Is the percentage symbol a constant?

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  1. Isn't the percentage symbol actually just a constant with the value $0.01$? As in
    $$
    15% = 15 times % = 15 times 0.01 = 0.15.
    $$


  2. Isn't every unit actually just a constant? But why do we treat them in such a special way then?










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    Right, you can very well see $%$ as a numerical constant, though culturally this would shock many people.
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    – Yves Daoust
    Feb 22 at 13:05






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    It is not a unit of measure; it is only a useful symbol. 15% is $dfrac 15100$. A percentage is a number.
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    – Mauro ALLEGRANZA
    Feb 22 at 13:07







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    I agree completely that % can be considered a real number.
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    – JP McCarthy
    Feb 22 at 13:09






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    Some believe that it's a map $Bbb R to Bbb R^*$ that assigns to $x$ the functional $x%(y)=fracxy100$. Not that they know it, but they rather perceive it. And it becomes apparent when they describe their difficulties.
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    – Saucy O'Path
    Feb 22 at 18:23







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    I would caution you about writing, for example, "$1 + %$", as few people would understand that you mean $1.01$.
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    – Theo Bendit
    Feb 23 at 3:07
















49












$begingroup$


  1. Isn't the percentage symbol actually just a constant with the value $0.01$? As in
    $$
    15% = 15 times % = 15 times 0.01 = 0.15.
    $$


  2. Isn't every unit actually just a constant? But why do we treat them in such a special way then?










share|cite|improve this question











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  • 14




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    Right, you can very well see $%$ as a numerical constant, though culturally this would shock many people.
    $endgroup$
    – Yves Daoust
    Feb 22 at 13:05






  • 3




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    It is not a unit of measure; it is only a useful symbol. 15% is $dfrac 15100$. A percentage is a number.
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    – Mauro ALLEGRANZA
    Feb 22 at 13:07







  • 6




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    I agree completely that % can be considered a real number.
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    – JP McCarthy
    Feb 22 at 13:09






  • 10




    $begingroup$
    Some believe that it's a map $Bbb R to Bbb R^*$ that assigns to $x$ the functional $x%(y)=fracxy100$. Not that they know it, but they rather perceive it. And it becomes apparent when they describe their difficulties.
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    – Saucy O'Path
    Feb 22 at 18:23







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    I would caution you about writing, for example, "$1 + %$", as few people would understand that you mean $1.01$.
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    – Theo Bendit
    Feb 23 at 3:07














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$begingroup$


  1. Isn't the percentage symbol actually just a constant with the value $0.01$? As in
    $$
    15% = 15 times % = 15 times 0.01 = 0.15.
    $$


  2. Isn't every unit actually just a constant? But why do we treat them in such a special way then?










share|cite|improve this question











$endgroup$




  1. Isn't the percentage symbol actually just a constant with the value $0.01$? As in
    $$
    15% = 15 times % = 15 times 0.01 = 0.15.
    $$


  2. Isn't every unit actually just a constant? But why do we treat them in such a special way then?







notation percentages unit-of-measure






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edited Feb 25 at 5:33









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  • 14




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    Right, you can very well see $%$ as a numerical constant, though culturally this would shock many people.
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    – Yves Daoust
    Feb 22 at 13:05






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    It is not a unit of measure; it is only a useful symbol. 15% is $dfrac 15100$. A percentage is a number.
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    – Mauro ALLEGRANZA
    Feb 22 at 13:07







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    I agree completely that % can be considered a real number.
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    – JP McCarthy
    Feb 22 at 13:09






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    Some believe that it's a map $Bbb R to Bbb R^*$ that assigns to $x$ the functional $x%(y)=fracxy100$. Not that they know it, but they rather perceive it. And it becomes apparent when they describe their difficulties.
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    – Saucy O'Path
    Feb 22 at 18:23







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    I would caution you about writing, for example, "$1 + %$", as few people would understand that you mean $1.01$.
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    – Theo Bendit
    Feb 23 at 3:07













  • 14




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    Right, you can very well see $%$ as a numerical constant, though culturally this would shock many people.
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    – Yves Daoust
    Feb 22 at 13:05






  • 3




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    It is not a unit of measure; it is only a useful symbol. 15% is $dfrac 15100$. A percentage is a number.
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    – Mauro ALLEGRANZA
    Feb 22 at 13:07







  • 6




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    I agree completely that % can be considered a real number.
    $endgroup$
    – JP McCarthy
    Feb 22 at 13:09






  • 10




    $begingroup$
    Some believe that it's a map $Bbb R to Bbb R^*$ that assigns to $x$ the functional $x%(y)=fracxy100$. Not that they know it, but they rather perceive it. And it becomes apparent when they describe their difficulties.
    $endgroup$
    – Saucy O'Path
    Feb 22 at 18:23







  • 7




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    I would caution you about writing, for example, "$1 + %$", as few people would understand that you mean $1.01$.
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    – Theo Bendit
    Feb 23 at 3:07








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Right, you can very well see $%$ as a numerical constant, though culturally this would shock many people.
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– Yves Daoust
Feb 22 at 13:05




$begingroup$
Right, you can very well see $%$ as a numerical constant, though culturally this would shock many people.
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– Yves Daoust
Feb 22 at 13:05




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It is not a unit of measure; it is only a useful symbol. 15% is $dfrac 15100$. A percentage is a number.
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– Mauro ALLEGRANZA
Feb 22 at 13:07





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It is not a unit of measure; it is only a useful symbol. 15% is $dfrac 15100$. A percentage is a number.
$endgroup$
– Mauro ALLEGRANZA
Feb 22 at 13:07





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I agree completely that % can be considered a real number.
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– JP McCarthy
Feb 22 at 13:09




$begingroup$
I agree completely that % can be considered a real number.
$endgroup$
– JP McCarthy
Feb 22 at 13:09




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10




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Some believe that it's a map $Bbb R to Bbb R^*$ that assigns to $x$ the functional $x%(y)=fracxy100$. Not that they know it, but they rather perceive it. And it becomes apparent when they describe their difficulties.
$endgroup$
– Saucy O'Path
Feb 22 at 18:23





$begingroup$
Some believe that it's a map $Bbb R to Bbb R^*$ that assigns to $x$ the functional $x%(y)=fracxy100$. Not that they know it, but they rather perceive it. And it becomes apparent when they describe their difficulties.
$endgroup$
– Saucy O'Path
Feb 22 at 18:23





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I would caution you about writing, for example, "$1 + %$", as few people would understand that you mean $1.01$.
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– Theo Bendit
Feb 23 at 3:07





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I would caution you about writing, for example, "$1 + %$", as few people would understand that you mean $1.01$.
$endgroup$
– Theo Bendit
Feb 23 at 3:07











14 Answers
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Isn't the percentage symbol actually just a constant with the value $0.01$?




