Study Studio offers NCERT Solutions for Class 3 Maths Chapter 12 – Can We Share, designed by experienced teachers and subject experts as per the latest syllabus of CBSE Class 3. The NCERT Solutions for Class 3 Maths Chapter 12 PDF covers solutions for all the exercise questions given for this chapter in the NCERT textbook. Students can download these ‘NCERT Solutions Class 3 Maths Chapter 12- Can We Share?’ for free from Study Studio and go through them to secure good marks in the exam. ch12-1-3Download Access NCERT Solutions for Class 3 Mathematics Chapter 12 - Can We Share 1. There are ________ caterpillars. They are in __________ groups. There are _________ caterpillars in each group. Ans: There are 2121 caterpillars. There are 33 groups. There are 77 caterpillars in each group. 2. There are __________ laddoos. They are in ________ groups. There are _________ laddoos in each group. Ans: There are 1212 laddoos. They are in 44 groups. There are 33 laddoos in each group. 3. Draw 1818 stars. Put them into 22 equal group There are _________ stars in each group. Ans: The total number of stars are 1818 . To group it equally, divide 1818 by 22 . On dividing 1818 by 22 we get 99 . There are 99 stars in each group. 4. Draw 1818 beads. Put them into 3 equal groups. There are _________ beads in each group. Ans: On dividing the 1818 by 33 , we get 66 There are 66 beads in each group. 5. Now draw the jalebis on the plates below, so that each plate has the same number of jalebis. How many jalebis are there altogether? _________ How many jalebis are there in each plate? _________ Discuss in the class how you found the answer. Ans: There are 99 jalebis all together. We have to distribute equally on 33 plates So we get 33 jalebis in each plate. Given the maximum number of jalebis in a plate is 55 . The Jalebi in second plate are more when compared to first and third plate. There are 55 jalebis in second plate so we need to remove 22 and transfer it in to first plate to make it as 33 jalebis and keep jalebis as it is in third plate because it’s already have 33 jalebis. 6. If there are 6060 bananas and two monkeys, how many will each monkey get? _________ bananas. What if there are 600600 bananas and two monkeys? Ans: There are total 6060 bananas and two monkeys. If the monkeys divide the bananas equally then each monkey will get, on dividing 60÷2=3060÷2=30 . Thus, each monkey will get 3030 bananas. Suppose if there are 600600 bananas and it is to be divided among two monkeys then, the number of bananas each monkey will get, on dividing 600600 by 22 600÷2=300600÷2=300 Thus, each monkey will get 300300 bananas. 7. Five friends found 1010 five-rupee coins on the ground. They shared them equally. Each friend got ten rupees. 50÷5=1050÷5=10 If there are 1616 ten-rupee notes and four friends to share, then 16÷4=416÷4=4 ________ and 4×10=404×10=40 so each friend gets ________ rupees. Five friends found Rs 100100 . If they share it equally, how much will each get? ________ Ans: 16÷4=416÷4=4 4×10=404×10=40 So, each friend gets 4040 rupees. 100÷5=20100÷5=20 So, each friend will get 2020 rupees. 8. Hari prashad has 30 meters of rope. He distributes it equally among his three children. Each child gets ___________ meters of rope. If there is 36 meters of rope, how much of rope will each child get? ___________ And if there is 60 meters of rope, how much will each child get? ___________ Ans: Given, Hari prashad has length of the rope =30=30meters Number of children getting the rope =3=3 Length of the rope each child gets =30÷3=10=30÷3=10 meters. Therefore, each child will get 1010 meters of rope. If, Hari prashad has length of the rope =36=36meters Number of children getting the rope =3=3 Length of the rope each child gets =36÷3=12=36÷3=12 meters. Therefore, if there is 3636 meters of rope, then each child will get 1212 meters of rope. If, Hari prashad has length of the rope =60=60meters Number of children getting the rope =3=3 Length of the rope each child gets =60÷3=20=60÷3=20 meters. Therefore, if there is 6060 meters of rope, then each child will get 2020 meters of rope. 9. Minku puts her 15 laddoos equally into 5 boxes. i) How many ladoos will there be in each box? There will be __________ laddoos in each box. 15÷5=15÷5= _________ ii) If she uses only 3 boxes, how many laddoos will there be in each box? There will be __________ laddoos in each box. ________ ÷3=÷3= ________ Ans: i) Given, there are 1515 laddoos and 55 boxes are to be filled with these laddoos. So, number of laddoos in each box =15÷5=3=15÷5=3 Hence, there will be 33 laddoos in each box. ii) If she uses only 33 boxes. Then, number of laddoos in each box =15÷3=5=15÷3=5 Hence, there will be 55 laddoos in each box. 10. Share 25 bananas among 5 monkeys. How many bananas for each monkey? ______ ÷5=÷5= ______ Each monkey has _________ bananas. Ans: We need to share 25 bananas for 5 monkeys 25÷5=525÷5=5 Hence, each monkey has 55 bananas. 