BRAIN-TEASERS 06

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🧠 BRAIN-TEASER 06
Speed, Ratios, Income & Finger Counting

🚴 Bike Speed Puzzle: A man would be 5 minutes late to reach his destination if he rides his bike at 30 km per hour. But he would be 10 minutes early if he rides at 40 km per hour. What is the distance to his destination?

✅ Answer: 30 km

📐 Step-by-Step Explanation

Let the correct time to reach be T hours, and distance be D km.

Case 1 (30 km/h, 5 min late = 5/60 = 1/12 hour late):
Time taken = D/30 = T + 1/12 ...(1)

Case 2 (40 km/h, 10 min early = 10/60 = 1/6 hour early):
Time taken = D/40 = T - 1/6 ...(2)

Subtract (2) from (1):
D/30 - D/40 = (T + 1/12) - (T - 1/6)
D(40-30)/(1200) = 1/12 + 1/6
D(10)/1200 = 1/12 + 2/12 = 3/12 = 1/4
D/120 = 1/4 → D = 120/4 = 30 km

✅ Distance = 30 km.
💡 Check: At 30 km/h, time = 1 hour (5 min late → correct time 55 min). At 40 km/h, time = 45 min (10 min early → correct time 55 min). Perfect!

🚗 Ratio of Speeds

Problem: The ratio of speeds of two vehicles is 2:3. If the first vehicle covers 50 km in 3 hours, what distance would the second vehicle cover in 2 hours?

🚙 Answer: 50 km

Step-by-step solution:
Speed of first vehicle = Distance/Time = 50/3 km/h.
Ratio of speeds = 2:3 = (50/3) : S₂
So, S₂ = (3/2) × (50/3) = (3×50)/(2×3) = 50/2 = 25 km/h.
Distance covered by second vehicle in 2 hours = Speed × Time = 25 × 2 = 50 km.
💡 The second vehicle covers exactly the same distance (50 km) but in less time because it is faster!

💰 Income & Expenditure Ratio

Problem: The ratio of income to expenditure of Mr. Natarajan is 7:5. If he saves ₹2000 per month, what is his income?

💰 Answer: ₹7000 per month

Step-by-step solution:
Let income = 7x and expenditure = 5x.
Savings = Income - Expenditure = 7x - 5x = 2x.
Given savings = ₹2000 → 2x = 2000 → x = 1000.
Therefore, Income = 7x = 7 × 1000 = ₹7000 per month.
💡 Check: Expenditure = 5×1000 = ₹5000, Savings = 7000-5000 = ₹2000 ✓
This is a classic ratio application in personal finance.

🌿 Lawn Fencing & Development Cost

Problem: The ratio of length to breadth of a lawn is 3:5. It costs ₹3200 to fence it at ₹2 per metre. What would be the cost of developing the lawn at ₹10 per square metre?

🏡 Answer: ₹15,00,000

Step-by-step solution:
Let length = 3x, breadth = 5x.
Perimeter = 2(3x + 5x) = 2(8x) = 16x metres.
Fencing cost = Perimeter × Rate = 16x × 2 = 32x = ₹3200.
So, 32x = 3200 → x = 100.
Length = 3×100 = 300 m, Breadth = 5×100 = 500 m.
Area = 300 × 500 = 1,50,000 sq m.
Development cost = Area × ₹10 = 1,50,000 × 10 = ₹15,00,000.
💡 This problem combines perimeter, ratio, and area calculations in a real-world context.

🖐️ Finger Counting Puzzle

Problem: Counting pattern: Thumb=1, Index=2, Middle=3, Ring=4, Little=5, then back: Ring=6, Middle=7, Index=8, Thumb=9, Index=10, Middle=11, Ring=12, Little=13, Ring=14, and so on. Which finger will be counted as 1000?

🖕 Answer: Index Finger

Step-by-step explanation:
The pattern repeats every 8 counts after the first 5? Let's analyze carefully.
Pattern: 1(Thumb),2(Index),3(Middle),4(Ring),5(Little),6(Ring),7(Middle),8(Index),9(Thumb),10(Index),11(Middle),12(Ring),13(Little),14(Ring),15(Middle),16(Index),17(Thumb)...
Observe that Thumb appears at positions: 1, 9, 17, 25... (difference 8).
Index appears at: 2, 8, 10, 16, 18, 24, 26...
For 1000, we can use modular arithmetic. The cycle length is 8 after the first thumb.
Actually, the pattern repeats every 8 numbers starting from 2: (2,3,4,5,6,7,8,9) then (10,11,12,13,14,15,16,17)...
Using modulo 8: 1000 ÷ 8 = 125 remainder 0. This corresponds to position pattern.
After analysis, the 1000th count lands on the Index Finger.
💡 This puzzle demonstrates pattern recognition and modular arithmetic in a fun, real-world way!

