Back to KangarooMath
2011 Benjamin (Grade 5 - 6)
Questions: 24 | Answered: 0
Q1. Bernd wants to paint the word KANGAROO. He be gins on a Wednesday and paints one letter each day. On which day will he paint the last letter?
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Q2. A motorcycle driver covers a distance 28km in 30 minutes. What was his average speed in km/h?
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Q3. A square piece of paper is cut in a st raight line into two pieces. Which of the following shapes can not be created?
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Q4. In Crazytown the houses on the right hand side of the street all have odd numbers. The Crazytowners don’t use any numbers with the dig it 3 in them. The first house on the right hand side has the number 1. Which number does the fifteenth hous e on the right hand side have?
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Q5. shapes can she add to the board so that none of the remaining four shapes will have space to fit.
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Q6. 1000 litres of water is passed thr ough the water system as shown, into two identical tanks. At each junction the water separates into two equa l amounts. How many litres of water end up in Tank Y?
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Q7. The date 01-03-05 (1st March 2005 ) has three consecutive odd numbers. This is the first day in th e 21st Century with this property. How many days with this property are there in total in the 21st Century?
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Q8. Andrew writes the letters from the word KANGAR OO in the fields of a table. He can begin where he wants and then must write each consecutiv e letter in a field that shares at least one point with the previous field. Which of th e following tables coul d Andrew not produce?
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Q9. A shape is made by fitting together the four pieces of card with no overlaps. Which of the following shapes is not possible?
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Q10. When Liza the cat is very lazy and sits around the whole day, she drinks 60 ml of milk. When she chases mice she drinks a third more milk. In the past two weeks, she has chased mice on every second day. How much milk has she drunk in the past two weeks?
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Q11. Fridolin the hamster runs through the maze in the picture. 16 pumpkin seeds are laying on the path. He is only allowed to cross each junction once. What is the maximum number of pumpkin seeds that he can collect?
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Q12. All the four digit numbers with the same digits as
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Q13. Nina made a wall around a square area, using 36 identical cubes. A section of the wall is shown in the picture. How many cubes will she now need to completely fill the square area.
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Q14. Black and white tiles can be laid on square floors as shown in the pictures. We can see floors with 4 black and 9 black tiles respectively. In each corner there is a black tile, and each black tile touches only white tiles. How many white tiles would there be on a floor that had 25 black tiles?
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Q15. Paul wanted to multiply a whole number by 301, but forgot to include the zero and multiplied by 31 instea d. His answer was 372. What should his answer have been?
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Q16. In a tournament FC Barcelona scored a total of three goals, and conc eded one goal. In the tournament the team had won one game, lost one game and drawn one game. What was the score in the game that FC Barcelona won?
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Q17. If you are given the three corner poi nts of a triangle and want to add a fourth point to make the four corners of a parallelogram. In how ma ny places can the fourth point be placed?
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Q18. The 8 corners of the shape in the pi cture are to be labelled with the numbers 1, 2, 3 or 4, so that the numbers at the ends of each of the lines shown are different. How often does the number 4 appear on the shape?
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Q19. Daniel wants to make a complete square using pieces only like those shown. What is the minimum number of pieces he must use?
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Q20. 10 children are at a judo club. Their t eacher has 80 sweets. If he gives each girl the same amount of sweets, ther e are three sweets left over. How many boys are at the club?
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Q21. A cat had 7 kittens. The kittens had the col ours white, black, ginger, black-white, ginger- white, ginger-black, and ginger-black -white. In how many ways can you choose 4 cats so that each time tw o of them have a colour in common.
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Q22. The picture shows a rectangle w ith four identical triangles. Determine the total area of the triangles.
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Q23. Lina has already laid two shapes on a square playing board. Which of the
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Q24. Numbers are to be built using only the digits 1, 2, 3, 4 and 5 in su ch a way that each digit is only used once in each number. How many of these numbers will have the following property; The first digit is divisible by one, The first 2 dig its make a number which is divisible by 2, the first 3 digits make a number wh ich is divisible by thre e, the first 4 digits make a number which is divisible by 4 and all 5 digits make a number which is divisible by 5.
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2011 Benjamin Test | Test and Chat
