What is the largest positive integer n < 1000 for which there is a positive integer m satisfying
$$\operatorname{lcm}(m, n) = 3m \times \gcd(m, n)?$$
What is the largest positive integer n < 1000 for which there is a positive integer m satisfying
$$\operatorname{lcm}(m, n) = 3m \times \gcd(m, n)?$$