🌟 Why These Puzzles Matter 🌟

• The speed-time-distance puzzle teaches you to set up equations from real-life scenarios.
• Ratio puzzles help you understand proportions in maps, recipes, and finance.
• The income-expenditure problem shows how ratios apply to personal savings.
• The lawn puzzle combines perimeter, area, and cost calculations.
• The finger counting puzzle introduces modular arithmetic in a fun way!

Mathematics is everywhere — from bike rides to budgeting to counting fingers!

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BRAIN-TEASERS 05

🧠 BRAIN-TEASER 05
Boatmen, Staircase & Number Puzzles

🚤 Boatmen River Crossing: Two boatmen start simultaneously from opposite shores of a river and cross each other after 45 minutes from starting. They row till they reach the opposite shore and return immediately. When will they cross each other again?

✅ Answer: 90 minutes (1 hour 30 minutes from start)

📐 Step-by-Step Explanation

When two boats start from opposite shores, their first meeting happens after 45 minutes. At this moment, together they have covered the width of the river once. After meeting, they continue to opposite shores and turn back. To meet again, they must together cover twice the river width (each goes to the opposite end and returns partway). Since their combined speed is constant, the time for the second meeting is exactly double the first meeting time: 2 × 45 = 90 minutes from the start.

⏱️ Second crossing happens at 90 minutes (1 hour 30 minutes)

🪜 Staircase Footmarks Puzzle

Problem: Three girls climb down a staircase. Girl A climbs 2 steps at a time, Girl B climbs 3 steps, Girl C climbs 4 steps. They start together from the top, leave footmarks, and all reach the bottom in complete steps. On which steps would there be exactly one pair of footmarks? Which steps have no footmarks?

📌 Steps with exactly one pair of footmarks: 2, 3, 9, 10
❌ Steps with no footmarks: 1, 5, 7, 11

Detailed Explanation: The total number of steps is the LCM of 2, 3, and 4 = 12 steps.
• Girl A (2 steps/stride) lands on: 2, 4, 6, 8, 10, 12
• Girl B (3 steps/stride) lands on: 3, 6, 9, 12
• Girl C (4 steps/stride) lands on: 4, 8, 12
Counting footmarks per step:
Step 1: none | Step 2: A only | Step 3: B only | Step 4: A and C (two) | Step 5: none | Step 6: A and B (two)
Step 7: none | Step 8: A and C (two) | Step 9: B only | Step 10: A only | Step 11: none | Step 12: all three
Therefore, steps 2,3,9,10 have exactly one footmark. Steps 1,5,7,11 have none.

🎖️ Soldiers in Rows – Chinese Remainder Theorem

Problem: A group of soldiers: when arranged in rows of 3, there is 1 extra. In rows of 5, there are 2 extra. In rows of 7, there are 3 extra. Find the minimum number of soldiers.

👥 Answer: 52 soldiers

Step-by-step solution using the Chinese Remainder Theorem:
We need N such that:
N ≡ 1 (mod 3) → N leaves remainder 1 when divided by 3
N ≡ 2 (mod 5) → N leaves remainder 2 when divided by 5
N ≡ 3 (mod 7) → N leaves remainder 3 when divided by 7

Let's test numbers that satisfy the first two conditions:
Numbers ≡ 1 mod 3: 1, 4, 7, 10, 13, 16, 19, 22, 25, 28, 31, 34, 37, 40, 43, 46, 49, 52...
Among these, which leave remainder 2 when divided by 5? Check: 7(remainder2✓), 22(remainder2✓), 37(remainder2✓), 52(remainder2✓)
Now check remainder when divided by 7:
7 ÷ 7 = 1 remainder 0 ❌ | 22 ÷ 7 = 3 remainder 1 ❌ | 37 ÷ 7 = 5 remainder 2 ❌ | 52 ÷ 7 = 7 remainder 3 ✅
Therefore, the minimum number is 52 soldiers.
💡 This is a classic application of the Chinese Remainder Theorem, used in cryptography and computer science!

🔢 Four 9's to Make 100

Challenge: Use exactly four 9's and any mathematical operations (+, -, ×, ÷, √, !, etc.) to make 100.

✅ 99 + 9/9 = 100

More solutions:
• 99 + (9 ÷ 9) = 99 + 1 = 100
• 9 × 9 + 9 + 9 = 81 + 18 = 99 (not 100, close!)
• (9 + 9/9) × 9 + 9? Let's check: (9+1)×9+9 = 10×9+9 = 99
• 999/9.99? That uses more than four 9's.
The simplest and most elegant is 99 + 9/9 = 100.
💡 This puzzle teaches creative thinking and that there can be multiple valid solutions to the same problem!

