This is an abnormal paragraph. It is not normal at all. All of its writing is grammatically right, but it looks wrong. If you find what's wrong, you'll show your skill in sight. If you can't find it, that's alright. Not many found it instantly. You may look on for hours and hours, or you may find it soon. In any way, it isn't normal. Why?
Pay attention to the words, not the meaning.
This paragraph contains no words with "e" in it. This is abnormal as "e" is found most commonly.
A woman was found dead in a ditch. They picked up her phone and called the first person in her contacts, which was the husband. They called the husband and said, "Hi, your wife was found dead in a ditch, please hurry!" So, the husband came to the ditch and got arrested. Why did he get arrested?
The husband was already at the scene of the crime...
The husband killed her, because he knew where the ditch was.
Imagine Johnny, a party clown, is carrying three pieces of gold each piece weighing one kilogram. While taking a walk he comes to a bridge that has a sign posted saying the bridge could hold only a maximum of 80 kilograms. John weighs 78 kilograms and the gold weighs three kilograms. Johnny reads the sign and still safely crossed the bridge with all the gold. How did he manage this?
Think about the state of Johnny when he's not carrying the gold...
Johnny is a clown so he has mastered juggling. When he came to the bridge he juggled the gold, always keeping one piece in the air.
Bouncing Bob was riding a particularly frisky horse when suddenly its bridle came off. As they raced down the road, a screaming Bob clung to the horse's ears for dear life. Out of the corner of his eye, Bob saw a car coming, and realizing the horse was completely out of control, he panicked. Flailing his arms about, he accidentally caused the horse to come to an abrupt halt. What could Bouncing Bob have done to make the horse stop?
Think about what Bob did with his arms that might have affected the horse's ears...
Bob accidentally put his hands over the horse's eyes. If a horse can't see he will automatically stop.
The following is one of those boy-gets-girl, boy-loses-girl, boy-gets-girl romantic stories. This famous couple first met back in 1961 while doing a TV commercial together. The pair instantly became boyfriend and girlfriend and continued dating until Valentine's Day of 2004, when the girl finally broke off the relationship. Rumor had it at the time that the girl (now a grown woman) wanted to get married, but the boy (now a grown man) was afraid of commitment, even after dating the woman for 43 years. However, the man had some plastic surgery done two years later (reportedly to impress the woman), and the couple got back together in 2011. It is incredible to imagine, but since this duo first got together, the man has had 40 different occupations, while the woman has had at least 200 separate careers -- even running for President of the United States at one point! Who are these two lovebirds who have had such a lengthy and interesting relationship?
Think about iconic advertising characters that have been around for decades...
There are 11 candles in front of you, all of them with burning wicks. Your friend blows out six of these wicks. How many candles will remain?
Think about what happens to the candles when the wicks are blown out...
The six candles that had their wicks blown out will remain. After all, one, the other five candles will eventually burn down, and two, I asked you how many candles will remain, NOT, how many flames will remain.
Taylor was walking home from the gym when someone ran up in front of the woman and hit her on the right side of her face. The woman went right to the police station to report the attack. The detectives had found three people-Mike, Jerry, and Jack-and arrested them. How can the detectives figure out who really attacked Taylor?
Pay attention to the pronouns used in the story, particularly when referring to the victim and the attackers.
The detectives should give each suspect a marker and ask them to write their names on a whiteboard. Taylor was hit on the right side of her face, which means that the person who attacked her is left-handed. The detectives just need to observe which of the three suspects writes with his left hand, and that person should be arrested.
If someone were to write a biography about us, the following could be reported: #1 - Many famous people have sung about my type of ribbons over the years. #2 - My type of fever often occurs in children, ages 5 to 15. #3 - According to the book of Isaiah in the Bible, "Though your sins be as me, they shall be white as snow...." #4 - Rhett loved me, but did I love Rhett? Unfortunately, the answer was lost, as it went with the breeze. #5 - Author Nate H. wrote a famous book about my type of letter in 1850. Based on the biographical information above --- Who/what are we?
A famous magician and his daughter were seated inside a well-known establishment, along with a group of five other customers who were all waiting for service. The magician suddenly turned to his daughter, and told her to look through the window to her right where a bright blue car was parked. In majestic fashion, the magician then swept his arm toward the car and said, "Behold! I command you to rise!", and the car slowly began to rise to a height of one...two...three..., and finally stopped, suspended in mid-air, at a height of four feet! However, no one in the room appeared to be surprised or amazed by the magician's actions, and the magician's daughter was heard to say, "Daddy, you're a big ham." Why was no one in awe of the magician's abilities?
Think about where the magician and his daughter are seated...
The magician and his daughter were waiting in a local Firestone vehicle repair shop to have their car repaired. The magician noticed that a technician was about to raise a blue car on a hydronic lift to repair it, so he tried to take credit for the levitation. Needless to say, neither the other customers or his daughter were impressed.
The day before yesterday, Chris was 7 years old. Next year, she'll turn 10.
How is this possible?
Think about the timing of birthdays and the way we phrase dates...
