![]() Q24: Which geometric shape is most adorable?Ī25: Count Dracula, of course! Related Reading: Addition Facts Games for Kids Online 25 Easy Math Trivia Questions and Answersĭo you have someone who’s math-phobic? Get them started on these easy math questions and you’ll soon see them solving math questions for fun.Ī1: 2. Q23: Why is the fantasy novel written by a mathematician so confusing? Q21: How can one turn root beer into beer?Ī22: Any number that’s not divisible by 2! Q20: Why did the mixed-number fraction refuse to go out with the other fraction? Q19: What do children think about addition? Q18: How did the boxer break the calculator? Q17: What did zero think when it saw eight? ![]() Q16: Why did square not attend the party of geometric shapes?Ī16: Because it had an accident and became a WRECK-tangle! Q15: Why is Circle always ignored in a party of geometric shapes?Ī15: Because other shapes think he’s pointless! Q14: Who do both the acute and the obtuse triangles hate?Ī14: A 90-degree angle because it’s ALWAYS right! Q13: What tool do mathematicians use to twist wires? Q12: Which tool can you use to plow your farm? Q11: How does algebra help with dancing skills? Q10: Why do social activists not like algebra?Ī10: Because they are not comfortable with inequalities! Q9: Why are circles the hottest geometric shape? Q8: Why did the plant in the math class become a curiosity in the town? Q7: What’s the favorite dish of a math teacher? Q6: What’s the favorite season of a math teacher? In four weeks, “f” comes in first and fourth. In seven days, “f” comes in first, fourth, and fifth. "ĭo you have any comments? It is always useful to receive feedback and helps make this free resource even more useful for those learning Mathematics anywhere in the world.Q4: What comes six times in a day, four times in a week, twice in a month, and once in a year?Ī4: The letter “f.” In 24 hours, “f” comes in four, five, fourteen, fifteen, and twenty-four. if I had a complaint i'd like them to become more challenging by the end. "The puzzles were easy once you solve the first one, the rest need barely any effort at all! I love puzzles like this! " My problem is how to convert these observations into a number of possible successful solutions? Here I see the "choice rule" changes to # of 2nd line degrees for that vertex minus # of previous visit until 0 choices remain and success if you have 8 lines. At this point you have returned to a previously visited vertex. As far as I can trial it, this "choice rule" holds until the 5th line. The second line reduces each vertex choice by 1 since you can't redraw the first line. 2 at the apex of the roof, 4 at each top corner and 3 at each bottom corner. So I begin 8 lines to be drawn with 5 possible starting points, depending on which vertex is selected as the starting point there are 2, 3 or 4 choices for the first line. ![]() I believe I am on the right path but lack the education to go further. "I've been toying with the house with an X drawing and trying to mathematically figure out the number of possible correct solutions. If you do not yet have an account and you are a teacher, tutor or parent you can apply for one by completing the form on the Sign Up page.Ī Transum subscription also gives you access to the 'Class Admin' student management system, downloadable worksheets, many more teaching resources and opens up ad-free access to the Transum website for you and your pupils. ![]() The solutions to this and other Transum puzzles, exercises and activities are available here when you are signed in to your Transum subscription account. There is printable worksheet to go with this activity and also an activity called Bridge Crossings based on similar principles. When you have all six diagrams correct you can collect a Transum Trophy for your efforts. When you think you have traced all of the diagrams you can and ticked the tick box of the others you can click on the check button to see if you are right. A tick box is provided below the diagrams for you to indicate the impossible diagrams. The 'Start Again' button is provided to let you erase incorrect attempts.Īt least one of the diagrams is impossible to draw in this way. In this version you are required to click on the dots to show the route of the pencil. This is a computer version of the classic pencil and paper puzzles in which the objective is to trace the diagram without taking the pencil off the paper and without going over the same line twice.
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