No. If it were, all of the following would be valid constructs:



$$
30+%,50=30.5\
90,%,mathrmcm=0.9,mathrmcm\
2-%=1.99\
%^2=0.0001
$$



The percentage symbol is a unit. When converting between units, it's easy to treat them as constants that represent the conversion ratio, and multiply (for example, the $mathrmm$ unit can be thought of as a constant equal to $100,mathrmcm$, in $2,mathrmm=2(100,mathrmcm)=200,mathrmcm$). But that isn't the same as saying they're "just constants", as they represent more than that. A unit is not just a ratio, it's a distance or a weight or an amount of time.



This is less obvious with $%$ because it's a dimensionless unit, representing something more abstract like "parts of a whole" rather than a physical property like mass or surface area. $1,%$ is "one one-hundredth of a thing", measuring an amount of something, anything, often something with its own units. A similarly dimensionless unit is the "degree", where $1^circ$ is "one three-hundred-sixtieth of the way around". Another one is the "cycle", as in "one $mathrmMhz$ is one million cycles per second". Things like "wholes", "turns", and "cycles" are more abstract than inches or grams, but when applied they still represent tangible measurements, so they aren't any less powerful when treated as units.





I mean, I guess every unit is actually just a constant, but why do we treat them in such a special way then?




What then would you say the "constant" is that is represented by "inch", or "second", or "ounce"? Would these ideas not have clear numeric values if every unit were simply a constant?



Again, a unit is not just a constant, it represents something more. I don't have exact vocabulary for this, but I would say a unit is an "amount" of a "dimension". The dimension can be time, space, energy, mass, etc. To even begin to treat a unit as a constant, we need to consider it in terms of a different unit in the same dimension. For example, the unit "millisecond" amounts to different constants depending on whether we think about it in terms of a second ($0.001$), hour ($2.77778times10^-7$), microsecond ($1000$), etc. This constant is not intrinsic to the units themselves, as it only arises when comparing to other units.






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    By this logic, the "percentage conversion factor" (which does not have a symbol) would be a constant with a value of $0.01$, much like feet to inches has a conversion factor of $frac112$. Having symbols for these constants would be unmanageable. Does that sound right?
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    – Andy
    Feb 24 at 9:33







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    @Andy Yes, that makes sense - the technical term for those conversion factor(s) is "constant(s) of proportionality".
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    – michaelb958
    Feb 24 at 10:50






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    I agree with the precise answer you've given, but it is relevant to note that the name "percent" was chosen as if it were a unit. "Per cent" means "per 100", which is the verbal equivalent of /100, i.e. [15%] = [15 per 100] = [15/100]. For everyday usage, one can think of it as a constant, but it isn't a constant to a very precise degree (which is explained in this answer).
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    – Flater
    Feb 25 at 12:29











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    Come to think of it, can we not consider cm to be the equivalent constant of m/100? It relies on a predefined but unknown constant (what is a meter?) but any ratio thereof (such as cm, km, ...) can be defined accurately. Similarly, isn't % simply the constant expression of "the whole"/100? While "the whole" shouldn't be defined as the numerical 1, if you assume that "the whole" is an unspecified constant, then % should be able to be defined as a ratio of "the whole".
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    – Flater
    Feb 25 at 12:32











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    @Flater Exactly. I tend to think of "the whole" as a sort of "meta-unit", since it can be applied to any unit-ed value and doesn't really represent its own dimension like other units do. Really the constant "the whole" would be defined as "the value you're taking a percentage of", but if you instead define it as 1 and then multiply by said value, you happen to get the same result, so either interpretation will do in practice.
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    – DarthFennec
    Feb 25 at 18:45


















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Yes, for calculations you can use $%=frac1100$. Of course what is meant by the symbol is an interpretation as "parts of hundred", i.e. as percentage of a given amount.






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    % means "per hundred", which makes it an operation, not a constant. The OP is correct except for "15 x %".
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    – amI
    Feb 22 at 17:22


















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There are some exceptions. Take for example $20 + 50%$. This is often interpreted to be equal to $30$, while $20 + 50 cdot 0.01 = 20.5$.



There is some discussion about whether $20 + 50%$ is a valid notation. But sometimes it is used and Google and Wolfram Alpha interpret it as $20cdot 1.5$.



I'm also thinking about $50%^2$. I don't think you'll see this notation (and you shouldn't use it), but just as a thought experiment: Is this $0.25$ or $0.005$?






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    But the convention that $20+50%=30$ leads to bizarre results such as $20 + 50% - 50% = 15$ or $20 + 100% - 100% = 0$.
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    – gandalf61
    Feb 22 at 15:19







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    20 + 50% does not mean anything per se. Seeing the 20 as 100% is understandable, but not guaranteed. +50% does not instantly imply *150% as gandalf61 illustrated.
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    – Chieron
    Feb 22 at 15:50






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    @gandalf61 I agree with you. But the notation $x+y%$ is not uncommon when weights of products, tolerance of resistors, density of chemical solutions, etc. are reported. If you worry about the algebra, then the algebra is not associative which is true about many other mathematical objects as well. I think this is a very good answer. (+1).
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    – stressed out
    Feb 22 at 16:04







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    My point is that the $+$ sign in this convention is not addition. It is shorthand for a different operator $oplus$ which can be defined as $a oplus b = a times (1+b)$. With this interpretation $20 oplus 50% = 20 times (1+50%) = 20 times (1+50 times 0.01) = 20 times 1.5 = 30$ and we are good.
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    – gandalf61
    Feb 22 at 16:36







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    Pointing out how prominent this is in engineering might be a good addition to this. I see resistors rated 1kΩ±1% all the time, capacitors that say 47μF±20%, and so on. This matches the interpretation Paul's answer uses.
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    – Hearth
    Feb 23 at 16:58


















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I wouldn't say that $%$ has a value. You can think of $%$ as "multiply by $frac1100"$ as a sort of postfix in the same way as you can think of the "kilo-" prefix as "multiply by $1000$".



