Spell numbers until you find the letter A STORY CONTINUES BELOW THESE SALTWIRE VIDEOS If you were to spell out the numbers in full, (one, two, three, etc.), how far would you have to go until you found the letter “A”? The answer is one thousand. Unless you live in the U.K.
- Where 101 = one hundred and one.
- How long will it take for 33 cats to eat 66 rats? Three fat cats can eat three fat cats in three minutes.
- Or, one fat cat can eat 3 x 3/3 = 3 fat cats in one minute.
- Or, 33 fat cats can eat 66 fat rats in 66 x 3/33 = 6 minutes.
- Consequently, 33 fat cats will eat 66 fat rats in six minutes.
*** Can you make number sentences for each of the numbers 0 through 16 by using four 4’s and any operations or functions of your choice? Here is one possible solution.0 = (4 – 4) x 44 9 = 4 + 4 + 4/4 1 = 4/4 x 4/4 10 = (44 – 4) + 4/4 2 = 4/4 + 4/4 11 = (44 divided by sq.
rt.4) divided by sq. rt.4.3 = (4 + 4 + 4)/4 12 = (44 + 4)/4 4 = (4 – 4)/4 + 4 13 = 44/4 + sq. rt.4 5 = (4 x 4 + 4)/4 14 = 4 + 4 + 4 +sq. rt.4 6 = (4 + 4)/4 + 4 15 = 4 x 4 – 4/4 7 = 44/4 – 4 16 = 4 = 4 = 4 = 4 8 = 4 + 4 + 4 – 4 *** Two squirrels, A and B, are talking about another squirrel, C. Squirrel A: Getting ready for winter is really hard! I just gathered another acorn.
Squirrel B: I’m a slow worker, so I am doing what I did last year and collecting one acorn per day. I got today’s already. Squirrel A: Did you hear how many acorns C has now? Squirrel B: Yes, he has the product of how many I had yesterday, today, and will have tomorrow after I have gathered that day’s acorn.
- Squirrel A: Anyone who has that many acorns must be a hard worker.
- I heard he has the product of my and your current acorn quantities plus their sum.
- If both squirrels were correct in their statements, how many acorns does each squirrel have (assume that each squirrel has a whole number of acorns)? *** “I’ve always been 45 years older than your dad,” said Grandma to her young grandson.
“But now the two digits in my age, both prime, are the reverse of the two in your dad’s age”. How old is Grandma? *** Said Angus to Bubba, “The last time we met, our ages were both prime numbers, and when I was one-quarter of the age I am now, you were that age plus half the age your father would have been 30 years previous to when he was six times the age you would have been when I was half your age”.
- 0.1 What number from 1 to 100 has the letter A in it?
- 0.2 How many times does the letter A appear from 0 to 100?
- 0.3 Is the number 4 the letter A?
- 0.4 What number instead of letter A?
- 0.5 Should I answer 888 numbers?
- 0.6 Why is 1 not a number?
- 1 What letter is Q?
- 2 How long does it take to count from 1 to 100?
- 3 What is alphabet A to Z?
- 4 Which digit does the letter A represent?
- 5 What is the only number to have the letter A from 0 to 1000?
What number contains the letter A?
Morning Start: All numbers before 1,000 don’t contain the letter A 640″> Your morning start for Tuesday, February 1 2022 Happy Tuesday! Let’s get your morning going with the morning start!
- Fun Fact: If you were to spell out every number from 1-999, not one contains the letter ‘A’.
- ‘A’ is the second most commonly-used letter, yet one thousand (1,000) is the first number spelt out that has the first A in it.
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Sign up for a free account today, and receive top headlines in your inbox Monday to Saturday. : Morning Start: All numbers before 1,000 don’t contain the letter A
What number from 1 to 100 has the letter A in it?
A, B, C, D in Numbers Letters A, B, C and D do not appear anywhere in the spellings from 1 to 99 (one, two, ninety-nine), while letter D comes for the first time in 100 (hundred). Letters A, B and C do not appear anywhere in the spellings from 1 to 999, while letter A comes for the first time in 1000 (thousand).
Does any number start with a?
Is there a number with the letter A? Not a single one contains an A! Finally, once you get to 1,000, it finally makes an appearance: one thousAnd. ‘A’ might not show up in any numbers smaller than four digits, but it is the most common letter—by far—that appears in U.S. state names.
How many times does the letter A appear from 0 to 100?
How many times does the letter ‘a’ appear from 0-100? zero. if you are asking, when spelling out the numbers from one (0) to one hundred (100), how many times does the letter ‘a’ appear, the answer is zero.
