Difference between revisions of "2687: Division Notation"
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The fifth notation is the way division is written in science: the dividend on the top line over the divisor on the bottom under a horizontal line. This is the closest format to how a {{w|Fraction|fraction}} would be written. It has the advantage of clearly separating the numerator and denominator when they are longer expressions, such as polynomials, without needing to add parentheses. This format is mostly used in written and professionally typeset math, as it can't be typed without something like {{w|MathML}}, {{w|LaTeX}} or HTML tables. | The fifth notation is the way division is written in science: the dividend on the top line over the divisor on the bottom under a horizontal line. This is the closest format to how a {{w|Fraction|fraction}} would be written. It has the advantage of clearly separating the numerator and denominator when they are longer expressions, such as polynomials, without needing to add parentheses. This format is mostly used in written and professionally typeset math, as it can't be typed without something like {{w|MathML}}, {{w|LaTeX}} or HTML tables. | ||
− | The sixth notation uses a negative exponent. The exponent -1 is equivalent to reciprocation. It can be used to keep the entire expression on one line. Note that ab<sup>-1</sup> is equal to <sup>a</sup>/<sub>b</sub>. | + | The sixth notation uses a negative exponent. The exponent -1 is equivalent to {{w|Multiplicative inverse|reciprocation}}. It can be used to keep the entire expression on one line. Note that ab<sup>-1</sup> is equal to <sup>a</sup>/<sub>b</sub>. |
The final form of notation declares a function. The writer defines a new function, F, that takes in the parameters A and B, before listing out the function's definition (trailing off in increasingly smaller text). Randall warns the reader they should escape while they still can, because both the function itself and the math environment as a whole are going to get relatively tedious. Integer division can be defined in terms of multiplicative inequalities and the remainder, or modulo ('%' in Python), operator. This situation is likely to occur in abstract algebra, where one might have to define what "division" means for two elements of a mathematical object such as a group, ring, or magma. One example would be an object G, such that, for two elements A and B of G, "A divided by B" is defined as an element C such that CB=A, or alternatively as an element C such that BC=A. These definitions will differ if multiplication in G is not commutative. Furthermore, if such a C is not unique, the function F(A,B) will need to include a method to select a unique value for "A divided by B" for each A and B. Thus, the F(A,B) in the comic might not even refer to a uniquely defined operation, but simply to the property of a function F(A,B) that is a valid division operation on G, given some definition of division. | The final form of notation declares a function. The writer defines a new function, F, that takes in the parameters A and B, before listing out the function's definition (trailing off in increasingly smaller text). Randall warns the reader they should escape while they still can, because both the function itself and the math environment as a whole are going to get relatively tedious. Integer division can be defined in terms of multiplicative inequalities and the remainder, or modulo ('%' in Python), operator. This situation is likely to occur in abstract algebra, where one might have to define what "division" means for two elements of a mathematical object such as a group, ring, or magma. One example would be an object G, such that, for two elements A and B of G, "A divided by B" is defined as an element C such that CB=A, or alternatively as an element C such that BC=A. These definitions will differ if multiplication in G is not commutative. Furthermore, if such a C is not unique, the function F(A,B) will need to include a method to select a unique value for "A divided by B" for each A and B. Thus, the F(A,B) in the comic might not even refer to a uniquely defined operation, but simply to the property of a function F(A,B) that is a valid division operation on G, given some definition of division. |
Revision as of 10:29, 20 October 2022
Explanation
This explanation may be incomplete or incorrect: Created by a GROUP OF SCHOOLCHILDREN DIVIDED AMONGST THEMSELVES. Do NOT delete this tazg too soon. If you can address this issue, please edit the page! Thanks. |
This comic pokes fun at some of the ways to write the division operation in math. In this comic, Randall has used A as the dividend (the number being divided) and B as the divisor (the number that A is divided by). Division is the fourth simplest arithmetic operation in mathematics, after addition, subtraction, and multiplication.[1]
The first two of the seven notations shown are the division sign (÷) and the radix used for short division and long division in beginning arithmetic. (Note: the short/long division radix is only used in some countries, and there are different notations in the non-English speaking world). These methods of division are often used by school children because the ÷ sign is what most people use when first learning division, and the short division radix is usually the first algorithm learned for dividing arbitrary dividends, typically starting with the easier abbreviated short division form.
The expression on the third line, A/B, is the way division is usually written in software code. The four simple arithmetic operations in programming usually are +, -, *, /. This one was missing in the first version of the comic. This is most commonly seen in regular mathematics as it somewhat saves space, and is easy to type with the slash key. Additionally, it uses standard ASCII characters instead of extended charsets, which would have helped to establish its traditional usage.