So
$$
5% = 5 (textmultiply by frac1100)=frac5100=0.05
$$

in the same way as
$$
2 textkilograms=2 (textmultiply by $1000$)text grams= 2000 textgrams
$$



I usually teach my students this way and I found it to work just fine.






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    Um... the $-$ prefix ($-x$/$-1x$/$x-2x$) sounds better to me as a prefix example, LOL. Also, $!$ is a good postfix example (if we disregard the double, triple, etc. factorials). :P
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    – EKons
    Feb 22 at 17:18



















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Well, it really depends. In Chinese schools, students are told that $100%=1,40%=2/5$, so % is a constant. In the UK examination system, it appears that % is treated as a unit. Students are NOT expected to write the above two expressions.



However, it is agreed around the world that you should not write something like "$250%$ liters of water".



So it is a good idea to think of it as a constant, but not write it as a constant.



Other units like cm, mm, kg are like the basis of a vector space or something or the imaginary unit $i^2=1$. The are NOT even like usual numbers because they cannot be added together.






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    I also leads to incongruities like $5%$ of two hundred Dollars is $5%$$ ?!
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    – Yves Daoust
    Feb 22 at 13:12







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    @YvesDaoust: Aside from what seems to be typo, I don't see anything wrong with that usage. If I wanted to translate the equation 5% * 15 EUR = 75% EUR into words, I'd say "five percent of fifteen euros is seventy-five percent of a euro," which sounds fine to me. Similarly, I'd read 5% * 20 EUR = 100% EUR as "five percent of twenty euros is one hundred percent of a euro—that is, one whole euro."
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    – Vectornaut
    Feb 22 at 16:47










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    @Vectornaut: no typo.
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    – Yves Daoust
    Feb 22 at 16:49










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    @YvesDaoust: If there's no typo, I'm having trouble understanding what you wrote. Do we agree that 5%$ = 5% * $1 = 0.05 * $1 = $0.05?
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    – Vectornaut
    Feb 22 at 16:53







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    Conversion from percentage expressions to fractions is a standard part of the UK examinations. UK students are expected to be able to convert 40% = 2/5 and make comparisons "which is larger 30% or 1/3?"
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    – James K
    Feb 22 at 20:57


















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The percent sign is an abbreviation: just substitute "$colorred%$" by "$colorredcdotfrac1100$", that's all. So for example: $15colorred%=15colorredcdotfrac1100=0.15$. Or the other way round: $1.23=123colorredcdotfrac1100=123colorred%$.






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    If you want to think about units or dimensional analysis, then probably it is best to interpret 15% as



    $$ 15% = fractext$15$ units of Xtext$100$ units of X $$



    (I would read this as "15 units of X per 100 units of X".) For example, the Wikipedia page on dimensional analysis gives the example of debt-to-GDP ratio.
    $$ 90% text debt-to-GDP = fractext$90$ dollars of debttextper $100$ dollars of GDP $$



    Here both the top and bottom are dollars. But they are two different dollar measurements. So even though the percentage is a dimensionless quantity (dollars/dollars), keeping the units in mind may be wise. Similarly



    $$ 10% text full = fractext$10$ liters of watertextper $100$ liters of container . $$



    and so on. (edit) So for example, if you want to do a calculation like "How many liters of water are in a 2-gallon container that is 10% full", you do



    $$ text$2$ gallons of container ~ cdot ~ fractext$3.78$ liters of containertext$1$ gallon of container ~ cdot ~ fractext$10$ liters of watertext$100$ liters of container . $$



    Of course you could have also done



    $$ text$2$ gallons of container ~ cdot ~ fractext$10$ gallons of watertext$100$ gallons of container ~ cdot ~ fractext$3.78$ liters of watertext$1$ gallon of water ~ cdot . $$






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      I think of $cdot%$ as an operation that divides the argument by $100$ and multiplies it with the reference value $u$ representing a whole, i. e. $x% = xfracu100$. As such it is actually underdetermined as the reference is implied in the non-mathematical text and not part of the notation.



      For example if I give you a $5%$ discount, the reference unit is implied to be your total, which could be $200$$ in this example, in which case $5%=10$$ (note the unit!)



      One could write $%^u$ to specify the reference unit, such that in the above example $5%^200$=10$$, although that would not be commonly understood.






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        It is not a constant. It can be thought of as a unit if you like, but is probably best thought of as merely a syntax. A phrasing I find effective is to say that they are different spellings of a number.



        The reason it is not a constant is because it cannot be used in all situations where a constant could be used. For example, $100x$ cannot be meaningfully written as $fracx%$. Were $%$ to be a constant, that would be a reasonable thing to write. It would be as reasonable as writing $fracxpi$.



        You can get away with thinking of percents as units. Like with your approach of treating it as a constant, the math tends to work out. However, it doesn't really work well as a unit in general. While the axiomization of units is still an open problem, it is typically not true that $100 m = 1 fracm%$ or $1 m = 100 mcdot %$. This makes it an awkward sort of unit.



        I do see "%" used as a unit from time to time, but it's typically shorthand for a particular percentage. I might see a graph of a chemical reaction efficiency written as "%/mol". Indeed, this is using "%" as a unit, but in such a graph it would really be a shorthand for "percent efficiency of the reaction." The same graph might instead be labeled with "%yield/mol" without really changing the meaning any. In this case, I think it is clear that "%" is not really acting as a unit in the way you might be used to. It's really just a letter, no different than "a" or "q."



