Class 6 Maths Ganita Prakash Chapter 3 Solutions (NCERT 2026–27) – Number Play

These Class 6 Maths Ganita Prakash Chapter 3 solutions cover Number Play from the new NCF-2023 textbook (Reprint 2026–27). Every Figure it Out question, along with each Math Talk and Try This task, is solved step by step — supercells, number-line placement, digit sums, palindromes, the Kaprekar constant, the Collatz conjecture, estimation and winning game strategies — so you can master the chapter and revise it quickly.

Class: 6 Subject: Mathematics Book: Ganita Prakash Chapter: 3 Exercises: Figure it Out (Sections 3.1–3.12) Session: 2026–27
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Chapter 3 Overview

Chapter 3 of Ganita Prakash, Number Play, shows how numbers do far more than count — they convey information (the “taller-neighbour” game), reveal patterns (supercells, palindromes, digit sums), and power puzzles and games. The chapter places numbers on the number line, counts how many 1-, 2-, 3-, 4- and 5-digit numbers exist, explores the Kaprekar constant 6174, the famous Collatz conjecture, simple estimation, and winning strategies for number games. The Class 6 Maths Ganita Prakash Chapter 3 solutions below work through every Figure it Out, Math Talk and Try This question step by step, verified against the book’s answers.

Key Concepts & Definitions

Supercell: a cell whose number is greater than all the numbers in its adjacent (neighbouring) cells. In a single row the neighbours are the left and right cells; in a grid they are the left, right, top and bottom cells.

Digit sum: the number obtained by adding all the digits of a number, e.g. the digit sum of 68 is 6 + 8 = 14.

Palindrome (palindromic number): a number that reads the same from left to right and from right to left, e.g. 66, 848, 1111.

Kaprekar constant: the number 6174. Take any 4-digit number with at least two different digits, make the largest number A and smallest number B from its digits, find C = A − B, and repeat — you always reach 6174.

Collatz rule: start with any whole number; if it is even take half of it, if it is odd multiply by 3 and add 1; repeat. The Collatz conjecture says every such sequence eventually reaches 1 (still unproved).

Estimation: a sensible approximate value, used when an exact count is not needed.

Important Ideas & Patterns (Chapter 3)

Count of n-digit numbers: there are 9 one-digit, 90 two-digit, 900 three-digit, 9000 four-digit and 90000 five-digit numbers.

Maximum supercells: for c cells in a row, the maximum number of supercells is c ÷ 2 (even c) or (c + 1) ÷ 2 (odd c) — fill the first cell as a supercell, then alternate.

Largest / smallest number from given digits: arrange digits in descending order for the largest, ascending order for the smallest.

Next-square step won’t help here; use difference patterns: the largest minus smallest 4-digit numbers from the same digits drives the Kaprekar process toward 6174.

Calendar repeat: a year’s calendar repeats after 6 years (one leap year in the gap) or after 5 years (two leap years in the gap).

Numbers can Tell us Things (Section 3.1)

Questions are reproduced verbatim from the NCERT Ganita Prakash textbook; the worked solutions are original and verified against the answers given at the back of the book. In this game each child says the number of taller neighbours they have (0, 1 or 2).

Math Talk — Situations where numbers are used Think about various situations where we use numbers. List five different situations in which numbers are used. See what your classmates have listed, share, and discuss. Answer. Five different situations in which numbers are used: (1) telling the time, (2) reading a calendar (dates), (3) counting objects or marks, (4) measuring height and weight, (5) handling money. There could be many more.

Q. What do you think these numbers mean?

SOLUTION Each child looks at the children standing next to them and says how many of their neighbours are taller than themselves. A child says ‘1’ if exactly one neighbour is taller, ‘2’ if both neighbours are taller, and ‘0’ if neither neighbour is taller. So the numbers count the taller neighbours of each child.

1. Can the children rearrange themselves so that the children standing at the ends say ‘2’?

SOLUTION No. A child at an end has only one neighbour, so the most that child can ever say is ‘1’. There is no one on the outer side of an end child, so it can never have two taller neighbours.

2. Can we arrange the children in a line so that all would say only 0s?

SOLUTION Yes. If all the children are of the same height, then no neighbour is taller than anyone, so every child says ‘0’.

3. Can two children standing next to each other say the same number?

SOLUTION Yes. For example two neighbours can both say ‘1’ or both say ‘0’, depending on the heights around them, as seen in the picture on page 55.

4. There are 5 children in a group, all of different heights. Can they stand such that four of them say ‘1’ and the last one says ‘0’? Why or why not?

