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Answer of Tricky Logical Mathematical Puzzle
Or a look at the question itself?
Let's look at the puzzle once again.
From first equation, it is clear that figure = 15. But the figure itself made up of square (4 sides) + polygon (5 sides) + hexagon (6 sides) = 15.
From second equation, we have bunch of 4 bananas = 4 i.e. 1 banana = 1.
And from third equation, we have 3 hours in clock = 3 i.e. 1 hours = 1.
Hence, in fourth equation, value of clock = 2, 3 bananas = 3, figure = sides of hexagon + sides of pentagons = 6 + 5 = 11.
2 + 3 + 3 x 11 = 38
Hence, answer is 38.
Wish Of Cigarette Smoking
Bruce is an inmate at a large prison, and like most of the other prisoners, he smokes cigarettes. During his time in the prison, Bruce finds that if he has 3 cigarette butts, he can cram them together and turn them into 1 full cigarette. Whenever he smokes a cigarette, it turns into a cigarette butt.
One day, Bruce is in his cell talking to one of his cellmates, Steve.
“I really want to smoke 5 cigarettes today, but all I have are these 10 cigarette butts,” Bruce tells Steve. “I’m not sure that will be enough.”
“Why don’t you borrow some of Tom’s cigarette butts?” asks Steve, pointing over to a small pile of cigarette butts on the bed of their third cellmate, Tom, who is out for the day on a community service project.
“I can’t,” Bruce says. “Tom always counts exactly how many cigarette butts are in his pile, and he’d probably kill me if he noticed that I had taken any.”
However, after thinking for a while, Bruce figures out a way that he can smoke 5 cigarettes without angering Tom. What is his plan?
That's his master plan!
One day, Bruce is in his cell talking to one of his cellmates, Steve.
“I really want to smoke 5 cigarettes today, but all I have are these 10 cigarette butts,” Bruce tells Steve. “I’m not sure that will be enough.”
“Why don’t you borrow some of Tom’s cigarette butts?” asks Steve, pointing over to a small pile of cigarette butts on the bed of their third cellmate, Tom, who is out for the day on a community service project.
“I can’t,” Bruce says. “Tom always counts exactly how many cigarette butts are in his pile, and he’d probably kill me if he noticed that I had taken any.”
However, after thinking for a while, Bruce figures out a way that he can smoke 5 cigarettes without angering Tom. What is his plan?
That's his master plan!
Fulfilling The Wish Of Cigarette Smoking
What was the challenge?
Bruce takes 9 of his 10 cigarette butts and make 3 cigarettes using those 9 (9/3=3). Now, he smokes all 3 cigarettes. At this point, he has 3 + 1 = 4 cigarette butts.
Using 3 out of 4 cigarette butts, he make one another cigarette and smokes it. Now he has 1 + 1 = 2 cigarette butts & till now has smoked 4 cigarettes.
Now he borrows 1 Tom's cigarette butts making total number of cigarette butts equal to 3. Using these 3 butts he makes one more cigarette and this way he smokes 5th cigarette.
After smoking this 5th, he puts back the cigarette butt left in Tom's pile so that Tom won't find anything missing.
Bus is Moving In 'This' Direction!
Why dirction was asked to find?
Well, it totally depends on the location of the bus. How? Read further.
If you look at it carefully, then you can notice that the doors of the bus are missing.
That clearly indicates, those must be on the other side of bus.
Hence if bus is on the roads of India then it must have doors at it's left side & hence the bus must be moving in the right direction.
While in some countries, bus might have doors at the right; in the case the bus must be moving in left direction.
Viral Maths Problem Confusing Students & Parents
There
are 73 red, blue and green marbles in a jar. There are twice as many
red marbles as blue marbles. There are 19 more marbles than green
marbles.
Solution of Viral Maths Problem Confusing Students & Parents
What was the problem?
Using Algebra :
Let r,b and g be the numbers of red, blue and green marbles in the jar.
There are 73 red, blue and green marbles in a jar.
So r + b + g = 73 .....(1)
There are twice as many red marbles as blue marbles.
r = 2b ......(2)
There are 19 more blue marbles than green marbles.
b = g + 19
g = b - 19 ......(3)
Putting (2) and (3) in (1), gives
2b + b + b - 19 = 73
4b = 92
b = 23
Putting b = 23 in (3) gives,
g = 23 - 19 = 4
Putting b = 23 in (2), gives
r = 2x23 = 46
So there are 46 red,23 blue and 4 green marbles in the jar.
Without Algebra :
In the case, we need to try trail and error method.
If g = 1, then b = 20 and r = 2(20) = 40 giving total 40 + 20 + 1 = 61.