Today is Jan. 1st. Yesterday, December 31, was Chris's 8th birthday. On December 30, she was still 7. This year she will turn 9, and next year, she'll turn 10.
A bus driver was heading down a street in Colorado. He went right past a stop sign without stopping, he turned left where there was a "no left turn" sign, and he went the wrong way on a one-way street. Then he went on the left side of the road past a cop car. Still - he didn't break any traffic laws. Why not?
Think about the occupation of the person involved...
A triangle has sides of 13, 18 and 31 inches. What is the triangle's area?
Think Pythagoras!
Zero. The two shorter sides of a triangle, when added together (13+18=31), must be greater than the third or longest side (31) for it to be a triangle by definition. Therefore, the result would be two parallel lines with an area of 0.
There are two numbers whose product added to the sum of their squares is 109, and the difference of whose squares is 24. What are the two numbers?
Think algebraically, and consider the two numbers as x and y. You'll need to form two equations based on the given conditions, and then solve for x and y. Focus on the difference of whose squares being 24, as this might help you find a crucial relationship between x and y.
5 and 7.
(5)² = 25(7)² = 49(5x7)+25+49=10949-25=24
My age today is three times what it will be three years from now minus three times what my age was three years ago. How old am I?
Think about it like a math puzzle: Let your current age be "x". Then, three years from now, your age will be x+3, and three years ago, your age was x-3. Now, plug these values into the equation and see if you can solve for x!
Don't be too confused, the answer is 18 years old.
A watchmaker was telephoned urgently to make a house call to replace the broken hands on a clock. He was sik so he sent his apprentice.
The apprentice was thorough. When he finished inspecting the clock it was dark. Assuming his work was done, he attached the new hands and set the clock by his pocket watch. It was sic o'clock, so he set the big hand at the 12 and the little hand at the 6.
The apprectice returned, but soon the telephone rang. He picked up to his angry client:
"You didn't do the job right. The clock shows the wrong time."
Surprised he hurried back. He found the clock showing not much past eight. He handed is watch to the client and showed her that her clock was not even one second late. The client had to agree.
Early the nect morning, the client telephoned to say the clock has apparently gone berserk, hands were moving around the clock at will. The apprentice again rushed over, the clock showed a little past seven. After checking his watch he yelled:
"You are making fun of me! Your clock shows the right time!"
Have you figured out whats going on?
Here's a hint:
Think about the type of clock the apprentice was fixing, and how it might be different from a typical clock.
As the problem says the apprentice mixed up the hands so that the minute hand was short and the hour hand was long.
The first time the apprentice returned to the client was about 2 hours and 10 minutes after he had set the clock at six.The long had moved olny from twelve to a little past two. The little made two whole circles and an additional 10 minutes. Thus the clock showed the correct time.
The next day around 7:o5 a.m.he came a second time,13 hours and 15 minutes after he had set the clock for six. The long had, acting as the hour hand,covered 13 hours to reach 1. The short hand made 13 full circles and 5 minutes, reaching 7, So the clock showed the correct time again.
You are given a set of scales and 12 marbles. The scales are of the old balance variety. That is, a small dish hangs from each end of a rod that is balanced in the middle. The device enables you to conclude either that the contents of the dishes weigh the same or that the dish that falls lower has heavier contents than the other. The 12 marbles appear to be identical. In fact, 11 of them are identical, and one is of different weight. Your task is to identify the unusual marble and discard it. You are allowed to use the scales three times if you wish, but no more. Note that the unusual marble may be heavier or lighter than the others. How can you identify it and determine whether it is heavy or light?
Here's a hint:
For your first weighing, try to create a situation where you're comparing a group of marbles against another group of the same size. Think about how you can use this weighing to divide the 12 marbles into three groups of 4, and what information you can gain from this weighing...
Number the marbles from 1 to 12. For the first weighing put marbles 1,2,3 and 4 on one side and marbles 5,6,7 and 8 on the other. The marbles will either they balance or not. If they balance, then the different marble is in group 9,10,11,12. Thus, we would put 1 and 2 on one side and 9 and 10 on the other. If these balance then the different marble is either 11 or 12. Weigh marble 1 against 11. If they balance, the different marble is number 12. If they do not balance, then 11 is the different marble. If 1 and 2 vs 9 and 10 do not balance, then the different marble is either 9 or 10. Again, weigh 1 against 9. If they balance, the different marble is number 10, otherwise, it is number 9. That was the easy part. What if the first weighing 1,2,3,4 vs 5,6,7,8 does not balance? Then any one of these marbles could be a different marble. Now, in order to proceed, keep track of which side is heavy for each of the following weighings. Suppose that 5,6,7 and 8 is the heavy side. We now weigh 1,5 and 6 against 2,7 and 8. If they balance, then the different marble is either 3 or 4. Weigh 4 against 9, a known good marble. If they balance then the different marble is 3 or 4. Then, if 1,5 and 6 vs 2,7 and 8 do not balance, and 2,7,8 is the heavy side, then either 7 or 8 is a different, heavy marble, or 1 is a different, light marble. For the third weighing, weigh 7 against 8. Whichever side is heavy is the different marble. If they balance, then 1 is the different marble. Should the weighing of 1,5 and 6 vs 2,7 and 8 show 1,5,6 to be the heavy side, then either 5 or 6 is a different heavy marble or 2 is a light different marble. Weigh 5 against 6. The heavier one is the different marble. If they balance, then 2 is a different light marble.