        Instead, perhaps the most reliable way of treating percents is as an alternate spelling for a number when writing it down. This is a nuanced difference: it suggests that 10% and 0.1 are not just equal, they are in fact merely two ways of writing down the same number. This would be no different than how a programmer might write 0x1F to denote the number 31 in a base-16 notation, how a Chinese person might elect to write 三十一 to denote the same number, or how we might write "thirty one." They are merely different ways of writing the same number.



        This is a subtle difference, but sometimes it can be helpful. For example, at some point you will come across the proof that 0.9999.... = 1.0. This proof is very disconcerting at first, because you assume 0.9999... and 1.0 are two distinct numbers, so they could never be equal. But when you really dig into the meaning of that funny little "..." symbol, you discover there's a better way to think of it. "0.9999..." and "1.0" are simply two spellings of the same number. One relies on an infinite series to acquire its meaning, while the other does not, but they mean the same number.






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          I believe you can think of it both ways.



          It’s a symbol for “parts of a hundred” that happens to have a constant value behind it, and at the same time it’s a constant that happens to have a symbolic meaning behind it.






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            I don't think it has a universally agreed nature.(Symbol,constant,or Unit, or else?) Even though it might have had a single nature at the moment it was created, after a long time usage by people, with non-mathematicans as the majority, its nature might be different among different people's point of view.



            In my opinion, I would regard '%' equivalent to the phrase 'out of 100'. That means 15% is read as '15 out of 100' . However, I am pretty sure someone else will have his own interpretation on '%' which leads no contradiction to mine.






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              It's often convenient to write $x%$ for $x/100$. The notation $xy$ is also used for the product of $x$ and $y$ (whether numbers, functions, elements of a group, etc.), and these give the same result if you formally set $% = 1/100$. On the other hand, it would be bizarre to write "$1/%$ is divisible by $5$" or "$% + sqrt% = 0.11$", etc. There's nothing inherently wrong with abusing notation; I have no problem writing $0$ for the integer $0$, the real number $0$, the zero function, the zero element in a vector space, etc. But there's also nothing particularly noteworthy or profound in doing so.






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                It is just a notation i.e. a way of expressing numbers, e.g.



                $0.01 = 1% =10^-2 = 1texte-02$



                nothing more. This is also why it is said to be dimensionless.



                For example, there would be absolutely nothing wrong in saying that someone is $20$ or $2000%$ years old, unusual admittedly.






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                  It's a postfix operator. A function written after the argument, $x%=x/100$, instead of before the argument as in normal prefix notation $f(x)$ or $Delta x$.






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                    active

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                    50












                    $begingroup$


                    Isn't the percentage symbol actually just a constant with the value $0.01$?




                    No. If it were, all of the following would be valid constructs:



                    $$
                    30+%,50=30.5\
                    90,%,mathrmcm=0.9,mathrmcm\
                    2-%=1.99\
                    %^2=0.0001
                    $$



                    The percentage symbol is a unit. When converting between units, it's easy to treat them as constants that represent the conversion ratio, and multiply (for example, the $mathrmm$ unit can be thought of as a constant equal to $100,mathrmcm$, in $2,mathrmm=2(100,mathrmcm)=200,mathrmcm$). But that isn't the same as saying they're "just constants", as they represent more than that. A unit is not just a ratio, it's a distance or a weight or an amount of time.



                    This is less obvious with $%$ because it's a dimensionless unit, representing something more abstract like "parts of a whole" rather than a physical property like mass or surface area. $1,%$ is "one one-hundredth of a thing", measuring an amount of something, anything, often something with its own units. A similarly dimensionless unit is the "degree", where $1^circ$ is "one three-hundred-sixtieth of the way around". Another one is the "cycle", as in "one $mathrmMhz$ is one million cycles per second". Things like "wholes", "turns", and "cycles" are more abstract than inches or grams, but when applied they still represent tangible measurements, so they aren't any less powerful when treated as units.





                    I mean, I guess every unit is actually just a constant, but why do we treat them in such a special way then?




                    What then would you say the "constant" is that is represented by "inch", or "second", or "ounce"? Would these ideas not have clear numeric values if every unit were simply a constant?



                    Again, a unit is not just a constant, it represents something more. I don't have exact vocabulary for this, but I would say a unit is an "amount" of a "dimension". The dimension can be time, space, energy, mass, etc. To even begin to treat a unit as a constant, we need to consider it in terms of a different unit in the same dimension. For example, the unit "millisecond" amounts to different constants depending on whether we think about it in terms of a second ($0.001$), hour ($2.77778times10^-7$), microsecond ($1000$), etc. This constant is not intrinsic to the units themselves, as it only arises when comparing to other units.






                    share|cite|improve this answer











                    $endgroup$












                    • $begingroup$
                      By this logic, the "percentage conversion factor" (which does not have a symbol) would be a constant with a value of $0.01$, much like feet to inches has a conversion factor of $frac112$. Having symbols for these constants would be unmanageable. Does that sound right?
                      $endgroup$
                      – Andy
                      Feb 24 at 9:33







                    • 2




                      $begingroup$
                      @Andy Yes, that makes sense - the technical term for those conversion factor(s) is "constant(s) of proportionality".
                      $endgroup$
                      – michaelb958
                      Feb 24 at 10:50






                    • 1




                      $begingroup$
                      I agree with the precise answer you've given, but it is relevant to note that the name "percent" was chosen as if it were a unit. "Per cent" means "per 100", which is the verbal equivalent of /100, i.e. [15%] = [15 per 100] = [15/100]. For everyday usage, one can think of it as a constant, but it isn't a constant to a very precise degree (which is explained in this answer).
                      $endgroup$
                      – Flater
                      Feb 25 at 12:29











