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📰 Thus, the ratio is $ \boxed{\dfrac{9}{5}} $.Question: A museum curator is cataloging a collection of 48 ancient tablets. If the ratio of inscribed tablets to plain tablets is $5:3$, and all inscribed tablets must be displayed in groups of 7, what is the greatest number of inscribed tablets that can be grouped without leaving any out? 📰 Solution: The ratio of inscribed to plain tablets is $5:3$, so the total number of parts is $5 + 3 = 8$. Since there are 48 tablets, each part represents $ \frac{48}{8} = 6 $ tablets. Thus, the number of inscribed tablets is $5 \times 6 = 30$. We are told that inscribed tablets must be displayed in groups of 7, so we seek the greatest multiple of 7 that is less than or equal to 30. The multiples of 7 below 30 are $7, 14, 21, 28$. The greatest is $28$. Therefore, the largest number of inscribed tablets that can be grouped in sevens is $28$. 📰 $\boxed{28}$ 📰 Flyknight Steam 📰 The Toy Pit 9190158 📰 Verzion Fios Login 📰 Roblox Dice 📰 A Population Of Bacteria Doubles Every 3 Hours If The Initial Population Is 500 How Many Bacteria Will There Be After 12 Hours 3449765 📰 Visio Stencils Of Buildings 📰 Best Car Insurance California 📰 You Wont Believe How Easy It Is To Master The Bottle Flip Gameplay Unblocked Now 1973857 📰 Excel Line Graph 📰 Louvino Indianapolis 4304819 📰 Mskcc Patient Portal 4977396 📰 Best Baby Monitor 2025 7901000 📰 Master The Stock Market Before Its Too Latetry This Free Simulator Today 9902921 📰 Police Numbers For Non Emergency 2456095 📰 Tradning View