SOLUTION Yes, they can. If the 5 children stand in ascending order of height (shortest to tallest), the shortest child (at one end) has its only neighbour taller, so it says ‘1’; each middle child has one shorter and one taller neighbour, so it says ‘1’; the tallest child (at the other end) has its only neighbour shorter, so it says ‘0’. That gives four 1s and one 0.

5. For this group of 5 children, is the sequence 1, 1, 1, 1, 1 possible?

SOLUTION No. The tallest child in the group has no one taller than it, so wherever the tallest child stands it must say ‘0’ (or, if in the middle, at most a number other than what is needed). In particular the tallest child at an end cannot say ‘1’, so all five children cannot say ‘1’.

6. Is the sequence 0, 1, 2, 1, 0 possible? Why or why not?

SOLUTION Yes, it is possible. Arrange heights so that the children at the two ends are the tallest (each says 0), the middle child is the shortest (both neighbours taller, says 2), and the two children on either side of the middle have exactly one taller neighbour (each says 1). For example heights in the order 5, 3, 1, 2, 4 give the sequence 0, 1, 2, 1, 0.

7. How would you rearrange the five children so that the maximum number of children say ‘2’?

SOLUTION A child says ‘2’ only if both neighbours are taller, so an end child can never say ‘2’. At most the two shortest children can be placed in the interior so that each has two taller neighbours. So the most children that can say ‘2’ is two — for example placing the two shortest children between taller ones gives a sequence such as 0, 2, 1, 2, 0.

Supercells (Section 3.2)

A cell is a supercell if its number is greater than all of its adjacent cells.

Figure it Out (Page 57)

1. Colour or mark the supercells in the table below. 6828   670   9435   3780   3708   7308   8000   5583   52

SOLUTION Compare each cell with its left and right neighbours and mark the ones larger than both: 6828 > 670 (left end, one neighbour) → supercell. 670 < 6828 → no. 9435 > 670 and 3780 → supercell. 3780 < 9435 → no. 3708 < 7308 → no. 7308 > 3708 and 8000? 7308 < 8000 → no. 8000 > 7308 and 5583 → supercell. 5583 > 52 but < 8000 → no. 52 < 5583 → no (52 is an end cell but smaller than its only neighbour). ∴ The supercells are 6828, 9435 and 8000.

2. Fill the table below with only 4-digit numbers such that the supercells are exactly the coloured cells. 5346   ___   ___   1258   ___   ___   ___   9635   ___

SOLUTION One valid way (the coloured cells 5346, 1258 and 9635 must each be greater than their neighbours, so make the neighbours smaller 4-digit numbers): 5346   1000   1100   1258   1150   1200   1300   9635   9000 — here 5346, 1258 and 9635 are each larger than their neighbours and so are the supercells. (Open-ended; many fillings work.)

3. Fill the table below such that we get as many supercells as possible. Use numbers between 100 and 1000 without repetitions.

SOLUTION To get the maximum number of supercells, make every alternate cell (1st, 3rd, 5th, 7th, 9th) larger than its neighbours. One arrangement is: 110   100   150   130   280   200   230   210   270 — here cells 110, 150, 280, 230 and 270 are each greater than their neighbours, giving 5 supercells.

4. Out of the 9 numbers, how many supercells are there in the table above? ___________

SOLUTION In a row of 9 cells the maximum number of supercells is the alternate cells 1st, 3rd, 5th, 7th and 9th. ∴ there are 5 supercells.

5. Find out how many supercells are possible for different numbers of cells. Do you notice any pattern? What is the method to fill a given table to get the maximum number of supercells? Explore and share your strategy.

SOLUTION For an even number of cells (2, 4, 6, …) the maximum number of supercells is 2÷2 = 1, 4÷2 = 2, 6÷2 = 3, … For an odd number of cells (1, 3, 5, 7, …) it is (1+1)÷2 = 1, (3+1)÷2 = 2, (5+1)÷2 = 3, (7+1)÷2 = 4, … Method: to get the maximum number of supercells, fill the first cell as a supercell and then fill the cells alternately (every second cell is a supercell, with smaller numbers in between).

Try This (Page 58)

6. Can you fill a supercell table without repeating numbers such that there are no supercells? Why or why not?

SOLUTION No. The cell holding the greatest number among the chosen numbers will always be larger than its neighbours, so it becomes a supercell no matter where it is placed. Hence there must be at least one supercell.

7. Will the cell having the largest number in a table always be a supercell? Can the cell having the smallest number in a table be a supercell? Why or why not?

SOLUTION Yes — the largest number is greater than every other number, so it is greater than its neighbours and is always a supercell. No — the smallest number can never be a supercell because every neighbouring cell holds a number greater than it.