If g = 2, then b = 21 and r = 2(21) = 42 giving total 42 + 21 + 2 = 65.
If g = 3, then b = 22 and r = 2(22) = 44 giving total 44 + 22 + 3 = 69.
Total is increasing at the rate of 4. So finally,
If g = 4, then b = 23 and r = 2(23) = 46 giving total 46 + 23 + 4 = 73.
So there are 46 red,23 blue and 4 green marbles in the jar.
The Buyer Who is Thief
Once a man steals Rs.100 note from the shop. Later he purchases good of worth Rs.70 from the same shop using that note. The shopkeeper gives back Rs.30 in return.
How much did shopkeeper loose in the case?
Do you think Rs.130? Or anything else?
How much did shopkeeper loose in the case?
Do you think Rs.130? Or anything else?
Loss Due To Thief Buyer
What's the case history?
So did you just answer Rs.130 ? No, that's not correct!
Thief initially steals Rs.100 note. Now imagine instead of Rs.100 he steals goods of worth Rs. 70 + Rs.30 (given by shopkeeper). So eventually, the shopkeeper lost only Rs.100 in the process.
In other words, the thief exchanges Rs.70 with the goods in the case. He pays for those goods to shopkeeper. So he looses Rs.70 from stolen Rs.100 & gains back via goods.
So eventually, the shopkeeper lost only Rs.100 in the case.
So did you just answer Rs.130 ? No, that's not correct!
Thief initially steals Rs.100 note. Now imagine instead of Rs.100 he steals goods of worth Rs. 70 + Rs.30 (given by shopkeeper). So eventually, the shopkeeper lost only Rs.100 in the process.
In other words, the thief exchanges Rs.70 with the goods in the case. He pays for those goods to shopkeeper. So he looses Rs.70 from stolen Rs.100 & gains back via goods.
So eventually, the shopkeeper lost only Rs.100 in the case.
The Exact Age?
Tommy: "How old are you, Mamma?"
Mamma: "Let me think, Tommy. Well, our three ages add up to exactly seventy years."
Tommy: "That's a lot, isn't it? And how old are you, Papa?"
Papa: "Just six times as old as you, my son."
Tommy: "Shall I ever be half as old as you, Papa?"
Papa: "Yes, Tommy; and when that happens our three ages will add up to exactly twice as much as to-day."
Tommy: "And supposing I was born before you, Papa; and supposing Mamma had forgot all about it, and hadn't been at home when I came; and supposing..."
Mamma: "Supposing, Tommy, we talk about bed. Come along, darling. You'll have a headache."
Now, if Tommy had been some years older he might have calculated the exact ages of his parents from the information they had given him. Can you find out the exact age of Mamma?
Here is CALCULATION of exact age!
Mamma: "Let me think, Tommy. Well, our three ages add up to exactly seventy years."
Tommy: "That's a lot, isn't it? And how old are you, Papa?"
Papa: "Just six times as old as you, my son."
Tommy: "Shall I ever be half as old as you, Papa?"
Papa: "Yes, Tommy; and when that happens our three ages will add up to exactly twice as much as to-day."
Tommy: "And supposing I was born before you, Papa; and supposing Mamma had forgot all about it, and hadn't been at home when I came; and supposing..."
Mamma: "Supposing, Tommy, we talk about bed. Come along, darling. You'll have a headache."
Now, if Tommy had been some years older he might have calculated the exact ages of his parents from the information they had given him. Can you find out the exact age of Mamma?
Here is CALCULATION of exact age!
Calculation Of The Exact Age
What was the problem?
Let us suppose T be the age of Tommy, M be of the Mamma and P be that of Papa.
Sum of their ages is 70.
T + M + P = 70 ......(1)
and Papa is 6 times as old as Tommy,
P = 6T .....(2)
In unknown number of years X, Papa will be twice old as Tommy,
P + X = 2 (T + X) ....(3)
and the sum of ages at that time is 70 x 2 = 140,
(T + X) + (P + X) + (M + X) = 140.
T + P + M + 3X = 140
From (1), above equation becomes,
70 + 3X = 140
X = 70/3 .....(4)
Putting (4) and (2) in (3),
P + X = 2 (T + X)
6T + 70/3 = 2(T + 70/3)
T = 70/12 .....(6)
Using (6) in (2),
P = 6T
P = 6(70/12)
P = 70/2 ......(7)
Putting (6) and (7) in (1),
M = 70 - 70/2 - 70/12
M = 29.1666 = 29 years 2 months.
P = 70/2 = 35 years.
T = 70/12 = 5.8333 = 5 years 10 months.
To summarize, the Tommy is 5 years 10 months old, Mama is 29 years 2 months old and Papa is 35 years old.
