In November we worked on a multiples project, following certain constraints. Students had to fill out the white bubbles with ONLY the numbers 1 and 2. Any 3 consecutive numbers COULD NOT add to a multiple of 3. We defined "multiple" as "The numbers you say when you are skip counting". So, a multiple of 3 would be 3, 6, 9, 12, 15, and so on. A multiple of 5 would be 5, 10, 15, 20, 25 and so on. How many ways can you find to solve the Ring of Threes? There is more than one solution! Could you rearrange the given 3s to make an IMPOSSIBLE ring to solve? Leave a comment below with your ideas, strategies, and solutions! Source: Galileo Educational Network
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Puzzle of the WeekEach week on the main floor, a new puzzle or problem is posted for our whole school to work on. Please check it out! Previous puzzles will be posted here, along with puzzles at different levels. Please use the "Categories" below to find puzzles for your age group or strand. Archives
September 2018
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