8. Fill a table such that the cell having the second largest number is not a supercell.

SOLUTION Place the second largest number right next to the largest number, so its larger neighbour stops it from being a supercell. One way is: 1   2   3   4   5   6   7   9   8 — here 8 (the second largest) sits next to 9, so 8 is not a supercell.

9. Fill a table such that the cell having the second largest number is not a supercell but the second smallest number is a supercell. Is it possible?

SOLUTION Yes, it is possible. One way is: 2   1   3   4   5   6   7   9   8 — here the second smallest number 2 is at the left end and is greater than its only neighbour 1, so 2 is a supercell; the second largest number 8 sits next to 9, so 8 is not a supercell.

10. Make other variations of this puzzle and challenge your classmates.

SOLUTION Some variations you can pose: “Can you fill a table of 9 cells such that there are more than 5 supercells?” (the answer is no — 5 is the maximum), and “Can you fill a table of 9 cells such that there are exactly 4 supercells?” (yes — arrange the numbers so one of the alternate peaks is missed). (Open-ended.)

Table 2 (Page 58)

Q. Complete Table 2 with 5-digit numbers whose digits are ‘1’, ‘0’, ‘6’, ‘3’, and ‘9’ in some order. Only a coloured cell should have a number greater than all its neighbours.

SOLUTION One valid filling of the 4 × 4 grid (each number uses the digits 1, 0, 6, 3, 9 once): Row 1: 96,310   96,301   36,109   39,160 Row 2: 96,103   13,609   60,319   19,306 Row 3: 13,906   10,396   60,193   60,931 Row 4: 10,369   10,963   10,936   69,031

Q. The biggest number in the table is ____________.

SOLUTION The largest 5-digit number formed from 1, 0, 6, 3, 9 is got by writing the digits in descending order: 96,310.

Q. The smallest even number in the table is ____________.

SOLUTION The smallest even number (it must end in an even digit such as 0 or 6) in this table is 10,396.

Q. The smallest number greater than 50,000 in the table is ____________.

SOLUTION Numbers above 50,000 begin with 6 or 9; the smallest such is the one starting with 6 and arranging the rest as small as possible: 60,193.

Patterns of Numbers on the Number Line (Section 3.3)

Q. We are quite familiar with number lines now. Let’s see if we can place some numbers in their appropriate positions on the number line. Here are the numbers: 2180, 2754, 1500, 3600, 9950, 9590, 1050, 3050, 5030, 5300 and 8400.

SOLUTION Order the numbers and place each between the right pair of thousands marks (1000, 2000, …, 10000): 1050 (just after 1000), 1500 (mid 1000–2000), 2180 and 2754 (between 2000–3000), 3050 (just after 3000), 3600 (mid 3000–4000), 5030 and 5300 (just after 5000), 8400 (between 8000–9000), 9590 and 9950 (between 9000–10000).

Figure it Out (Page 59)

Q. Identify the numbers marked on the number lines below, and label the remaining positions. Put a circle around the smallest number and a box around the largest number in each of the sequences above.

a. (marks shown at 2010 and 2020)

SOLUTION The marks 2010 and 2020 are 10 apart and lie 2 steps apart, so each step is 5. Labelling all positions: 1990, 1995, 2000, 2005, 2010, 2015, 2020, 2025, 2030, 2035. Smallest = 1990 (circle), largest = 2035 (box).

b. (marks shown at 9996 and 9997)

SOLUTION Consecutive marks differ by 1, so: 9993, 9994, 9995, 9996, 9997, 9998, 9999, 10000, 10001, 10002. Smallest = 9993 (circle), largest = 10002 (box).

c. (marks shown at 15,077, 15,078 and 15,083)

SOLUTION Marks differ by 1, so: 15,077, 15,078, 15,079, 15,080, 15,081, 15,082, 15,083, 15,084, 15,085, 15,086. Smallest = 15,077 (circle), largest = 15,086 (box).

d. (marks shown at 86,705 and 87,705)

SOLUTION The marks 86,705 and 87,705 are 1000 apart and 1 step apart, so each step is 1000: 83,705, 84,705, 85,705, 86,705, 87,705, 88,705, 89,705, 90,705, 91,705, 92,705. Smallest = 83,705 (circle), largest = 92,705 (box).

Playing with Digits (Section 3.4)

Q. Find out how many numbers have two digits, three digits, four digits, and five digits.

SOLUTION
1-digit2-digit3-digit4-digit5-digit
9909009,00090,000
From 1–9 there are 9 one-digit numbers; from 10–99 there are 90; from 100–999 there are 900; from 1000–9999 there are 9,000; from 10000–99999 there are 90,000.

