Blattiphobia
A great wave of fear filters through the body at the thought of creatures that slither and crawl. Of all the bugs, snakes, and spiders in this vast universe the appearance, feel, and behavior of the tree roach can induce a panic as intense as a heart attack.
The appearance of a roach is fearful in itself. One of the frightening things about a roach is its shape. It is scary to think how aerodynamic its body is. The roach can flatten its body like a pancake, making it appear to move through walls. The "V" shaped antennae appear to be picking up human emotions, especially fear. The size of a roach can send my heart into my throat. I have seen roaches on my countertop two and one half inches long. Johnny Carson had an African variety on his show that was three inches long. It's frightening to think roaches are so big that Raid had to create a motel for them. Seeing a roach crawling in filthy places reminds us of the germs it carries. My skin shudders when I see a roach in the toilet. Roaches love to crawl in the grime under the kitchen sink. I once saw a roach bouncing in the dirt of one of my potted plants as if it were a puppy who had just received a bath.
Fear can turn into convulsions as actual contact with a roach is made. Every nerve fires at the same time when a roach crawls on the skin. I became physically ill with fear when a roach ran up my bare leg. Once one jumped from a box into my lap and all my extremities thrashed about while trying to remove the bug from my skin. The ultimate contact was when the roach ran across my face; I wanted to die! Getting a roach caught in my hair was frightening--no, traumatic. A romantic evening on the porch turned into a scene out of "Psycho" when a roach dropped on my hair. Dinner was ruined when a roach dropped down the back of my dress at an outdoor restaurant. Momentary skin contact with a roach is bad; stepping on one spells phobia. The crunch of a big roach as it is stepped on sends waves up my spine.
Just imagine for a moment that you have a cynophobia or the fear of dogs, would this be how you would feel. Driving down the road the oil light comes on. "I must stop the car to add more oil or I will damage the car engine. This looks like a good place to pull over. I'll just stop in front of this house. The oil is in the trunk, so I'll pop the top first, then get the oil out of the trunk. OK, I have the oil, but what if there is a dog at this house. Hurry, I have to hurry. A dog might come running out and bark at me any minute. Just get the oil in the engine. I can't my hands are shaking. Don't worry, there is no dog. Just get the oil in the engine. I don't care if I spill it, just get some in the engine. Take another look around, is there a dog anywhere. OK, the oils in, now hurry get back in the car. I can't breath. I'm safely back in the car, now just take a minute and breath. When will my hands stop shaking." This is how a person with a phobia of dogs might feel. There is no dog around anywhere in sight, but the thought of a dog running at them barking is enough to cause a panic attack. In "Exploring Psychology" David G. Myers defines phobia as "an anxiety disorder marked by a persistent, irrational fear and avoidance of a specific object or situation" (432). This paper will explore the history, causes, effects, and treatment of Phobias.
bad one either. We started out with building the five main components of a vending
On the construction of a diagonal number based on an array of the natural numbers, a real number is given. This number is therefore not an element of the set of the natural numbers. Thus the argument suggests there exist more real than natural numbers even when considering an infinite list of the naturals. Hence the result is given that the real numbers cannot be put into one-one correspondence with the natural numbers. This is that the set of real numbers is non-denumerable. Since we have the definition that two sets have the same cardinality ...
In conclusion I would like to say that this discussion was not designed to be a proof of why combinations exist but an explanation of how these patterns occur. As you think about how combinatorics show up in Pascal’s Triangle, keep in mind that this is just one of the many patterns that are concealed within this infinitely long mathematical triangle.
Schattschneider, Doris. “The Fascination of Tiling.” The Visual Mind: Art and Mathematics. Ed. Michele Emmer. Cambridge: MIT Press. 157-164.
Euclid also showed that if the number 2n - 1 is prime then the number 2n-1(2n - 1) is a perfect number. The mathematician Euler (much later in 1747) was able to show that all even perfect numbers are of this form. It is not known to this day whether there are any odd perfect numbers.
