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If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?
If x and y are both positive integers and \(xy=156\), what is the smallest possible value of \(x - y\)?