Is the number 4 the letter A?
For instance, number ‘4’ can be used instead of letter ‘A’, number ‘8’ can be used as letter ‘B’ or lowercase ‘g’, 7 can be used as letter ‘T’, 5 can be used as letter ‘S’ and 1 can be used as letter ‘I’ according to their shape resembles to the letters.
What number instead of letter A?
#4 – The number ‘4’ is a useful alternative for the letter ‘A’. If you want to show off your speed with the number plate ‘FAST’ change it to ‘F45T’. You can also use the number ‘4’ phonetically. Such as, if you want to spell the word ‘for’, you could use it. For example, in the case of ‘4 YOU’.
Is there no letter A in numbers 1 999?
There are no numbers with the letter ‘a’ in them up until 1,000. One, two, three, four, five, six, seven, eight, nine, ten. Eleven, twelve, thirteen, fourteen, fifteen, sixteen, seventeen, eighteen, nineteen. Twenty, thirty, fourty, fifty, sixty, seventy, eighty, ninety, hundred.
Do you use a or an with 100?
The correct pronunciation is ‘ a hundred ‘ because the ‘h’ in hundred is pronounced clearly. The determination between ‘a’ and ‘an’ is by sound not by letter. You are right on both counts: ‘He gave me a $100 bill.’
How do you write 9 00 999 in words?
Therefore, 999 in words is written as Nine Hundred Ninety-nine.
Should I answer 888 numbers?
FAQ – Here are the answers to some of the most common questions about scam phone numbers.
- How can I check if a phone number is a scam?
- Search the phone number you suspect is a scam on Google. If anyone has reported it to a website that tracks scams, it should show up in Google’s results.
- What numbers should I not answer?
- You should only answer phone numbers you know. Scammers learn from their mistakes and tend to evolve with the times. Although there are scam area codes to watch for, which are listed above, scammers now use phone number spoofing to make it look like they’re calling from your local area.
- If you don’t know a phone number, let the call go to voicemail and research the number before you call it back. And if they leave a voicemail claiming to be someone you know or a company you do business with, call back at the number you have for the other person or company, not the number that left the voicemail.
- How can you tell when it’s a scammer number?
- A scammer number is one you don’t recognize in your caller ID. Some mobile devices alert you with a “scam likely” notification. Even if you don’t have that option, it’s good to be able to recognize popular scam phone numbers by the area code. Here are some to know:
- A scammer number is one you don’t recognize in your caller ID. Some mobile devices alert you with a “scam likely” notification. Even if you don’t have that option, it’s good to be able to recognize popular scam phone numbers by the area code. Here are some to know:
- Should I answer 888 numbers?
888 numbers indicate it is a toll-free call. Calls made to toll-free numbers are paid for by the recipient rather than the caller, making them particularly popular among call centers and other businesses. An 888 area code doesn’t necessarily indicate that it’s a scam, but will most likely be a robocall so answer at your own discretion.
- What is the scam block number?
Depending on your provider, there are several ways to protect yourself from scams. For example, T-Mobile offers a scam blocker where you can download the free Scam Shield app and toggle it on to prevent scam calls.
Caitlyn Moorhead contributed to the reporting for this article.
Is there a number before 0?
Difference between Whole Numbers and Natural numbers –
|Whole Numbers||Natural Numbers|
|Whole numbers include all natural numbers and zero.||Natural numbers are generally used for counting objects or things.|
|The set of whole numbers is, W =,||The set of natural numbers is, N =,|
|The smallest whole number is 0.||The smallest natural number is 1.|
From these differences, we can easily deduce that every whole number other than 0 is a natural number. We can say that the set of natural numbers is a subset of whole numbers.
Why is 1 not a number?