                    • $begingroup$
                      Come to think of it, can we not consider cm to be the equivalent constant of m/100? It relies on a predefined but unknown constant (what is a meter?) but any ratio thereof (such as cm, km, ...) can be defined accurately. Similarly, isn't % simply the constant expression of "the whole"/100? While "the whole" shouldn't be defined as the numerical 1, if you assume that "the whole" is an unspecified constant, then % should be able to be defined as a ratio of "the whole".
                      $endgroup$
                      – Flater
                      Feb 25 at 12:32











                    • $begingroup$
                      @Flater Exactly. I tend to think of "the whole" as a sort of "meta-unit", since it can be applied to any unit-ed value and doesn't really represent its own dimension like other units do. Really the constant "the whole" would be defined as "the value you're taking a percentage of", but if you instead define it as 1 and then multiply by said value, you happen to get the same result, so either interpretation will do in practice.
                      $endgroup$
                      – DarthFennec
                      Feb 25 at 18:45















                    50












                    $begingroup$


                    Isn't the percentage symbol actually just a constant with the value $0.01$?




                    No. If it were, all of the following would be valid constructs:



                    $$
                    30+%,50=30.5\
                    90,%,mathrmcm=0.9,mathrmcm\
                    2-%=1.99\
                    %^2=0.0001
                    $$



                    The percentage symbol is a unit. When converting between units, it's easy to treat them as constants that represent the conversion ratio, and multiply (for example, the $mathrmm$ unit can be thought of as a constant equal to $100,mathrmcm$, in $2,mathrmm=2(100,mathrmcm)=200,mathrmcm$). But that isn't the same as saying they're "just constants", as they represent more than that. A unit is not just a ratio, it's a distance or a weight or an amount of time.



                    This is less obvious with $%$ because it's a dimensionless unit, representing something more abstract like "parts of a whole" rather than a physical property like mass or surface area. $1,%$ is "one one-hundredth of a thing", measuring an amount of something, anything, often something with its own units. A similarly dimensionless unit is the "degree", where $1^circ$ is "one three-hundred-sixtieth of the way around". Another one is the "cycle", as in "one $mathrmMhz$ is one million cycles per second". Things like "wholes", "turns", and "cycles" are more abstract than inches or grams, but when applied they still represent tangible measurements, so they aren't any less powerful when treated as units.





                    I mean, I guess every unit is actually just a constant, but why do we treat them in such a special way then?




                    What then would you say the "constant" is that is represented by "inch", or "second", or "ounce"? Would these ideas not have clear numeric values if every unit were simply a constant?



                    Again, a unit is not just a constant, it represents something more. I don't have exact vocabulary for this, but I would say a unit is an "amount" of a "dimension". The dimension can be time, space, energy, mass, etc. To even begin to treat a unit as a constant, we need to consider it in terms of a different unit in the same dimension. For example, the unit "millisecond" amounts to different constants depending on whether we think about it in terms of a second ($0.001$), hour ($2.77778times10^-7$), microsecond ($1000$), etc. This constant is not intrinsic to the units themselves, as it only arises when comparing to other units.






                    share|cite|improve this answer











                    $endgroup$












                    • $begingroup$
                      By this logic, the "percentage conversion factor" (which does not have a symbol) would be a constant with a value of $0.01$, much like feet to inches has a conversion factor of $frac112$. Having symbols for these constants would be unmanageable. Does that sound right?
                      $endgroup$
                      – Andy
                      Feb 24 at 9:33







                    • 2




                      $begingroup$
                      @Andy Yes, that makes sense - the technical term for those conversion factor(s) is "constant(s) of proportionality".
                      $endgroup$
                      – michaelb958
                      Feb 24 at 10:50






                    • 1




                      $begingroup$
                      I agree with the precise answer you've given, but it is relevant to note that the name "percent" was chosen as if it were a unit. "Per cent" means "per 100", which is the verbal equivalent of /100, i.e. [15%] = [15 per 100] = [15/100]. For everyday usage, one can think of it as a constant, but it isn't a constant to a very precise degree (which is explained in this answer).
                      $endgroup$
                      – Flater
                      Feb 25 at 12:29











                    • $begingroup$
                      Come to think of it, can we not consider cm to be the equivalent constant of m/100? It relies on a predefined but unknown constant (what is a meter?) but any ratio thereof (such as cm, km, ...) can be defined accurately. Similarly, isn't % simply the constant expression of "the whole"/100? While "the whole" shouldn't be defined as the numerical 1, if you assume that "the whole" is an unspecified constant, then % should be able to be defined as a ratio of "the whole".
                      $endgroup$
                      – Flater
                      Feb 25 at 12:32











                    • $begingroup$
                      @Flater Exactly. I tend to think of "the whole" as a sort of "meta-unit", since it can be applied to any unit-ed value and doesn't really represent its own dimension like other units do. Really the constant "the whole" would be defined as "the value you're taking a percentage of", but if you instead define it as 1 and then multiply by said value, you happen to get the same result, so either interpretation will do in practice.
                      $endgroup$
                      – DarthFennec
                      Feb 25 at 18:45













                    50












                    50








                    50





                    $begingroup$


                    Isn't the percentage symbol actually just a constant with the value $0.01$?




                    No. If it were, all of the following would be valid constructs:



                    $$
                    30+%,50=30.5\
                    90,%,mathrmcm=0.9,mathrmcm\
                    2-%=1.99\
                    %^2=0.0001
                    $$



                    The percentage symbol is a unit. When converting between units, it's easy to treat them as constants that represent the conversion ratio, and multiply (for example, the $mathrmm$ unit can be thought of as a constant equal to $100,mathrmcm$, in $2,mathrmm=2(100,mathrmcm)=200,mathrmcm$). But that isn't the same as saying they're "just constants", as they represent more than that. A unit is not just a ratio, it's a distance or a weight or an amount of time.