Figure it Out (Page 60)

1. Digit sum 14 a. Write other numbers whose digits add up to 14. b. What is the smallest number whose digit sum is 14? c. What is the largest 5-digit number whose digit sum is 14? d. How big a number can you form having the digit sum of 14? Can you make an even bigger number?

SOLUTION a. Some numbers whose digits add to 14: 248 (2+4+8), 653 (6+5+3), 356, 815, 833, 12335, 23351. b. To make the smallest number with digit sum 14, use as few digits as possible and put the smaller digit first: 59 (5 + 9 = 14). c. For the largest 5-digit number, push the big digits to the front: 95000 (9 + 5 = 14). d. We can make the number as big as we like by adding zeros (which do not change the digit sum): 95, 9005, 900005, 90000005, … Yes, we can always make an even bigger number by inserting more zeros.

2. Find out the digit sums of all the numbers from 40 to 70. Share your observations with the class.

SOLUTION Adding the digits of each number from 40 to 70: 40→4, 41→5, 42→6, 43→7, 44→8, 45→9, 46→10, 47→11, 48→12, 49→13; 50→5, 51→6, 52→7, 53→8, 54→9, 55→10, 56→11, 57→12, 58→13, 59→14; 60→6, 61→7, 62→8, 63→9, 64→10, 65→11, 66→12, 67→13, 68→14, 69→15; 70→7. Observation: within each ten (40s, 50s, 60s) the digit sum increases by 1 as the units digit increases, then drops when the tens digit changes (because the units digit resets to 0).

3. Calculate the digit sums of 3-digit numbers whose digits are consecutive (for example, 345). Do you see a pattern? Will this pattern continue?

SOLUTION 123 → 1+2+3 = 6; 234 → 2+3+4 = 9; 345 → 3+4+5 = 12; 456 → 4+5+6 = 15; 567 → 5+6+7 = 18; 678 → 6+7+8 = 21; 789 → 7+8+9 = 24. Yes, there is a pattern — all the digit sums are multiples of 3, and each is 3 more than the one before. No, it cannot continue beyond 789, because there is no 3-digit number with consecutive digits after 789 (the next digit would be 10).

Digit Detectives (Page 61)

Q. Among the numbers 1–100, how many times will the digit ‘7’ occur? Among the numbers 1–1000, how many times will the digit ‘7’ occur?

SOLUTION From 1 to 100, the digit 7 appears in the units place (7, 17, 27, …, 97 = 10 times) and in the tens place (70–79 = 10 times), giving 20 times. From 1 to 1000, by a similar count the digit 7 appears 300 times (100 in each of the units, tens and hundreds places).

Pretty Palindromic Patterns & Kaprekar (Sections 3.5–3.6)

Q. Write all possible 3-digit palindromes using these digits (1, 2, 3).

SOLUTION A 3-digit palindrome has the form aba (first and last digits equal). Using digits 1, 2, 3: 111, 121, 131; 212, 222, 232; 313, 323, 333 — nine palindromes in all.
Math Talk (Explore) — Reverse-and-add palindromes Will reversing and adding numbers repeatedly, starting with a 2-digit number, always give a palindrome? Explore and find out. Answer. For 2-digit starting numbers, repeatedly reversing and adding always reaches a palindrome. Examples: 12 + 21 = 33 (a palindrome in one step); 47 + 74 = 121 (a palindrome in one step). (For some 3-digit numbers, e.g. 196, it is suspected no palindrome is ever reached — an unsolved question.)
Puzzle time — The 5-digit palindrome I am a 5-digit palindrome. I am an odd number. My ‘t’ digit is double of my ‘u’ digit. My ‘h’ digit is double of my ‘t’ digit. Who am I? Write the number in words. Answer. Place values are ten-thousands (tth), thousands (th), hundreds (h), tens (t), units (u). For a palindrome tth = u and th = t. The number is odd, so u is odd. Let u = 1, then t = 2u = 2 and h = 2t = 4. So the digits are tth = 1, th = 2, h = 4, t = 2, u = 1, giving 12,421 — “Twelve thousand four hundred twenty-one.”

The Magic Number of Kaprekar (Page 63)

Q. Carry out these same steps with a few 3-digit numbers. What number will start repeating?

SOLUTION Take a 3-digit number, say 321. Repeatedly make the largest number minus the smallest number from the digits: 321 → 321 − 123 = 198; 981 − 189 = 792; 972 − 279 = 693; 963 − 369 = 594; 954 − 459 = 495; 954 − 459 = 495 … The number 495 starts repeating (it is the Kaprekar constant for 3-digit numbers).