📊 Number of Digits in 2³⁰

Question: How many digits are in the product 2 × 2 × 2 × ... × 2 (30 times)? That is, 2³⁰.

🔢 Answer: 10 digits

Method 1 – Direct Calculation:
2³⁰ = 2¹⁰ × 2¹⁰ × 2¹⁰ = 1024 × 1024 × 1024 = 1,073,741,824 → This number has 10 digits.

Method 2 – Using Logarithms (for larger exponents):
Number of digits = floor(30 × log₁₀2) + 1
log₁₀2 ≈ 0.30102999566
30 × 0.30102999566 = 9.0308998698
floor(9.0308998698) = 9
9 + 1 = 10 digits

💡 Fun fact: 2³⁰ = 1,073,741,824 is exactly 1 Gibibyte (1 GiB) in computer memory! This is why computers have RAM sizes like 1GB, 2GB, 4GB, 8GB, 16GB, 32GB — they are powers of two.

🌟 Why These Puzzles Matter 🌟

• The boatmen puzzle teaches relative speed and the concept of combined distance.
• The staircase puzzle introduces LCM and set theory in a fun way.
• The soldiers puzzle is a real application of the Chinese Remainder Theorem used in cryptography!
• Four 9's builds creative mathematical thinking.
• 2³⁰ digits connects math to computer science.

Every puzzle you solve builds a stronger, more flexible mind. Keep going!

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Brain Teasers 04

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🧠 BRAIN-TEASER 04
Remainders, Water Jugs & Auditorium

🔢 Remainder Patterns: (a) 9 and 16 remainders? (b) 12 and 14 remainders?

✅ Answer: See below

9,16: 9,2,11,4,13,6,15,8,1,10,3,12,5,14,7 (all 1-15)

12,14: 12,10,8,6,4,2,0,12,10,8,6,4,2 (only evens)

📖 Explanation: When gcd(m,n)=1, remainders cover all numbers. gcd(12,14)=2 → only multiples of 2 appear.

💧 Water Jug Puzzle: 9L and 5L cans. Get 3L. Bonus: 8L and 6L → get 5L?

✅ Answer: 3L possible. 5L from (8,6) impossible

📖 Method: Fill 9L→pour to 5L→4L left. Empty 5L, pour 4L. Fill 9L→pour to 5L (needs 1L)→8L left. Empty 5L, pour 8L→3L left. Bonus: gcd(8,6)=2 → only multiples of 2 possible, not 5.

🏛️ Auditorium: East wall 108m², north wall 135m², floor 180m². Find height.

✅ Answer: 9 metres

📖 Explanation: B×H=108, L×H=135, L×B=180. Multiply: (LBH)²=108×135×180=2,624,400 → LBH=1620 → H=1620/180=9.

🔁 Two-digit number: subtract 4 from units, add 4 to tens → double the original. Find number.

✅ Answer: 36

📖 Explanation: Original=10a+b. New=10(a+4)+(b-4)=10a+b+36. Given 10a+b+36=2(10a+b) → 36=10a+b → number=36.

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BRAIN-TEASERS 03

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🧠 BRAIN-TEASER 03
Ratios, Bees & Circle Games

🧱 Cement Mortar: Ratio 1:6, total 42 units. How much cement to add to get 2:9?

✅ Answer: 2 units of cement

📖 Explanation: Current cement=6, sand=36. (6+x)/36 = 2/9 → 9(6+x)=72 → 54+9x=72 → 9x=18 → x=2.

🧂 Salt Water: 30:70 ratio, 1kg solution, evaporate 100g water. New ratio?

✅ Answer: 1:2

📖 Explanation: Salt=300g, water=700g. After evaporation water=600g. Ratio=300:600=1:2.

🐝 Bees Swarm: Half to mustard, 3/4 of rest to rose garden, 10 undecided. Total bees?

✅ Answer: 80 bees

📖 Explanation: Total=x. x/2 + (3/4)(x/2) + 10 = x → x/2 + 3x/8 + 10 = x → 4x/8+3x/8+10=x → 7x/8+10=x → 10=x/8 → x=80.

🔄 Circle Handkerchief Game: 15 children. Skip 1 child works. What about skip 2? Skip 3?

✅ Answer: Skip 2 → Not all. Skip 3 → All get it.

📖 Explanation: Every child gets handkerchief iff gcd(N, step)=1. For 15: step3→gcd=3→no; step4→gcd=1→yes.

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BRAIN-TEASERS 02

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🧠 BRAIN-TEASER 02
LCM, Measuring Rod & Milk Puzzle

🔢 LCM Puzzle: A boy was asked to find the LCM of 3, 5, 12 and another number. But while calculating, he wrote 21 instead of 12 and yet came with the correct answer. What could be the fourth number?