Sign up for Scientific American ’s free newsletters. ” data-newsletterpromo_article-image=”https://static.scientificamerican.com/sciam/cache/file/4641809D-B8F1-41A3-9E5A87C21ADB2FD8_source.png” data-newsletterpromo_article-button-text=”Sign Up” data-newsletterpromo_article-button-link=”https://www.scientificamerican.com/page/newsletter-sign-up/?origincode=2018_sciam_ArticlePromo_NewsletterSignUp” name=”articleBody” itemprop=”articleBody”> An engineer friend of mine recently surprised me by saying he wasn’t sure whether the number 1 was prime or not. I was surprised because among mathematicians, 1 is universally regarded as non-prime. The confusion begins with this definition a person might give of “prime”: a prime number is a positive whole number that is only divisible by 1 and itself, The number 1 is divisible by 1, and it’s divisible by itself. But itself and 1 are not two distinct factors. Is 1 prime or not? When I write the definition of prime in an article, I try to remove that ambiguity by saying a prime number has exactly two distinct factors, 1 and itself, or that a prime is a whole number greater than 1 that is only divisible by 1 and itself. But why go to those lengths to exclude 1? My mathematical training taught me that the good reason for 1 not being considered prime is the fundamental theorem of arithmetic, which states that every number can be written as a product of primes in exactly one way. If 1 were prime, we would lose that uniqueness. We could write 2 as 1×2, or 1×1×2, or 1 594827 ×2. Excluding 1 from the primes smooths that out. My original plan of how this article would go was that I would explain the fundamental theorem of arithmetic and be done with it. But it’s really not so hard to modify the statement of the fundamental theorem of arithmetic to address the 1 problem, and after all, my friend’s question piqued my curiosity: how did mathematicians coalesce on this definition of prime? A cursory glance around some Wikipedia pages related to number theory turns up the assertion that 1 used to be considered prime but isn’t anymore. But a paper by Chris Caldwell and Yeng Xiong shows the history of the concept is a bit more complicated. I appreciated this sentiment from the beginning of their article: “First, whether or not a number (especially unity) is a prime is a matter of definition, so a matter of choice, context and tradition, not a matter of proof. Yet definitions are not made at random; these choices are bound by our usage of mathematics and, especially in this case, by our notation.” Caldwell and Xiong start with classical Greek mathematicians. They did not consider 1 to be a number in the same way that 2, 3, 4, and so on are numbers.1 was considered a unit, and a number was composed of multiple units. For that reason, 1 couldn’t have been prime — it wasn’t even a number. Ninth-century Arab mathematician al-Kindī wrote that it was not a number and therefore not even or odd. The view that 1 was the building block for all numbers but not a number itself lasted for centuries. In 1585, Flemish mathematician Simon Stevin pointed out that when doing arithmetic in base 10, there is no difference between the digit 1 and any other digits. For all intents and purposes, 1 behaves the way any other magnitude does. Though it was not immediate, this observation eventually led mathematicians to treat 1 as a number, just like any other number. Through the end of the 19th century, some impressive mathematicians considered 1 prime, and some did not. As far as I can tell, it was not a matter that caused strife; for the most popular mathematical questions, the distinction was not terribly important. Caldwell and Xiong cite G.H. Hardy as the last major mathematician to consider 1 to be prime. (He explicitly included it as a prime in the first six editions of A Course in Pure Mathematics, which were published between 1908 and 1933. He updated the definition in 1938 to make 2 the smallest prime.) The article mentions but does not delve into some of the changes in mathematics that helped solidify the definition of prime and excluding 1. Specifically, one important change was the development of sets of numbers beyond the integers that behave somewhat like integers. In the very most basic example, we can ask whether the number -2 is prime. The question may seem nonsensical, but it can motivate us to put into words the unique role of 1 in the whole numbers. The most unusual aspect of 1 in the whole numbers is that it has a multiplicative inverse that is also an integer. (A multiplicative inverse of the number x is a number that when multiplied by x gives 1. The number 2 has a multiplicative inverse in the set of the rational or real numbers, 1/2: 1/2×2=1, but 1/2 is not an integer.) The number 1 happens to be its own multiplicative inverse. No other positive integer has a multiplicative inverse within the set of integers.