Clock and Calendar Numbers & Mental Math (Sections 3.7–3.8)

Q. Try and find out all possible times on a 12-hour clock of each of these types (like 4:44, 10:10, 12:21).

SOLUTION Times where all three figures are equal (h:hh type): 2:22, 3:33, 4:44, 11:11, 12:12. Times where the digits repeat as a block (hh:hh / mirror type): 10:10, 12:21, 05:50, 10:01, 09:09. (There are several more — think of others!)

Q. Manish has his birthday on 20/12/2012 where the digits ‘2’, ‘0’, ‘1’, ‘2’ repeat in that order. Find some other dates of this form from the past.

SOLUTION Dates where the day/month digits repeat in the year, such as 20/04/2004 and 20/06/2006. (Try to find more for yourself.)

Q. His sister, Meghana, has her birthday on 11/02/2011 which reads the same from left to right and right to left. Find all possible dates of this form from the past.

SOLUTION Palindromic dates of the dd/mm/yyyy form, e.g. 01/02/2001 (10/20/2010 reversed reads 01022010 backwards) and 02/02/2002. (Think of more such dates.)
Try This — Reusing a calendar Will any year’s calendar repeat again after some years? Will all dates and days in a year match exactly with that of another year? Answer. Yes, a calendar repeats. A year’s calendar repeats after 6 years if only one leap year falls in the gap, and after 5 years if two leap years fall in the gap, so the same dates fall on the same days.

Figure it Out (Page 64)

1. Pratibha uses the digits ‘4’, ‘7’, ‘3’ and ‘2’, and makes the smallest and largest 4-digit numbers with them: 2347 and 7432. The difference is 7432 − 2347 = 5085. The sum is 9779. Choose 4 digits to make: a. the difference between the largest and smallest numbers greater than 5085. b. the difference between the largest and smallest numbers less than 5085. c. the sum of the largest and smallest numbers greater than 9779. d. the sum of the largest and smallest numbers less than 9779.

SOLUTION Some possibilities (largest = digits in descending order, smallest = ascending order): a. Digits 7,4,3,1: 7431 − 1347 = 6084 (> 5085). ✓ b. Digits 7,4,3,3: 7433 − 3347 = 4086 (< 5085). ✓ c. Digits 7,4,3,3: 7433 + 3347 = 10780 (> 9779). ✓ d. Digits 7,4,3,1: 7431 + 1347 = 8778 (< 9779). ✓

2. What is the sum of the smallest and largest 5-digit palindrome? What is their difference?

SOLUTION Smallest 5-digit palindrome = 10001; largest 5-digit palindrome = 99999. Sum = 10001 + 99999 = 1,10,000; difference = 99999 − 10001 = 89,998.

3. The time now is 10:01. How many minutes until the clock shows the next palindromic time? What about the one after that?

SOLUTION After 10:01 the next palindromic time is 11:11, which is 1 hour 10 minutes = 70 minutes later. The one after that is 12:21, which is 2 hours 20 minutes = 140 minutes after 10:01.

4. How many rounds does the number 5683 take to reach the Kaprekar constant?

SOLUTION Repeatedly form largest − smallest from the digits: 8653 − 3568 = 5085 (1); 8550 − 5058 = 3492 (2); 9432 − 2349 = 7083 (3); 8730 − 3078 = 5652 (4); 6552 − 2556 = 3996 (5); 9963 − 3699 = 6264 (6); 6642 − 2466 = 4176 (7); 7641 − 1467 = 6174 (8). ∴ it takes 8 rounds to reach the Kaprekar constant 6174.

Mental Math (Page 66)

Q. Can we make 1,000 using the numbers in the middle? Why not? What about 14,000, 15,000 and 16,000? Yes, it is possible. Explore how. What thousands cannot be made?

SOLUTION No, we cannot make 1,000. The only middle number smaller than 1000 is 400, and 1000 is not a multiple of 400. 14,000 = 1500 × 8 + 400 × 5 = 12,000 + 2,000 = 14,000. 15,000 = 13,000 + 400 × 5 = 13,000 + 2,000 = 15,000. 16,000 = 1500 × 8 + 400 × 10 = 12,000 + 4,000 = 16,000. ∴ only 1,000 cannot be made.

Figure it Out (Page 66)

1. Write an example for each of the below scenarios whenever possible. Could you find examples for all the cases? If not, think and discuss what could be the reason.