                    This is less obvious with $%$ because it's a dimensionless unit, representing something more abstract like "parts of a whole" rather than a physical property like mass or surface area. $1,%$ is "one one-hundredth of a thing", measuring an amount of something, anything, often something with its own units. A similarly dimensionless unit is the "degree", where $1^circ$ is "one three-hundred-sixtieth of the way around". Another one is the "cycle", as in "one $mathrmMhz$ is one million cycles per second". Things like "wholes", "turns", and "cycles" are more abstract than inches or grams, but when applied they still represent tangible measurements, so they aren't any less powerful when treated as units.





                    I mean, I guess every unit is actually just a constant, but why do we treat them in such a special way then?




                    What then would you say the "constant" is that is represented by "inch", or "second", or "ounce"? Would these ideas not have clear numeric values if every unit were simply a constant?



                    Again, a unit is not just a constant, it represents something more. I don't have exact vocabulary for this, but I would say a unit is an "amount" of a "dimension". The dimension can be time, space, energy, mass, etc. To even begin to treat a unit as a constant, we need to consider it in terms of a different unit in the same dimension. For example, the unit "millisecond" amounts to different constants depending on whether we think about it in terms of a second ($0.001$), hour ($2.77778times10^-7$), microsecond ($1000$), etc. This constant is not intrinsic to the units themselves, as it only arises when comparing to other units.






                    share|cite|improve this answer











                    $endgroup$




                    Isn't the percentage symbol actually just a constant with the value $0.01$?




                    No. If it were, all of the following would be valid constructs:



                    $$
                    30+%,50=30.5\
                    90,%,mathrmcm=0.9,mathrmcm\
                    2-%=1.99\
                    %^2=0.0001
                    $$



                    The percentage symbol is a unit. When converting between units, it's easy to treat them as constants that represent the conversion ratio, and multiply (for example, the $mathrmm$ unit can be thought of as a constant equal to $100,mathrmcm$, in $2,mathrmm=2(100,mathrmcm)=200,mathrmcm$). But that isn't the same as saying they're "just constants", as they represent more than that. A unit is not just a ratio, it's a distance or a weight or an amount of time.



                    This is less obvious with $%$ because it's a dimensionless unit, representing something more abstract like "parts of a whole" rather than a physical property like mass or surface area. $1,%$ is "one one-hundredth of a thing", measuring an amount of something, anything, often something with its own units. A similarly dimensionless unit is the "degree", where $1^circ$ is "one three-hundred-sixtieth of the way around". Another one is the "cycle", as in "one $mathrmMhz$ is one million cycles per second". Things like "wholes", "turns", and "cycles" are more abstract than inches or grams, but when applied they still represent tangible measurements, so they aren't any less powerful when treated as units.





                    I mean, I guess every unit is actually just a constant, but why do we treat them in such a special way then?




                    What then would you say the "constant" is that is represented by "inch", or "second", or "ounce"? Would these ideas not have clear numeric values if every unit were simply a constant?



                    Again, a unit is not just a constant, it represents something more. I don't have exact vocabulary for this, but I would say a unit is an "amount" of a "dimension". The dimension can be time, space, energy, mass, etc. To even begin to treat a unit as a constant, we need to consider it in terms of a different unit in the same dimension. For example, the unit "millisecond" amounts to different constants depending on whether we think about it in terms of a second ($0.001$), hour ($2.77778times10^-7$), microsecond ($1000$), etc. This constant is not intrinsic to the units themselves, as it only arises when comparing to other units.







                    share|cite|improve this answer














                    share|cite|improve this answer



                    share|cite|improve this answer








                    edited Feb 25 at 18:58

























                    answered Feb 22 at 22:36









                    DarthFennecDarthFennec

                    60913




                    60913











                    • $begingroup$
                      By this logic, the "percentage conversion factor" (which does not have a symbol) would be a constant with a value of $0.01$, much like feet to inches has a conversion factor of $frac112$. Having symbols for these constants would be unmanageable. Does that sound right?
                      $endgroup$
                      – Andy
                      Feb 24 at 9:33







                    • 2




                      $begingroup$
                      @Andy Yes, that makes sense - the technical term for those conversion factor(s) is "constant(s) of proportionality".
                      $endgroup$
                      – michaelb958
                      Feb 24 at 10:50






                    • 1




                      $begingroup$
                      I agree with the precise answer you've given, but it is relevant to note that the name "percent" was chosen as if it were a unit. "Per cent" means "per 100", which is the verbal equivalent of /100, i.e. [15%] = [15 per 100] = [15/100]. For everyday usage, one can think of it as a constant, but it isn't a constant to a very precise degree (which is explained in this answer).
                      $endgroup$
                      – Flater
                      Feb 25 at 12:29











                    • $begingroup$
                      Come to think of it, can we not consider cm to be the equivalent constant of m/100? It relies on a predefined but unknown constant (what is a meter?) but any ratio thereof (such as cm, km, ...) can be defined accurately. Similarly, isn't % simply the constant expression of "the whole"/100? While "the whole" shouldn't be defined as the numerical 1, if you assume that "the whole" is an unspecified constant, then % should be able to be defined as a ratio of "the whole".
                      $endgroup$
                      – Flater
                      Feb 25 at 12:32











                    • $begingroup$
                      @Flater Exactly. I tend to think of "the whole" as a sort of "meta-unit", since it can be applied to any unit-ed value and doesn't really represent its own dimension like other units do. Really the constant "the whole" would be defined as "the value you're taking a percentage of", but if you instead define it as 1 and then multiply by said value, you happen to get the same result, so either interpretation will do in practice.
                      $endgroup$
                      – DarthFennec
                      Feb 25 at 18:45
















                    • $begingroup$
                      By this logic, the "percentage conversion factor" (which does not have a symbol) would be a constant with a value of $0.01$, much like feet to inches has a conversion factor of $frac112$. Having symbols for these constants would be unmanageable. Does that sound right?
                      $endgroup$
                      – Andy
                      Feb 24 at 9:33







                    • 2




                      $begingroup$
                      @Andy Yes, that makes sense - the technical term for those conversion factor(s) is "constant(s) of proportionality".
                      $endgroup$
                      – michaelb958
                      Feb 24 at 10:50