* The property of having a multiplicative inverse is called being a unit, The number -1 is also a unit within the set of integers: again, it is its own multiplicative inverse. We don’t consider units to be either prime or composite because you can multiply them by certain other units without changing much. We can then think of the number -2 as not so different from 2; from the point of view of multiplication, -2 is just 2 times a unit. If 2 is prime, -2 should be as well. I assiduously avoided defining prime in the previous paragraph because of an unfortunate fact about the definition of prime when it comes to these larger sets of numbers: it is wrong! Well, it’s not wrong, but it is a bit counterintuitive, and if I were the queen of number theory, I would not have chosen for the term to have the definition it does. In the positive whole numbers, each prime number p has two properties: The number p cannot be written as the product of two whole numbers, neither of which is a unit. Whenever a product m × n is divisible by p, then m or n must be divisible by p, (To check out what this property means on an example, imagine that m =10, n =6, and p =3.) The first of these properties is what we might think of as a way to characterize prime numbers, but unfortunately the term for that property is irreducible, The second property is called prime, In the case of positive integers, of course, the same numbers satisfy both properties. But that isn’t true for every interesting set of numbers. As an example, let’s look at the set of numbers of the form a + b √-5, or a +i b √5, where a and b are both integers and i is the square root of -1. If you multiply the numbers 1+√-5 and 1-√-5, you get 6. Of course, you also get 6 if you multiply 2 and 3, which are in this set of numbers as well, with b=0. Each of the numbers 2, 3, 1+√-5, and 1-√-5 cannot be broken down further and written as the product of numbers that are not units. (If you don’t take my word for it, it’s not too difficult to convince yourself.) But the product (1+√-5)(1-√-5) is divisible by 2, and 2 does not divide either 1+√-5 or 1-√-5. (Once again, you can prove it to yourself if you don’t believe me.) So 2 is irreducible, but it is not prime. In this set of numbers, 6 can be factored into irreducible numbers in two different ways. The number set above, which mathematicians might call Z (pronounced “zee adjoin the square root of negative five” or “zed adjoin the square root of negative five, pip pip, cheerio” depending on what you like to call the last letter of the alphabet), has two units, 1 and -1. But there are similar number sets that have an infinite number of units. As sets like this became objects of study, it makes sense that the definitions of unit, irreducible, and prime would need to be carefully delineated. In particular, if there are number sets with an infinite number of units, it gets more difficult to figure out what we mean by unique factorization of numbers unless we clarify that units cannot be prime. While I am not a math historian or a number theorist and would love to read more about exactly how this process took place before speculating further, I think this is one development Caldwell and Xiong allude to that motivated the exclusion of 1 from the primes. As happens so often, my initial neat and tidy answer for why things are the way they are ended up being only part of the story. Thanks to my friend for asking the question and helping me learn more about the messy history of primality. *This sentence was edited after publication to clarify that no other positive integer has a multiplicative inverse that is also an integer. The views expressed are those of the author(s) and are not necessarily those of Scientific American.
What letter is Q?
q, seventeenth letter of the modern alphabet, It corresponds to Semitic koph, which may derive from an earlier sign representing the eye of a needle, and to Greek koppa, The form of the majuscule has been practically identical throughout its known history.
- In the form found on the Moabite stone, the vertical stroke extended to the top of the loop, and the same is the case with an early form from the island of Thera,
- The Etruscan form was identical with the Greek,
- The Latin alphabet had two forms, the latter of which resembled the modern Q,
- In the minuscule form the stroke was moved to the right side of the letter because of the speed of writing,
This produced a cursive form similar to the modern q in the 6th century ce, Uncial writing also had a form similar to q, and the Carolingian form was practically identical. In Semitic the sound represented by the letter was an unvoiced guttural pronounced farther back than that represented by the letter kaph,
In Greek the letter was largely redundant, and in the eastern alphabet it was entirely superseded by kappa ( Κ ). In the Chalcidian alphabet, however, it lingered and spread from there, probably through the Etruscan, into the Latin alphabet, where it was used only with a following u, the combination representing the unvoiced labiovelar sound in such words as quaestor,
The combination of these two letters holds to the present day, and in modern English q is not used unless followed by u, even if, in words such as oblique, the sound is a simple velar and not a labiovelar. The most usual position of the sound is initial in words such as queen and quick,
How long does it take to count from 1 to 100?
25 seconds to count to 100, but 100 Years to count to a Billion.
What number is n?
Letters in the alphabet:
What is alphabet A to Z?
Five of the letters in the English Alphabet are vowels: A, E, I, O, U. The remaining 21 letters are consonants: B, C, D, F, G, H, J, K, L, M, N, P, Q, R, S, T, V, X, Z, and usually W and Y. Written English includes the digraphs: ch ci ck gh ng ph qu rh sc sh th ti wh wr zh. These are not considered separate letters of the alphabet. Two letters, “A” and “I,” also constitute words. Until fairly recently (until 1835), the 27th letter of the alphabet (right after “z”) was the ampersand (&). The English Alphabet is based on the Latin script, which is the basic set of letters common to the various alphabets originating from the classical Latin alphabet.
What letter is a 0?