SOLUTION 5-digit + 5-digit > 90,250: 45,000 + 45,400 = 90,400 (> 90,250). ✓ 5-digit + 3-digit = 6-digit sum: 99,999 + 999 = 1,00,998. ✓ 4-digit + 4-digit = 6-digit sum: Not possible, because even 9999 + 9999 = 19,998 is only a 5-digit number. 5-digit + 5-digit = 6-digit sum: 60,000 + 40,000 = 1,00,000. ✓ 5-digit + 5-digit = 18,500: Not possible — the smallest 5-digit number is 10,000, and 10,000 + 10,000 = 20,000 already exceeds 18,500. 5-digit − 5-digit < 56,503: 80,000 − 50,000 = 30,000 (< 56,503). ✓ 5-digit − 3-digit = 4-digit difference: 10,000 − 999 = 9001. ✓ 5-digit − 4-digit = 4-digit difference: 12,000 − 2,500 = 9,500. ✓ 5-digit − 5-digit = 3-digit difference: 50,999 − 50,000 = 999. ✓ 5-digit − 5-digit = 91,500: Not possible — the greatest difference between two 5-digit numbers is 99,999 − 10,000 = 89,999, which is less than 91,500.

2. Always, Sometimes, Never? a. 5-digit number + 5-digit number gives a 5-digit number b. 4-digit number + 2-digit number gives a 4-digit number c. 4-digit number + 2-digit number gives a 6-digit number d. 5-digit number − 5-digit number gives a 5-digit number e. 5-digit number − 2-digit number gives a 3-digit number

SOLUTION a. Only sometimes true. 20,000 + 80,000 = 1,00,000 is a 6-digit number, not 5-digit. b. Only sometimes true. 9,999 + 99 = 10,098 is a 5-digit number, not 4-digit. c. Never true. The largest 4-digit + largest 2-digit = 9,999 + 99 = 10,098, only a 5-digit number, so a 6-digit sum is impossible. d. Only sometimes true. 12,000 − 10,000 = 2,000 is a 4-digit number, not 5-digit. e. Never true. Even the smallest 5-digit number minus the largest 2-digit number, 10,000 − 99 = 9,901, is a 4-digit number, never just 3 digits.

Collatz, Estimation & Games (Sections 3.10–3.12)

Section 3.10 — Make your own Collatz sequences Make some more Collatz sequences like those above, starting with your favourite whole numbers. Do you always reach 1? Do you believe the conjecture of Collatz that all such sequences will eventually reach 1? Why or why not? Answer. Examples (even → halve, odd → ×3 + 1): (a) 28, 14, 7, 22, 11, 34, 17, 52, 26, 13, 40, 20, 10, 5, 16, 8, 4, 2, 1. (b) 19, 58, 29, 88, 44, 22, 11, 34, 17, 52, 26, 13, 40, 20, 10, 5, 16, 8, 4, 2, 1. Yes, we always reach 1. Even numbers are halved, and every odd number becomes even (after ×3 + 1) so it can be halved again; since the smallest even number is 2, the sequence is bound to reach 1.

Simple Estimation (Section 3.11)

3. Name some objects around you that are: a. a few thousand in number b. more than ten thousand in number

SOLUTION a. A few thousand: vehicle (car) registration numbers, 4-digit PIN codes. b. More than ten thousand: monthly salaries, 10-digit mobile numbers.

3. Roshan wants to buy milk and 3 types of fruit to make fruit custard for 5 people. He estimates the cost to be ₹100. Do you agree with him? Why or why not?

SOLUTION Yes, it can be done within ₹100 if the servings are small and only one piece of each of the 3 fruits is bought along with a little milk. However, it is not possible within ₹100 if costly fruits are chosen or larger servings are needed.

4. Estimate the distance between Gandhinagar (in Gujarat) to Kohima (in Nagaland). Hint: Look at the map of India to locate these cities.

SOLUTION Gandhinagar is in the west and Kohima in the far north-east, almost across the whole country, so the distance is roughly 2,500 kilometres.

5. Sheetal is in Grade 6 and says she has spent around 13,000 hours in school till date. Do you agree with her? Why or why not?

SOLUTION No, I do not agree. There are about 6 school hours a day and about 200 working days a year, so a year is about 6 × 200 = 1,200 school hours. 13,000 ÷ 1,200 ≈ 10.8 years of school, but a Grade-6 student (Nursery, KG, Classes 1–6) has been in school only about 8 years ≈ 8 × 1,200 = 9,600 hours. So 13,000 hours is too high.

7. Make some estimation questions and challenge your classmates!

SOLUTION Some examples: “How many students are there in your school?” and “On average, how many hours does a person sleep in a lifetime?” (Many more such questions can be framed.)

