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📰 Solution: Let \(d = \gcd(a, b)\). Then we can write \(a = d \cdot m\) and \(b = d \cdot n\), where \(m\) and \(n\) are coprime positive integers. The total road length is \(a + b = d(m + n) = 1000\). So \(d\) must divide 1000. To maximize \(d\), we minimize \(m + n\), subject to \(m\) and \(n\) being coprime positive integers. The smallest possible value of \(m + n\) is 2, which occurs when \(m = n = 1\), and they are coprime. This gives \(d = \frac{1000}{2} = 500\). Since \(m = 1\) and \(n = 1\) are coprime, this is valid. Therefore, the largest possible value of \(\gcd(a, b)\) is \(\boxed{500}\). 📰 Question: A medical researcher is analyzing immune response cycles in mice, where one immune marker peaks every 18 days and another every 30 days. If both markers peak today, after how many days will they next peak simultaneously, assuming the pattern repeats every least common multiple of their cycles? 📰 Solution: We are to find the least common multiple (LCM) of 18 and 30. First, factor both numbers: 📰 Open Door Yahoo Finance 📰 Top Phone Cameras 📰 Kendrick Lamar Section80 📰 Last Of Us Ellie And 📰 Utopia City 📰 The Hidden Truth Behind The Most Addictive Murderer Game Ever 6710816 📰 Bank Of America La Grange Il 📰 Secrets Roblox 📰 Slider Game 📰 Bank Of America Pay Home Loan 📰 Discount Points Mortgage 📰 Can You Download Fortnite On Macbook 📰 You Wont Believe How Free Io Changes Your Workflow Today Freeio Hack 8518854 📰 Courtney Jones Npi 📰 Outer Worlds 2 Scythe Build