$x$$ is not divisible by $$2$$.

Find the sum of all solutions. If the solutions you obtain for example, (x,y) = (1,2) and (3,4) then your answer will be $$1+2+3+4 = \boxed{10}$$.

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