                    • 1




                      $begingroup$
                      I agree with the precise answer you've given, but it is relevant to note that the name "percent" was chosen as if it were a unit. "Per cent" means "per 100", which is the verbal equivalent of /100, i.e. [15%] = [15 per 100] = [15/100]. For everyday usage, one can think of it as a constant, but it isn't a constant to a very precise degree (which is explained in this answer).
                      $endgroup$
                      – Flater
                      Feb 25 at 12:29











                    • $begingroup$
                      Come to think of it, can we not consider cm to be the equivalent constant of m/100? It relies on a predefined but unknown constant (what is a meter?) but any ratio thereof (such as cm, km, ...) can be defined accurately. Similarly, isn't % simply the constant expression of "the whole"/100? While "the whole" shouldn't be defined as the numerical 1, if you assume that "the whole" is an unspecified constant, then % should be able to be defined as a ratio of "the whole".
                      $endgroup$
                      – Flater
                      Feb 25 at 12:32











                    • $begingroup$
                      @Flater Exactly. I tend to think of "the whole" as a sort of "meta-unit", since it can be applied to any unit-ed value and doesn't really represent its own dimension like other units do. Really the constant "the whole" would be defined as "the value you're taking a percentage of", but if you instead define it as 1 and then multiply by said value, you happen to get the same result, so either interpretation will do in practice.
                      $endgroup$
                      – DarthFennec
                      Feb 25 at 18:45















                    $begingroup$
                    By this logic, the "percentage conversion factor" (which does not have a symbol) would be a constant with a value of $0.01$, much like feet to inches has a conversion factor of $frac112$. Having symbols for these constants would be unmanageable. Does that sound right?
                    $endgroup$
                    – Andy
                    Feb 24 at 9:33





                    $begingroup$
                    By this logic, the "percentage conversion factor" (which does not have a symbol) would be a constant with a value of $0.01$, much like feet to inches has a conversion factor of $frac112$. Having symbols for these constants would be unmanageable. Does that sound right?
                    $endgroup$
                    – Andy
                    Feb 24 at 9:33





                    2




                    2




                    $begingroup$
                    @Andy Yes, that makes sense - the technical term for those conversion factor(s) is "constant(s) of proportionality".
                    $endgroup$
                    – michaelb958
                    Feb 24 at 10:50




                    $begingroup$
                    @Andy Yes, that makes sense - the technical term for those conversion factor(s) is "constant(s) of proportionality".
                    $endgroup$
                    – michaelb958
                    Feb 24 at 10:50




                    1




                    1




                    $begingroup$
                    I agree with the precise answer you've given, but it is relevant to note that the name "percent" was chosen as if it were a unit. "Per cent" means "per 100", which is the verbal equivalent of /100, i.e. [15%] = [15 per 100] = [15/100]. For everyday usage, one can think of it as a constant, but it isn't a constant to a very precise degree (which is explained in this answer).
                    $endgroup$
                    – Flater
                    Feb 25 at 12:29





                    $begingroup$
                    I agree with the precise answer you've given, but it is relevant to note that the name "percent" was chosen as if it were a unit. "Per cent" means "per 100", which is the verbal equivalent of /100, i.e. [15%] = [15 per 100] = [15/100]. For everyday usage, one can think of it as a constant, but it isn't a constant to a very precise degree (which is explained in this answer).
                    $endgroup$
                    – Flater
                    Feb 25 at 12:29













                    $begingroup$
                    Come to think of it, can we not consider cm to be the equivalent constant of m/100? It relies on a predefined but unknown constant (what is a meter?) but any ratio thereof (such as cm, km, ...) can be defined accurately. Similarly, isn't % simply the constant expression of "the whole"/100? While "the whole" shouldn't be defined as the numerical 1, if you assume that "the whole" is an unspecified constant, then % should be able to be defined as a ratio of "the whole".
                    $endgroup$
                    – Flater
                    Feb 25 at 12:32





                    $begingroup$
                    Come to think of it, can we not consider cm to be the equivalent constant of m/100? It relies on a predefined but unknown constant (what is a meter?) but any ratio thereof (such as cm, km, ...) can be defined accurately. Similarly, isn't % simply the constant expression of "the whole"/100? While "the whole" shouldn't be defined as the numerical 1, if you assume that "the whole" is an unspecified constant, then % should be able to be defined as a ratio of "the whole".
                    $endgroup$
                    – Flater
                    Feb 25 at 12:32













                    $begingroup$
                    @Flater Exactly. I tend to think of "the whole" as a sort of "meta-unit", since it can be applied to any unit-ed value and doesn't really represent its own dimension like other units do. Really the constant "the whole" would be defined as "the value you're taking a percentage of", but if you instead define it as 1 and then multiply by said value, you happen to get the same result, so either interpretation will do in practice.
                    $endgroup$
                    – DarthFennec
                    Feb 25 at 18:45




                    $begingroup$
                    @Flater Exactly. I tend to think of "the whole" as a sort of "meta-unit", since it can be applied to any unit-ed value and doesn't really represent its own dimension like other units do. Really the constant "the whole" would be defined as "the value you're taking a percentage of", but if you instead define it as 1 and then multiply by said value, you happen to get the same result, so either interpretation will do in practice.
                    $endgroup$
                    – DarthFennec
                    Feb 25 at 18:45











                    9












                    $begingroup$

                    Yes, for calculations you can use $%=frac1100$. Of course what is meant by the symbol is an interpretation as "parts of hundred", i.e. as percentage of a given amount.






                    share|cite|improve this answer









                    $endgroup$








                    • 6




                      $begingroup$
                      % means "per hundred", which makes it an operation, not a constant. The OP is correct except for "15 x %".
                      $endgroup$
                      – amI
                      Feb 22 at 17:22















                    9












                    $begingroup$

                    Yes, for calculations you can use $%=frac1100$. Of course what is meant by the symbol is an interpretation as "parts of hundred", i.e. as percentage of a given amount.






                    share|cite|improve this answer









                    $endgroup$








                    • 6




                      $begingroup$
                      % means "per hundred", which makes it an operation, not a constant. The OP is correct except for "15 x %".
                      $endgroup$
                      – amI
                      Feb 22 at 17:22