The expression on the forth line, a/b, is how division is usually written when typography costs are not in question, in fraction notation. The Unicode character sets provide some specific fractions such as ⅓ as well as some superscript and subscript characters, so someone familiar with it might use it to write fractions such as ²²⁄₇. But this is tedious and can't be used on more complex expressions, so it is rarely used in everyday life (the fraction A/B cannot be written this way; there is a superscript A, but no subscript B).
The fifth notation is the way division is written in science: the dividend on the top line over the divisor on the bottom under a horizontal line. This is the closest format to how a fraction would be written. It has the advantage of clearly separating the numerator and denominator when they are longer expressions, such as polynomials, without needing to add parentheses. This format is mostly used in written and professionally typeset math, as it can't be typed without something like MathML, LaTeX or HTML tables.
The sixth notation uses a negative exponent. The exponent -1 is equivalent to reciprocation. It can be used to keep the entire expression on one line. Note that ab-1 is equal to a/b.
The final form of notation declares a function. The writer defines a new function, F, that takes in the parameters A and B, before listing out the function's definition (trailing off in increasingly smaller text). Randall warns the reader they should escape while they still can, because both the function itself and the math environment as a whole are going to get relatively tedious. Integer division can be defined in terms of multiplicative inequalities and the remainder, or modulo ('%' in Python), operator. This situation is likely to occur in abstract algebra, where one might have to define what "division" means for two elements of a mathematical object such as a group, ring, or magma. One example would be an object G, such that, for two elements A and B of G, "A divided by B" is defined as an element C such that CB=A, or alternatively as an element C such that BC=A. These definitions will differ if multiplication in G is not commutative. Furthermore, if such a C is not unique, the function F(A,B) will need to include a method to select a unique value for "A divided by B" for each A and B. Thus, the F(A,B) in the comic might not even refer to a uniquely defined operation, but simply to the property of a function F(A,B) that is a valid division operation on G, given some definition of division.
Transcript
This transcript is incomplete. Please help editing it! Thanks. |
- Division notation
- A÷B
- B⟌A Schoolchild.
- A/B Software engineer.
- A⁄B Normal person or Unicode enthusiast.
- A over B Scientist.
- AB-1 Fancy scientist.
- F(A, B) such that F(G)= (text getting smaller) Oh no, run
Discussion
Fun fact: In Poland, we don't write the long division like that; we just write A:B with the bar above. I was VERY confused the first time I saw that notation. 172.70.246.235 21:03, 19 October 2022 (UTC)
- Unrelated to Polish notation, i presume? 172.70.134.13 22:43, 19 October 2022 (UTC)Bumpf
- Unrelated. Never used Polish notation in school. 172.71.160.23 10:25, 20 October 2022 (UTC)
- In German elementary school we learned the a:b notation. When we learned more complex divisions in secondary school it was with the "scientist" notation. And as I am a software engineer AND (presumably) a normal person I use in general the respective notations. Elektrizikekswerk (talk) 07:24, 20 October 2022 (UTC)
For me, the version on the xkcd website has an additional line ("A/B: Software Engineer") that's not on this site. I think the comic might have been updated. Is anyone else seeing that? JBYoshi (talk) 23:20, 19 October 2022 (UTC)
For the Unicode one, I think it’s a reference to ⁄ (U+2044, fraction slash) or characters like ½, ¼, etc. - Cherryblossom (talk) 00:24, 20 October 2022 (UTC)
Is it important to note that 1/2 auctocorrects to ½ in many text-based programs like Microsoft Word?--Theunlucky (talk) 02:32, 20 October 2022 (UTC)
It's possible to use fraction-style notation in LaTeX by using \frac, or am I missing something?--162.158.2.125 05:49, 20 October 2022 (UTC)
"the long division symbol is only used in some countries". Only English-speaking ones, to be more precise. Most of the countries of the world use a different notation. 172.68.51.80 06:19, 20 October 2022 (UTC)
In the UK, the 'long division symbol' is nowadays often referred to (particularly with Primary classes, children aged 4 - 11) as the "Bus Stop Method". Because it looks like a UK bus shelter. MarquisOfCarrabass (talk) 07:07, 20 October 2022 (UTC)
- I always used (still use, on the rare occasions that I do it) the notation inverted - B)_A - so that the answer is output beneath the problem, which makes more sense to me, given that we generally read down the page. I guess that would be a vandalised bus stop?172.70.162.147 09:16, 20 October 2022 (UTC)