From Wikipedia, the free encyclopedia This article is about the letter of the alphabet. For the number zero, see 0, For other uses, see O (disambiguation),
|Writing system||Latin script|
|Language of origin||Latin language|
|Unicode codepoint||U+004F, U+006F|
|Time period||~-700 to present|
|Descendants||• Ö • ⱺ • Ø • Œ • Ɔ • Ơ • Ỏ • Ꝋ • ∅ • º • ℅|
|Sisters||ᴥ Ƹ ʿ Ө ע ع ܥ ࠏ ዐ ࡘ ჺ Ո ո Օ օ ᱳ ᱜ ᱣ|
|Other letters commonly used with||o(x)|
|This article contains phonetic transcriptions in the International Phonetic Alphabet (IPA), For an introductory guide on IPA symbols, see Help:IPA, For the distinction between, / / and ⟨ ⟩, see IPA § Brackets and transcription delimiters,|
O, or o, is the fifteenth letter and the fourth vowel letter in the Latin alphabet, used in the modern English alphabet, the alphabets of other western European languages and others worldwide. Its name in English is o (pronounced ), plural oes,
What number looks like Z?
How Numbers Replace Letters on Number Plates Newsfeed You’ll see many custom number plates, and at times find it difficult to understand what they are meant to say. We’ve decided to make you a list of numbers below, so you know which numbers represent which letters of the alphabet. #1 Nice and easy to begin with and used on show plates or custom number plates to represent the letter ‘I’, or at times when creating the letter ‘L’ is not possible, again the ‘1’ may be used again.
- However, certain plates the ‘1’ will want to be actually read as ‘1’.
- Examples could be a number plate like ‘F1’ #2 Now what do number 2’s look like? No it’s not when you go to the bathroom.
- The number ‘2’ is the closest letter resembling the letter ‘Z’ which many countries don’t use in certain combinations of their,
So if you want a ‘Z’ in your custom number plates, use a number ‘2’! #3 A Number ‘3’ on a number plate is basically the reverse of the letter ‘E’. You will see many number plates using a ‘3’ so try replacing this with an ‘E’ and see if you can figure out what it is trying to read.
- The number ‘4’ is a favourite number for those who want an ‘A’ look alike on their number plates.
This number will be a pretty obvious resemblance to a letter ‘S’. If you can’t get an ‘S’ on your dream number plate, check to see if ‘5’ is possible as an alternative. #6 The number ‘6’ is the number most use as the letter ‘G’. Simply because it looks like a ‘G’ in most countries font styles.
- Apart from being used as a number and number alone, maybe for lucky reasons? Other than a lucky ‘7’, this number could be used as a letter ‘T’
We have two possible letters which ‘8’ could replace. Either the letter ‘O’ or ‘B’. #9 The number ‘9’ can be used as a ‘g’, yes that’s write, a lower case ‘g’, Now that’s the 1 – 9 list of what numbers you could use on your as letters! We will have some combination numbers for you to make up other letter look a likes very soon.
What letter looks like a 1?
Problem: The English language uses the Latin alphabet with 26 letters and a numeric system with 10 numerals. These alphanumeric symbols (letters and numerals) work well most of the time when used to communicate information. However, problems may arise during written or electronic communication because of similarities in appearance of the alphanumeric symbols we use.
Which digit does the letter A represent?
Answer (Detailed Solution Below) 1 – EXPLANATION:
F + F = F. This is only possible when F = 0. Also, A can only be 1(in the second column) because to get a carry of more than 1, B has to be a double-digit number which is not possible. So the data can be tabulated as follows:
Now in 4th column H + H = F and F = 0, ∴ H + H = 10 since a carry 1 has gone to the 3rd column. Hence H = 5 Since the third column in the last row is 0, the carry to the second column must have been 1. ∴ 8 + 1 + 1 = 11 ⇒ B = 9. C can not be 1 since A = 1 so G + K must be greater than 10 and the carry 1 goes to the next column, so C = 1 + 1 = 2.
G + K = 1 so we can say the unit digit of G + K will be 1. ∴ G and K have to be 3 and 8 or 4 and 7. Additional Information (G and K can not be 5 and 6 because already H = 5) From 5th column G = J + 1 ⇒ J = G – 1 Case 1 : G = 3 and K = 8, here J = 2 which is not possible as C = 2 Case 2: G = 8 and K = 3, J = 7, it is possible case. Case 3: G = 4 and K = 7, J = 3 it is possible Case 4: G = 7 and K = 4, J = 6 it is possible Hence the cases can be tabulated as follows:
letter A represents 1, Stay updated with the Logical Reasoning questions & answers with Testbook. Know more about Data Sufficiency and ace the concept of Coding Decoding.
What is the only number to have the letter A from 0 to 1000?