✅ Answer: 28

📖 Explanation: LCM(3,5,12)=60, LCM(3,5,21)=105. For both to be equal, N must contain 2²×7=28. LCM(3,5,12,28)=LCM(3,5,21,28)=420.

📏 Measuring Rod Puzzle: Five pieces of cloth: 15 m, 21 m, 36 m, 42 m, 48 m. All measurable in whole units. Largest possible rod length?

✅ Answer: 3 metres

📖 Explanation: GCD(15,21,36,42,48) = 3. The rod must divide all lengths exactly.

🥛 Milk Measuring Puzzle: 10L, 7L, 3L cans. No markings. Measure exactly 5 litres.

✅ Answer: Yes, 5 litres can be measured

📖 Method: Fill 9L can, pour to 5L → 4L left. Empty 5L, pour 4L into 5L. Fill 9L again, pour to 5L (needs 1L) → 9L left with 8L. Empty 5L, pour 8L into 5L → 3L left in 9L can. ✅

🔁 Two-digit number puzzle: When added to 27 gives its reverse. Find the numbers.

✅ Answer: 14, 25, 36, 47, 58, 69

📖 Explanation: 10a+b+27=10b+a → 9a-9b=-27 → b=a+3. a=1 to 6 gives the numbers.

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BRAIN-TEASERS 01

FUN WITH MATHEMATICS
BRAIN-TEASERS 01
PUZZLES & RIDDLES

🌟 Welcome to Fun with Mathematics! 🌟

These brain-teasers are designed to sharpen logical thinking, problem-solving skills, and mathematical reasoning. Each puzzle challenges you to think differently—whether it's about combinations, limiting factors, or number theory. Take your time, try to solve each one, then check the answers. Share these with friends and see who solves them fastest! Mathematics is not just about numbers—it's about patterns, creativity, and fun. Enjoy the journey!

🍕 Pizza Toppings Problem: In a pizza restaurant, you can get a basic pizza with cheese and tomato. You can choose from four extra toppings: olives, ham, mushrooms, and salami. Ross wants a pizza with two different extra toppings. How many different combinations can Ross choose?

✅ Answer: 6 combinations

📖 Why this works (Combination Formula):
This is a classic "combinations" problem. We have 4 toppings and need to choose any 2. The order does not matter (olives+ham is same as ham+olives). The mathematical formula is C(4,2) = 4! / (2! × 2!) = (4×3×2×1) / (2×1 × 2×1) = 24 / 4 = 6. The six combinations are: (Olives, Ham), (Olives, Mushrooms), (Olives, Salami), (Ham, Mushrooms), (Ham, Salami), (Mushrooms, Salami). This concept is used in probability, menu design, and even lottery calculations!

📚 Bookshelf Sets Problem

To complete one set of bookshelves, a carpenter needs: 4 long wooden panels, 6 short wooden panels, 12 small clips, 2 large clips, and 14 screws.
Stock available: 26 long panels, 33 short panels, 200 small clips, 20 large clips, 510 screws.
How many complete sets can the carpenter make?

✅ Answer: 5 complete sets

📖 Step-by-step reasoning (Bottleneck Principle):
This is a "limiting factor" problem. We divide each stock by the requirement per set:
• Long panels: 26 ÷ 4 = 6 sets (limit 6)
• Short panels: 33 ÷ 6 = 5 sets ← This is the bottleneck!
• Small clips: 200 ÷ 12 = 16 sets
• Large clips: 20 ÷ 2 = 10 sets
• Screws: 510 ÷ 14 = 36 sets
The carpenter cannot make more than 5 sets because short panels run out first. This concept applies to manufacturing, cooking recipes, and project management.

🥭 Mangoes in the Basket – Classic LCM Riddle

When counted in twos → 1 extra. In threes → 2 extra. In fours → 3 extra. In fives → 4 extra. In sixes → 5 extra. But counted in sevens → no extra. What is the minimum number of mangoes?

✅ Answer: 119 mangoes

📖 Mathematical solution (LCM & Divisibility):
The condition "remainder = k-1 when divided by k" means (N + 1) is divisible by 2, 3, 4, 5, and 6. The LCM of 2, 3, 4, 5, 6 is 60. So N + 1 = 60t, meaning N = 60t - 1. Also, N must be divisible by 7 (no remainder when counted in sevens). Trying t = 1 → N = 59 (not divisible by 7). t = 2 → N = 119 (119 ÷ 7 = 17 exactly). So 119 is the smallest solution. This type of problem is called the "Chinese Remainder Theorem" and appears in number theory and cryptography.

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