Jack has 8 bricks 7 of them weights the same amount and one is slightly heavier. Using a balance scale, how can Jack find the heavier brick in two weighings?
Think about dividing the bricks into three groups of 2, 2, and 4...
First he split them in to piles of 3, 3, and 2 bricks. Then he weighs both groups of 3 with each other. If they balance he knows the brick is one of the 2 unweighed bricks and he can weigh them to find the heaver one. If the the stacks of 3 bricks do not balance, he will weigh 2 of the 3 bricks. If they balance he will know the brick left unweighed is heavier, or if they do not balance, he will find the heavier one.
Old Mr. Tilly was found dead in his study by Mr. Foster. Mr. Foster recounted his dismal discovery to the police. "I was walking by Mr. Tilly`s house when I thought I would just pop in for a visit. I noticed his study light was on and I decided to peek in from the outside to see if he was in there. There was frost on the window, so I had to wipe it away to see inside. That is when I saw his body. So I kicked in the front door to confirm my suspicions of foul play. I called the police immediately afterward." The officer immediately arrested Mr. Foster for the murder of Mr. Tilly. How did he know Mr. Foster was lying?
Here's a hint:
Think about the season and the condition of the window...
Frost forms on the inside of the window, not the outside. So Mr. Foster could not have wiped it off to discover Mr. Tilly`s body.
A famous chemist was murdered in his own lab. There was no evidence except for a piece of paper with the names of chemical substances on it. On the day he was murdered, the chemist had only 3 visitors: his wife, Mary, his nephew Nicolas, and his friend Johnathan. The police arrested the murderer right away. How did they know who it was?
Think about the names on the piece of paper... are they just random chemical substances, or could they be something more?
The piece of paper had a clue on it. If you combine the short names of the chemical substances on the paper, you’ll get a name: Ni-C-O-La-S.
NASA was considering sending canaries into space to study them under zero gravity. The project was scrapped when someone realized that in spite of having sufficient water supplies, they could die of dehydration within a few hours. Why?
Think about how canaries drink water...
Birds, unlike humans, need gravity to swallow. Humans can swallow even while hanging upside down.
Stranger: Does your dog bite?
Farmer: Nope.
All of a sudden the dog bites the stranger on the leg. Yet the farmer was telling the truth! How can this be?
I can fill a room with out being seen, for your eyes I do not need. I can be felt, but can never feel; can be heard, but can never hear. I have many thoughts, but never think. I say many things, but never speak. I can tell a story with no words. Through my waves I am heard. I am your life, your love and sad goodbye. I resound in your every laugh and cry. I mark time, and time marks me. The past, present and future, through me you'll see. What am I?
"Listen carefully, for the answer is all around you..."
You'll find me all around you;
I can be clear but not seen through;
If I get cut you can glue me shut, but I can do it too.
What am I?
Think about something that's often overlooked, yet omnipresent in our daily lives. It can be transparent, but not necessarily transparent in the classical sense. And when it's "cut" or damaged, it can be repaired, but it can also repair itself in a way...
Riddle me this. I am humble in my greetings, but forget my whole and you are sure to find hell. What am I?
Think about a common phrase people use when greeting each other, and how removing a single word from that phrase can lead to a very different and ominous outcome...
Lynn likes grapes but not potatoes. She likes squash but not lettuce, and she likes peas but not onions. Following the same rule, will she like pumpkins or apples?
Think about the color of the food...
Pumpkins. Lynn only likes things that grow on vines.
I am a seven-lettered word; my first three letters refer to a place a driver sits in a bus. My first five letters refer to a small room on a ship; my middle three letters are a container people put waste in. My last three letters refer to one that catches fish. My whole refer to a furniture with doors. What am I?
Think about different modes of transportation and how they relate to enclosed spaces...
Farmer Brown came to town with some watermelons. He sold half of them plus half a melon, and found that he had one whole melon left. How many melons did he take to town?
I saw a man in white, he looked quite a sight. He was not old, but he stood in the cold. And when he felt the sun, he started to run. Please answer me.
Who could he be?
Here's a hint: Think about something you might find in your freezer.
One day there was a young girl who walked up a mountain she had no gear and it was really cold then she found herself slipping she fell off the side of the mountain because someone had pushed her. Next, a boy named Harper Kane was her brother. He called the police. The police came and found three suspects Molly, Bob, and Dave. The police asked them what they were doing today. Molly says she’s been out and never pushed the girl off the mountain. Bob said he was outside running and doing his workout. Dave said he went outside to the park with his kids and went to go get ice cream. Who pushed the young girl off of the mountain how do you know?
Hint: Pay close attention to the story's setting and the suspects' alibis. One of them is not telling the truth, and it's not because they're lying about pushing the girl...
Molly push the young girl off the mountain, The police had never said anything about the young girl being pushed off the mountain. All he asked was what were you doing today.