Tubbs, Robert. What is a Number? Mathematical Concepts and Their Origins. Baltimore, Md: The Johns Hopkins
dismissed as not real mathematics. However, Cantor was able to publish his works, and in the story, his famous hotel was able to be printed in news paper advertisements. When the hotel finally filled up with an infinite number of people, Cantor's assistant didn't know what to do.
It is the end of a long, rough day at the busy hospital. You get done with your last injured patient, when you hear someone with tiny indented holes all over his body say, “Can you help me?” If you would freak out and get goosebumps from seeing holes like this, you may be someone that has trypophobia, the fear of tiny clusters or holes.
‘Nature abounds with example of mathematical concepts’ (Pappas, 2011, .107). It is interesting how much we see this now we know, regarding the Fibonacci Sequence, which is number pattern where the first number added to itself creates a new number, then adding that previous number to the new number and so on. You will notice how in nature this sequence always adds up to a Fibonacci number, but alas this is no coincidence it is a way in which plants can pack in the most seeds in a small space creating the most efficient way to receive sunlight and catches the most
Although Spiders provide a plethora of benefits to our community, they continue to be one of the most feared insects not only in the Northern Kentuckian area but also throughout the world. In this project, I will come to a conclusion on why people generally fear spiders, which is an actual diagnosis called arachnophobia. Arachnophobia can be triggered by the mere thought of a spider or even by a picture of a spider in some cases. Some people with arachnophobia will, upon entering a room, search it for a spider. If they find a spider, they will monitor its progress very thoroughly. Often the fear is caused by having an unwanted encounter with a spider earlier in life, such as their childhood. One of the more effective and
First Natural numbers which are what we use and see as our counting numbers. These numbers consist of these simple numbers 1, 2, 3, 4… and so on. Whole numbers are the next numbers which include all natural numbers along with the number zero which means that they are for example 0, 1, 2, 3, 4… and so on. Integers can also be whole numbers but also can be whole numbers with a negative sign in front of them. Integers are the individual numbers such as -4, -3, -2, -1, 0, 1, 2, 3, 4… and so on. Rational numbers include integers along with fractions, and decimals. Examples for Rational numbers include ¼, -¾, 7.82, 2, 123/25, 0.3333. Irrational numbers do not include integers or fractions. Although Irrational numbers are the only group that is classified with numbers that can have a decimal value that can continue for however long with no specific pattern unlike rational numbers. An example of an irrational number could be pi. Pi which we usually just round to 3.14 is actually 3.1415926535897932384626433832795… and this continues on for trillions of digits. And last comes Real numbers which include natural numbers, whole numbers, integers, rational number...
There are many people that contributed to the discovery of irrational numbers. Some of these people include Hippasus of Metapontum, Leonard Euler, Archimedes, and Phidias. Hippasus found the √2. Leonard Euler found the number e. Archimedes found Π. Phidias found the golden ratio. Hippasus found the first irrational number of √2. In the 5th century, he was trying to find the length of the sides of a pentagon. He successfully found the irrational number when he found the hypotenuse of an isosceles right triangle. He is thought to have found this magnificent finding at sea. However, his work is often discounted or not recognized because he was supposedly thrown overboard by fellow shipmates. His work contradicted the Pythagorean mathematics that was already in place. The fundamentals of the Pythagorean mathematics was that number and geometry were not able to be separated (Irrational Number, 2014).
The 17th Century saw Napier, Briggs and others greatly extend the power of mathematics as a calculator science with his discovery of logarithms. Cavalieri made progress towards the calculus with his infinitesimal methods and Descartes added the power of algebraic methods to geometry. Euclid, who lived around 300 BC in Alexandria, first stated his five postulates in his book The Elements that forms the base for all of his later Abu Abd-Allah ibn Musa al’Khwarizmi, was born abo...
By 1904 Ramanujan had begun to undertake deep research. He investigated the series (1/n) and calculated Euler's constant to 15 decimal places. He began to study the numbers, which is entirely his own independent discovery.