Figure it Out (Page 72)

1. There is only one supercell (number greater than all its neighbours) in this grid. If you exchange two digits of one of the numbers, there will be 4 supercells. Figure out which digits to swap. 16,200   39,344   29,765 / 23,609   62,871   45,306 / 19,381   50,319   38,408

SOLUTION Swap the digits 1 and 6 in the number 62,871, turning it into 12,876. The grid then becomes 16,200 / 39,344 / 29,765 ; 23,609 / 12,876 / 45,306 ; 19,381 / 50,319 / 38,408, which has 4 supercells (39,344, 29,765, 45,306 and 50,319 each become greater than all their neighbours).

2. How many rounds does your year of birth take to reach the Kaprekar constant?

SOLUTION Worked example for the year 1980 (largest − smallest each round): 9810 − 1089 = 8721 (1); 8721 − 1278 = 7443 (2); 7443 − 3447 = 3996 (3); 9963 − 3699 = 6264 (4); 6642 − 2466 = 4176 (5); 7641 − 1467 = 6174 (6). So 1980 takes 6 rounds. (Now try the same steps for your own year of birth.)

3. We are the group of 5-digit numbers between 35,000 and 75,000 such that all of our digits are odd. Who is the largest number in our group? Who is the smallest number in our group? Who among us is the closest to 50,000?

SOLUTION All digits must be odd (1, 3, 5, 7, 9) and the number must lie between 35,000 and 75,000. Largest: 73,999 (if digits may repeat) or 73,951 (all different). Smallest: 35,111 (if digits may repeat) or 35,179 (all different). Closest to 50,000: 51,111 (if digits may repeat) or 51,379 (all different) — since 49,999 would need an even leading idea, the nearest all-odd number above 50,000 is taken.

6. Write one 5-digit number and two 3-digit numbers such that their sum is 18,670.

SOLUTION Choose a 5-digit number and two 3-digit numbers that add to 18,670: 18,000 + 300 + 370 = 18,670. (Many other combinations work.)

7. Choose a number between 210 and 390. Create a number pattern similar to those shown in Section 3.9 that will sum up to this number.

SOLUTION Number chosen: 250. One pattern: a row of 50, 50, 50 with a row of 25, 25 above and below it — 50 × 3 + 25 × 4 = 150 + 100 = 250. Another: a 5 × 5 grid of 10s gives 25 × 10 = 250.

8. Recall the sequence of Powers of 2 from Chapter 1, Table 1. Why is the Collatz conjecture correct for all the starting numbers in this sequence?

SOLUTION A power of 2 such as 28 = 2×2×2×2×2×2×2×2 is even, so it is halved to 27, then 26, and so on. Each halving removes one factor of 2, so we keep getting smaller powers of 2 until we reach 2, and 2 ÷ 2 = 1. Hence every power of 2 reaches 1 directly.

9. Check if the Collatz Conjecture holds for the starting number 100.

SOLUTION 100, 50, 25, 76, 38, 19, 58, 29, 88, 44, 22, 11, 34, 17, 52, 26, 13, 40, 20, 10, 5, 16, 8, 4, 2, 1. The sequence reaches 1, so the Collatz conjecture holds for 100.

10. Starting with 0, players alternate adding numbers between 1 and 3. The first person to reach 22 wins. What is the winning strategy now?

SOLUTION The winning strategy is to be the first player and aim for the “safe” totals 2, 6, 10, 14, 18 (and finally 22), keeping a gap of 4 each time. The first player says 2, then after the opponent adds 1–3, brings the total back to the next safe number, and so reaches 22 first.

Common Mistakes to Avoid

Watch out for these

  • Calling an end cell a supercell only by looking at one side — an end cell has only one neighbour, so compare with that one cell.
  • Forgetting that an end child in the taller-neighbour game can never say ‘2’ (it has only one neighbour).
  • In the Kaprekar process, not rearranging the digits each round — always remake the largest and smallest numbers from the new digits.
  • Counting the gap between number-line marks wrongly — find the step by dividing the difference of two marks by the number of steps between them.
  • Thinking 4-digit + 4-digit can give a 6-digit sum — the maximum is 9999 + 9999 = 19,998, only 5 digits.
  • Mixing up the Kaprekar constants: 6174 for 4-digit numbers and 495 for 3-digit numbers.