11. Share 12 balloons among 3 boys. How many balloons for each boy? _______ ÷÷ _______ == _______ Each boy has _________ balloons. Ans: We need to share 12 balloons among 3 boys. 12÷3=412÷3=4 Hence, each boy has 44 balloons. 12. There are 21 candles. Put them equally in 3 boxes. How many candles are there in each box? Ans: We need to put 21 candles are equally in 3 boxes. Number of candles in each box 21÷3=721÷3=7 Hence, there are 77 candles in each box. 13. There are 18 socks. How many girls can wear these socks? Ans: Number of socks available =18=18 Number of socks can each girl wear =2=2 So, number of girls who can wear 18 socks =18÷2=9=18÷2=9 Hence, 99 girls can wear 18 shocks. 14. Raj has 36 minutes to make rotis. One roti takes 3 minutes. How many rotis can he make in this time? He can make ____________ rotis. Ans: Raj has time to make rotis =36=36 mins Raj needs to prepare 1 roti =3=3 mins So, number of rotis can make in 36 mins =36÷3=12=36÷3=12 Hence, Raj can make 1212 rotis in 3636 minutes. 15. These are 24 footmarks of goats. So how many goats were there? Ans: The number of foot a goat has =4=4 Number of footmarks found in given figure =24=24 Number of goats with 24 footmarks =24÷4=6=24÷4=6 Hence, there were 66 goats. 16. Some girls are playing a game with both their hands. The girls who are playing have 60 fingers altogether. How many girls are playing this game? Ans: Number of fingers in the game (given figure) =60=60 Number of fingers each girl has =10=10 So, number girls having 60 fingers are =60÷10=6=60÷10=6 Hence, 66 girls are playing a game with both their hands. 17. Lakshmi has 27 kg potatoes to sell. Three men came and bought equal amounts of potatoes. Each man bought __________ kg of potatoes. Ans: Number of potatoes Lakshmi has to sell =27=27 kgs If 27 kg of potatoes are equally bought by three men then each man will get =27÷3=9=27÷3=9 kg Hence, each man has taken 99 kg of potatoes. 18. Jumpy Animals. A frog jumps 2 steps at a time.A squirrel jumps 3 steps.A rabbit jumps 5 steps.A horse jumps 15 steps.A kangaroo jumps 30 steps. 19. Use the path on the next page to find out: 1. In how many jumps will the frog reach 30? 30÷2=30÷2= _________ Ans: 30÷2=1530÷2=15 Frog will take 15 jumps to reach 30 steps. 2. In how many jumps will the squirrel reach 27? 27÷3=27÷3= _________ Ans: 27÷3=927÷3=9 squirrel will take 9 jumps to reach 27 steps. 3. Which number will the kangaroo reach in two jumps? Ans: we know that, Kangaroo takes 30 steps in one jump. Thus, kangaroo will reach =30×2=60=30×2=60 steps in two jumps. 4. Who all will meet at the number 15? _________, _________, _________ Ans: The number 15 comes in the table of 3, 5, and 15. Squirrel will reach 15 steps because =3×5=15=3×5=15 . Rabbit will reach 15 steps because =5×3=15=5×3=15 . Horse will reach 15 steps because =15×1=15=15×1=15 . Hence, squirrel, rabbit, and horse will meet at number 15. 5. Will the rabbit ever be at the number 18? ________ Ans: Given, Rabbit's one jump is equal to 5 steps Thus, Rabbit can never be at 18 steps because 18 does not comes in the table of 5. 6. How many jumps of the rabbit equal one jump of the horse? ________ Ans: A horse takes 15 steps in one jump. A rabbit takes 5 steps in one jump. 15÷3=1515÷3=15 Hence, 3 jumps of the rabbit equal to one jump of the horse. 7. How many jumps of the horse equals two jumps of the kangaroo? Ans: A horse takes 15 steps in one jump. 2 jumps of the kangaroo =2×30=60=2×30=60 steps. 60÷15=460÷15=4 Hence, 4 jumps of the horse equals two jumps of the kangaroo. 8. Which is the smallest number where the frog and the squirrel will meet? Ans: Frog’s takes two steps in one jump. So, frog takes steps 2, 4, 6, 8 and so on. Squirrel’s takes three steps in one jump. So, frog takes steps 3, 6, 9, 12 and so on. Number 6 is the common step of both frog and squirrel. Thus, the smallest number where frog and squirrel will meet is 6th step. 20. Divide into groups of 2 using a 2 times table. 