- When doing long-division, the intermediary sums (the calculated 'integer remainders' subtractions of progressively high-to-low powers of ten) would be done below in the 'standard' long-multiplication/addig/subtraction direction. The answer-figure is progressively created by the 'carry'-inverse to these more normal-looking arithmatic. Or so I surmise. Haven't used long-division, much, in 40 years or so (except in a polynomial-factoring thing, occasionally, using an extended version of the principle upon powers-of-whatever) so I might have the wrong-idea as to why the answer goes high (in that the non-answer that nevertheless leads to the answer goes low). ;) 162.158.159.29 16:17, 20 October 2022 (UTC)
- For me, the remainders go in small figures above the next integer, so that they basically form a new number to divide.172.70.86.48 08:27, 24 October 2022 (UTC)
- When doing long-division, the intermediary sums (the calculated 'integer remainders' subtractions of progressively high-to-low powers of ten) would be done below in the 'standard' long-multiplication/addig/subtraction direction. The answer-figure is progressively created by the 'carry'-inverse to these more normal-looking arithmatic. Or so I surmise. Haven't used long-division, much, in 40 years or so (except in a polynomial-factoring thing, occasionally, using an extended version of the principle upon powers-of-whatever) so I might have the wrong-idea as to why the answer goes high (in that the non-answer that nevertheless leads to the answer goes low). ;) 162.158.159.29 16:17, 20 October 2022 (UTC)
As a Dutch primary schoolchild, I have used a÷b for calculations and "a over b" for fractions (e.g. ⅘). For more difficult divisions, like what is 785/35, we used Staartdelingen (nl), long division, of which the primary notation is 35/735\. I think in early highschool we started using a over b for more complex calculations, "like (x+3) over 5 = 2, what is x". I had up to this XKCD never seen B⟌A, and would confuse it for what we use as square root symbol (√). IIVQ (talk) 07:16, 20 October 2022 (UTC)
- Come to think of it, it's kind of odd that we used ":" for division. Why are there this many different division notations anyway? Same for multiplication. There's x, *, ⋅, x but centered vertically, and concatenation (for letter variables)!
- The : operator is for ratios, where a:b could be a/b or b/a, but also metaphors, where a:b::c:d means a is to b as c is to d. 162.158.166.73 09:05, 20 October 2022 (UTC)
In Austria, school children are using the "scientist" notation from this comic. 172.68.50.51 08:17, 20 October 2022 (UTC)
- Same thing in Russia 172.71.98.97 08:46, 20 October 2022 (UTC)
I live in Denmark, and “÷” seems to be often used here for subtraction, instead of a minus sign! Got confused a few times. nicolas (talk) 08:52, 20 October 2022 (UTC)
- Also from DK and have often seen ÷ used as % and on my keyboard as I type this there is a ÷ on the number part of the keyboard to the right. But when I push it I get this: "/" In school we used this A:B to mean A/B, just as in Poland as mentioned above. Today I would write 10/2 not 10:2 or 10÷2. But I never used the last version. --Kynde (talk) 19:08, 23 October 2022 (UTC)
- tableau
- tab·leau /ˌtaˈblō/ noun
- a group of models or motionless figures representing a scene from a story or from history; a tableau vivant. "in the first act the action is presented in a series of tableaux"
I don't think it means what the editor including it thinks it means. 172.69.22.185 09:02, 20 October 2022 (UTC)
- "A graphic description or representation" - https://www.merriam-webster.com/dictionary/tableau
- It derives from the idea of 'things set out on a table'. The arrangement of cards in a solitaire game is also called a tableau. 172.70.162.147 09:24, 20 October 2022 (UTC)
- changed to radices. 172.70.206.93 10:18, 20 October 2022 (UTC)
- Well that's not right, is it? - "the pungent usually crisp root of a widely cultivated Eurasian plant (Raphanus sativus) of the mustard family usually eaten raw"... 172.71.178.13 13:22, 20 October 2022 (UTC)
- Naw... A radish is "like, almost 'rad', man, but not quite!", while "radices" are totally cool freezer-food!
- Well that's not right, is it? - "the pungent usually crisp root of a widely cultivated Eurasian plant (Raphanus sativus) of the mustard family usually eaten raw"... 172.71.178.13 13:22, 20 October 2022 (UTC)
- changed to radices. 172.70.206.93 10:18, 20 October 2022 (UTC)
The discussion of matrices and commutative rings is off topic. The comic is clearly about scalars alone. Please! 172.69.134.17 20:46, 20 October 2022 (UTC)
- I thought it seemed on topic given the joke and demographic, but I think it could be presented better. 172.70.110.231 02:07, 21 October 2022 (UTC)
i type it as seen in 2 (counting the 2 schoolchilds as 1) and write it by hand as seen in 3 --an user who has no account yet 172.68.134.21 (talk) 15:05, 2 September 2023 (please sign your comments with ~~~~)