Practice MCQs & Assertion–Reason

1. A cell is a supercell when its number is:

(a) smaller than all neighbours    (b) greater than all neighbours    (c) equal to a neighbour    (d) at an end

2. The Kaprekar constant for 4-digit numbers is:

(a) 495    (b) 1729    (c) 6174    (d) 9999

3. How many 3-digit numbers are there in all?

(a) 99    (b) 900    (c) 999    (d) 90

4. The smallest number whose digit sum is 14 is:

(a) 95    (b) 59    (c) 77    (d) 149

5. Which of these is a palindrome?

(a) 1231    (b) 848    (c) 1230    (d) 357

6. In the Collatz rule, an even number is:

(a) multiplied by 3    (b) halved    (c) increased by 1    (d) squared

7. From 1 to 100, the digit 7 occurs:

(a) 10 times    (b) 11 times    (c) 19 times    (d) 20 times

8. The maximum number of supercells in a row of 9 cells is:

(a) 4    (b) 5    (c) 6    (d) 9

9. The difference between the largest and smallest 5-digit palindrome is:

(a) 1,10,000    (b) 89,998    (c) 90,000    (d) 99,999

10. A year’s calendar repeats after 5 years when the gap contains:

(a) no leap year    (b) one leap year    (c) two leap years    (d) three leap years

Answer key: 1-(b), 2-(c), 3-(b), 4-(b), 5-(b), 6-(b), 7-(d), 8-(b), 9-(b), 10-(c).

For each Assertion–Reason question, choose: (A) Both Assertion and Reason are true and the Reason is the correct explanation of the Assertion; (B) Both are true but the Reason is not the correct explanation; (C) Assertion is true but Reason is false; (D) Assertion is false but Reason is true.

A-R 1. Assertion: The largest number in a supercell table is always a supercell.

Reason: The largest number is greater than every other number, so it is greater than all its neighbours.

A-R 2. Assertion: A child standing at the end of the line can say ‘2’.

Reason: A child at the end of the line has only one neighbour.

A-R 3. Assertion: The number 5683 reaches the Kaprekar constant in 8 rounds.

Reason: The Kaprekar constant for 4-digit numbers is 6174.

A-R 4. Assertion: There are 900 three-digit numbers.

Reason: The three-digit numbers run from 100 to 999.

A-R 5. Assertion: A 4-digit number added to a 4-digit number can give a 6-digit sum.

Reason: The greatest 4-digit sum is 9999 + 9999 = 19,998, which has only 5 digits.

Answer key: 1-(A), 2-(D), 3-(B), 4-(A), 5-(D).

Quick Revision Summary

  • Numbers convey information, reveal patterns, and power puzzles and games.
  • A supercell is greater than all its neighbours; the largest number is always a supercell, the smallest never is. A row of c cells has at most c÷2 (or (c+1)÷2) supercells.
  • There are 9 one-digit, 90 two-digit, 900 three-digit, 9000 four-digit and 90000 five-digit numbers.
  • Palindromes read the same both ways; the smallest/largest 5-digit palindromes are 10001 and 99999.
  • The Kaprekar constant is 6174 for 4-digit numbers and 495 for 3-digit numbers.
  • The Collatz rule (halve if even, ×3 + 1 if odd) always seems to reach 1 — an unsolved conjecture.
  • Estimation gives a sensible approximate value when exact counts are not needed.

How to score full marks in this chapter

Show your reasoning, not just the answer — for supercell and number-line questions explain which neighbours you compared and how you found the step size. For Kaprekar and Collatz questions, write each round of working in order so every step earns its mark, and remember the two Kaprekar constants (6174 and 495). For estimation questions, state the rough figures you assumed (like 6 school hours a day, 200 days a year) before you calculate.

Frequently Asked Questions

What is Class 6 Maths Ganita Prakash Chapter 3 about?

Chapter 3, Number Play, shows how numbers convey information, reveal patterns and power puzzles and games. It covers supercells, placing numbers on the number line, counting n-digit numbers, digit sums, palindromes, the Kaprekar constant 6174, the Collatz conjecture, simple estimation and winning game strategies.

What is the Kaprekar constant?

The Kaprekar constant is 6174. Take any 4-digit number with at least two different digits, make the largest and smallest numbers from its digits, subtract, and repeat — you always reach 6174. For 3-digit numbers the repeating number is 495.

What is a supercell in this chapter?

A supercell is a cell whose number is greater than all of its adjacent cells. In a row the neighbours are the left and right cells; in a grid they are the left, right, top and bottom cells. The largest number in a table is always a supercell, and the smallest can never be one.

Are these Class 6 Maths Ganita Prakash Chapter 3 solutions free?

Yes. All solutions are free and follow the official NCERT Ganita Prakash textbook for the 2026–27 session, with answers verified against the book’s answer key.

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