1818÷÷22==99Hint: 2×9=182×9=181818÷÷==221616÷÷22==2020÷÷22==÷÷22==77÷÷22==101088÷÷==44÷÷22==55 Ans: 1818÷÷22==99Hint: 2×9=182×9=181818÷÷99==22Hint: 9×2=189×2=181616÷÷22==88Hint: 2×8=162×8=162020÷÷22==1010Hint: 2×10=202×10=201414÷÷22==77Hint: 2×7=142×7=142020÷÷22==1010Hint: 2×10=202×10=2088÷÷22==44Hint: 2×4=82×4=81010÷÷22==55Hint: 2×5=102×5=10 21. Divide into groups of 5 using 5 times table. 1010÷÷55==Hint: 5×2=?5×2=?2020÷÷==441515÷÷55==4040÷÷==882020÷÷55==÷÷55==662525÷÷55==÷÷55==333535÷÷55==÷÷55==22 Ans: 1010÷÷55==22Hint: 5×2=105×2=102020÷÷55==44Hint: 5×4=205×4=201515÷÷55==33Hint: 5×3=155×3=154040÷÷55==88Hint: 5×8=405×8=402020÷÷55==44Hint: 5×4=205×4=203030÷÷55==66Hint: 5×6=305×6=302525÷÷55==55Hint: 5×5=255×5=251515÷÷55==33Hint: 5×3=155×3=153535÷÷55==77Hint: 5×7=355×7=351010÷÷55==22Hint: 5×2=105×2=10 22. Try these. 44÷÷==221414÷÷77==66÷÷33==÷÷22==77÷÷22==331515÷÷33==88÷÷44==1515÷÷55==88÷÷==44÷÷22==88 99÷÷33==1818÷÷99==÷÷22==552020÷÷55==1212÷÷44==2020÷÷44==1212÷÷==22 Ans: 44÷÷22==22Hint: 2×2=42×2=41414÷÷77==22Hint: 7×2=147×2=1466÷÷33==22Hint: 3×2=63×2=61414÷÷22==77Hint: 2×7=142×7=1466÷÷22==33Hint: 2×3=62×3=61515÷÷33==55Hint: 3×5=153×5=1588÷÷44==22Hint: 4×2=84×2=81515÷÷55==33Hint: 5×3=155×3=1588÷÷22==44Hint: 2×4=82×4=81616÷÷22==88Hint: 2×8=162×8=16 99÷÷33==33Hint: 3×3=93×3=91818÷÷99==22Hint: 9×2=189×2=181010÷÷22==55Hint: 2×5=102×5=102020÷÷55==44Hint: 5×4=205×4=201212÷÷44==33Hint: 4×3=124×3=122020÷÷44==55Hint: 4×5=204×5=201212÷÷66==22Hint: 6×2=126×2=12 NCERT Solutions for Class 3 Maths Chapter 12 Can We Share As the name of Chapter 12– Can We Share suggests, this chapter is linked to division and distribution. This is a new concept. You can solve the sums given in the exercise and verify your answers with the NCERT Solutions for Class 3 Chapter 12 – Can We Share? to identify and correct your mistakes. You can go through these NCERT Solutions and prepare for your exams. You can also take the help of our experienced and friendly teachers if you have any doubts related to the topic. NCERT Solutions for Class 3 Maths Chapter 12 – Can We Share? introduces the concept of division and distribution. If we want to share something then we need to make equal parts. For example, your mother buys chocolate for you and she asks you to share with your sister. There are 8 pieces in the chocolate bar. How many does each get? You and your sister get 4 pieces each. So, what are you doing here? You are making equal parts of the chocolate. This means splitting it into equal parts or groups or dividing it into equal parts. Division means splitting or sharing into equal parts. The symbol of division is ‘ ÷ ‘. Let us see an example. (Image to be added soon) In the above picture, there are 24 apples that need to be put equally in 6 boxes. How many apples will go into each box? We have to distribute the apples in equal parts. So we write, 24 ÷ 6 = 4 The answer is 4 apples will go into each box. How did we get this answer? We have all 24 apples and we have divided the apples by the number of boxes. The number to be divided is called the dividend. The number by which we divide the dividend is called the divisor. The result we get is called the quotient. In the above example, 24 apples make the dividend. 6 boxes make the divisor, and the result, 4 apples is the quotient. Why Do We Divide by Six Boxes? We know the multiplication: 6 x 4 = 24. Here, 6 and 4 are called the factors of 24. 24 is called the multiple. When we divide the multiple by one of the factors we get the other factor as the result. Hence you can say that division is opposite of multiplication. Do we have to know tables to do division? Yes, you have to know the tables to do division. It will make our calculation faster. Other Ways of Distribution We can also distribute these 24 apples in other ways. We can divide the apples into 8 equal parts or 3 equal parts or 2 equal parts or 12 equal parts. Let us see how many boxes we need in each kind of distribution. If we divide the apples into 8 equal parts then we need 3 boxes. If we divide the apples into 3 equal parts then we need 8 boxes. If we divide the apples into 12 equal parts then we need 2 boxes. If we divide the apples into 2 equal parts then we need _______ boxes? Can you guess? The answer is 12 boxes. Conclusion With the help of this concept, now students can solve all the exercise questions given in the chapter and also verify them with the NCERT Solutions Maths Chapter 12. ‘Division’ is one of the fundamental mathematical operations. It is one of the basic skills that you need in your daily life. With the help of the concept of division, you can distribute time for all your daily activities, wisely. This concept will help when you will learn to count money as well.