50th Fastest And The 50th Slowest
Matt is the fiftieth fastest and the fiftieth slowest runner in his school.
Assuming no two runners are the same speed, how many runners are in Matt’s school?
Find here total number of runners!
Assuming no two runners are the same speed, how many runners are in Matt’s school?
Find here total number of runners!
Total Runners In The School
Read the given data first!
This could be very tricky one. Let's assume that the Matt is fifth fastest and fifth slowest runner in his school.
Then there are 4 runners ahead of him numbered 1 to 4 and 4 behind him numbered 6 to 9. So there would be total 9 runners in his school in the case.
But Matt is 50th fastest runner meaning 49 are ahead of him numbered 1 to 49. And 49 are behind him numbered as 51 to 99 (total 49) while Matt is at 50th position.
Hence, there are 49 + 1 + 49 = 99 runners in his school.
A Rich Earl And Swamp
A rich earl has become the owner of a piece of land, which to his
dissatisfaction turned out to be nothing more than a big swamp. The earl
wants to get rid of the swamp.
A salesman advises him to use his fast-growing plants which can cover the swamp very quickly. "This plant doubles every day, tomorrow you will have two, the day after tomorrow four, etc. In 80 days, your swamp will be completely covered." The earl reacts: "80 days? This takes far too much time. Then just give me eight of these plants."
Question 1: What did the earl think?
Question 2: And what do you think?
Go to the answers directly!
A salesman advises him to use his fast-growing plants which can cover the swamp very quickly. "This plant doubles every day, tomorrow you will have two, the day after tomorrow four, etc. In 80 days, your swamp will be completely covered." The earl reacts: "80 days? This takes far too much time. Then just give me eight of these plants."
Question 1: What did the earl think?
Question 2: And what do you think?
Planting Trees Covering Swamp
What's the exact story?
The earl must have thought that planting 8 trees on first day itself would cause him to wait for only 10 days. That's totally wrong conclusion.
Though started with 8 trees, on other day number will be doubled only not tripled or increased to x8. Starting with 8 trees is like skipping 3 days (2,4,8) if started with 1 tree.That is only 3 days would be saved.
In short, with 8 plants, the earl need to wait for 77 days!
Strange Creatures on Island
There are people and strange monkeys on this island, and you can not
tell who is who (Edit: until you understand what they said - see
below). They speak either only the truth or only lies.
Who are the following two guys?
A: B is a lying monkey. I am human.
B: A is telling the truth.
Know who are they!
Who are the following two guys?
A: B is a lying monkey. I am human.
B: A is telling the truth.
Know who are they!
Identifying the Strange Creature
What was the situation?
Let's first have statements by 2 creatures -
A: B is a lying monkey. I am human.
B: A is telling the truth.
If we assume B is telling the truth then A is also telling the truth. But A in statement says B is lying which contradicts our assumption.
Hence, B must be lying. If B is lying then statement of B suggest that A is also must be lying. That mean 'B is lying monkey' part of statement made by A is too lie. Since we have deduced already B is lying, the lying statement of A suggests that B is not monkey. Hence B is the lying man!
Other lie spoken by A is that it is human. Hence A must be a lying monkey!
Forgotten Bank Account Number
Today, John has to transfer 50 euro to the bank account of a Dutch
friend. He has written down the account number on a piece paper. But
since he had forgotten to take out the paper from his trousers when he
put them in the washing machine, one digit of the bank account number
became unreadable. The note says: 3170?4847.
The friend of John is climbing the Mount Everest at the moment, so it is impossible for John to call his friend. Suddenly he remembers that a for a valid Dutch bank account number it holds that the first digit times 9 + the second digit times 8 + the third digit times 7 + ...... + the ninth digit times 1 should be divisible by 11. John thinks for a moment and finds the correct number.
What is it?
That it is !
The friend of John is climbing the Mount Everest at the moment, so it is impossible for John to call his friend. Suddenly he remembers that a for a valid Dutch bank account number it holds that the first digit times 9 + the second digit times 8 + the third digit times 7 + ...... + the ninth digit times 1 should be divisible by 11. John thinks for a moment and finds the correct number.
What is it?
That it is !
Recalling Forgotten Bank Account Number
What were the clues?
Let x be that missing digit. Then the bank account number looks like, 3170x4847.
Now 9 x First Digit + 8 x Second Digit + 7 x Third Digit.......must be divisible by 11.
That is 27 + 8 + 49 + 0 + 5x + 16 + 24 + 8 + 7 = 139 + 5x must be divisible by 11.
The only value of x as a digit the satisfies above is 3. With that, total sum 154 is divisible by 11.
Hence, the account number must be, 317034847.