20 Cool Facts About Maths – Maths-Whizz If you were to play a word association game with a school-aged child, you’d be pretty unlikely to get a response of ‘cool’ when you asked them what word first came into their mind when you said ‘maths’. Despite what some people may tell you, maths is far from dull.
On the contrary, there are plenty of fun and strange maths-related facts out there that will fascinate children of all ages. To prove this, we’ve compiled a list of 20 cool facts about maths which we encourage you to share with the children in your life.1. The word “hundred” comes from the old Norse term, “hundrath”, which actually means 120 and not 100.2.
In a room of 23 people there’s a 50% chance that two people have the same birthday. 3. Most mathematical symbols weren’t invented until the 16th century. Before that, equations were written in words.4. “Forty” is the only number that is spelt with letters arranged in alphabetical order. 5. Conversely, “one” is the only number that is spelt with letters arranged in descending order.6. From 0 to 1000, the only number that has the letter “a” in it is “one thousand”.7. ‘Four’ is the only number in the English language that is spelt with the same number of letters as the number itself.8.
- Every odd number has an “e” in it.9.
- The reason Americans call mathematics “math”, is because they argue that “mathematics” functions as a singular noun so ‘math’ should be singular too.10.
- Markings on animal bones indicate that humans have been doing maths since around 30,000BC.11.
- Eleven plus two” is an anagram of “twelve plus one” which is pretty fitting as the answer to both equations is 13.12.
Also, there are 13 letters in both “eleven plus two” and “twelve plus one”.13. Zero is not represented in Roman numerals.14. The word “mathematics” only appears in one Shakespearean play, “The Taming of the Shrew”. 15, -40 °C is equal to -40 °F.16. In France, a pie chart is sometimes referred to as a “camembert”.17. The symbol for division (i.e.÷) is called an obelus.18.2 and 5 are the only prime numbers that end in 2 or 5.19. A ‘jiffy’ is an actual unit of time. It means 1/100th of a second.20. Wow, after hearing those facts about maths, we’re positive that the young person in your life will no longer think that the subject is ‘uncool.’ That said, if you’re looking for an additional tool to help your child engage with maths, you should check out our multi-award-winning online maths tutor, Maths-Whizz.
- With its and personalised lessons, it has been found that students who use Maths-Whizz for 60 minutes a week increase their Maths Age™ by, on average, 18 months in their first year of use.* To find out more, book a free consultation today.
- Research by Whizz Education — conducted with over 12,000 students and verified by independent experts — demonstrates that children who learn with the Maths-Whizz Tutor for 45-60 minutes a week increase their Maths Age by an average of 18 months in their first year.
: 20 Cool Facts About Maths – Maths-Whizz
What is 1000000 in word?
Hence, 1000000 in words is One Million.
What is the 27th letter of the alphabet?
It’s true. Our modern, English alphabet, used to have 27 letters! Do you know what the 27th letter was? et. “Et” was the 27th letter of the alphabet. And actually, you can still find it on your keyboard! “&” Now most people call this character an “ampersand” or simply “and”, but this character was actually considered a letter! Et is the Latin word for and. two depictions of the evolution of the ampersand It even had its own place at the end of the alphabet. The phrase “and, per se, and” was added after the letter z. This partially English/partially Latin phrase means “and, by itself, and.” However, this poor phrase soon became subject to “rebracketing”.
Rebracketing occurs when a phrase is slurred together to form a new word. A prime example of this is the English word “Alligator”. Originally, we got this word from the spanish word(s): el lagarto, We eventually slurred this word so much el legarto ellagarto allagarto alligarto alligator that we got our word, Alligator.
This progression also occurred and gave us the particle ‘an’. ‘An’ is the form of ‘a’ used before a word beginning in a vowel. However, it wasn’t always a correct particle. It is commonly believed that ‘aprons’ were once called ‘naprons’ as they were held using a string that draped over one’s nape (back of the neck).
Over time, the phrase ‘a napron’ was rebracketed as ‘an apron’ and this particle came into being. In &’s case, the phrase and, per se, and, was gradually reduced to ‘andperseand’, ‘an’pers’and’ and finally ‘ampersand’. Now-a-days, the ampersand is a character used for aesthetic in various logos and names.
Unfortunately, it no longer holds it position as the 27th letter of the English alphabet. Fun fact: “&c” used to be the way to write “etc” or “et cetera” which means ‘and the rest’. http://blog.dictionary.com/ampersand/ http://www.webdesignerdepot.com/2010/01/the-history-of-the-ampersand-and-showcase/