                    9












                    9








                    9





                    $begingroup$

                    Yes, for calculations you can use $%=frac1100$. Of course what is meant by the symbol is an interpretation as "parts of hundred", i.e. as percentage of a given amount.






                    share|cite|improve this answer









                    $endgroup$



                    Yes, for calculations you can use $%=frac1100$. Of course what is meant by the symbol is an interpretation as "parts of hundred", i.e. as percentage of a given amount.







                    share|cite|improve this answer












                    share|cite|improve this answer



                    share|cite|improve this answer










                    answered Feb 22 at 13:07









                    JamesJames

                    2,113422




                    2,113422







                    • 6




                      $begingroup$
                      % means "per hundred", which makes it an operation, not a constant. The OP is correct except for "15 x %".
                      $endgroup$
                      – amI
                      Feb 22 at 17:22












                    • 6




                      $begingroup$
                      % means "per hundred", which makes it an operation, not a constant. The OP is correct except for "15 x %".
                      $endgroup$
                      – amI
                      Feb 22 at 17:22







                    6




                    6




                    $begingroup$
                    % means "per hundred", which makes it an operation, not a constant. The OP is correct except for "15 x %".
                    $endgroup$
                    – amI
                    Feb 22 at 17:22




                    $begingroup$
                    % means "per hundred", which makes it an operation, not a constant. The OP is correct except for "15 x %".
                    $endgroup$
                    – amI
                    Feb 22 at 17:22











                    9












                    $begingroup$

                    There are some exceptions. Take for example $20 + 50%$. This is often interpreted to be equal to $30$, while $20 + 50 cdot 0.01 = 20.5$.



                    There is some discussion about whether $20 + 50%$ is a valid notation. But sometimes it is used and Google and Wolfram Alpha interpret it as $20cdot 1.5$.



                    I'm also thinking about $50%^2$. I don't think you'll see this notation (and you shouldn't use it), but just as a thought experiment: Is this $0.25$ or $0.005$?






                    share|cite|improve this answer











                    $endgroup$








                    • 10




                      $begingroup$
                      But the convention that $20+50%=30$ leads to bizarre results such as $20 + 50% - 50% = 15$ or $20 + 100% - 100% = 0$.
                      $endgroup$
                      – gandalf61
                      Feb 22 at 15:19







                    • 8




                      $begingroup$
                      20 + 50% does not mean anything per se. Seeing the 20 as 100% is understandable, but not guaranteed. +50% does not instantly imply *150% as gandalf61 illustrated.
                      $endgroup$
                      – Chieron
                      Feb 22 at 15:50






                    • 5




                      $begingroup$
                      @gandalf61 I agree with you. But the notation $x+y%$ is not uncommon when weights of products, tolerance of resistors, density of chemical solutions, etc. are reported. If you worry about the algebra, then the algebra is not associative which is true about many other mathematical objects as well. I think this is a very good answer. (+1).
                      $endgroup$
                      – stressed out
                      Feb 22 at 16:04







                    • 9




                      $begingroup$
                      My point is that the $+$ sign in this convention is not addition. It is shorthand for a different operator $oplus$ which can be defined as $a oplus b = a times (1+b)$. With this interpretation $20 oplus 50% = 20 times (1+50%) = 20 times (1+50 times 0.01) = 20 times 1.5 = 30$ and we are good.
                      $endgroup$
                      – gandalf61
                      Feb 22 at 16:36







                    • 7




                      $begingroup$
                      Pointing out how prominent this is in engineering might be a good addition to this. I see resistors rated 1kΩ±1% all the time, capacitors that say 47μF±20%, and so on. This matches the interpretation Paul's answer uses.
                      $endgroup$
                      – Hearth
                      Feb 23 at 16:58















                    9












                    $begingroup$

                    There are some exceptions. Take for example $20 + 50%$. This is often interpreted to be equal to $30$, while $20 + 50 cdot 0.01 = 20.5$.



                    There is some discussion about whether $20 + 50%$ is a valid notation. But sometimes it is used and Google and Wolfram Alpha interpret it as $20cdot 1.5$.



                    I'm also thinking about $50%^2$. I don't think you'll see this notation (and you shouldn't use it), but just as a thought experiment: Is this $0.25$ or $0.005$?






                    share|cite|improve this answer











                    $endgroup$








                    • 10




                      $begingroup$
                      But the convention that $20+50%=30$ leads to bizarre results such as $20 + 50% - 50% = 15$ or $20 + 100% - 100% = 0$.
                      $endgroup$
                      – gandalf61
                      Feb 22 at 15:19







                    • 8




                      $begingroup$
                      20 + 50% does not mean anything per se. Seeing the 20 as 100% is understandable, but not guaranteed. +50% does not instantly imply *150% as gandalf61 illustrated.
                      $endgroup$
                      – Chieron
                      Feb 22 at 15:50






                    • 5




                      $begingroup$
                      @gandalf61 I agree with you. But the notation $x+y%$ is not uncommon when weights of products, tolerance of resistors, density of chemical solutions, etc. are reported. If you worry about the algebra, then the algebra is not associative which is true about many other mathematical objects as well. I think this is a very good answer. (+1).
                      $endgroup$
                      – stressed out
                      Feb 22 at 16:04







                    • 9




                      $begingroup$
                      My point is that the $+$ sign in this convention is not addition. It is shorthand for a different operator $oplus$ which can be defined as $a oplus b = a times (1+b)$. With this interpretation $20 oplus 50% = 20 times (1+50%) = 20 times (1+50 times 0.01) = 20 times 1.5 = 30$ and we are good.
                      $endgroup$
                      – gandalf61
                      Feb 22 at 16:36







                    • 7




                      $begingroup$
                      Pointing out how prominent this is in engineering might be a good addition to this. I see resistors rated 1kΩ±1% all the time, capacitors that say 47μF±20%, and so on. This matches the interpretation Paul's answer uses.
                      $endgroup$
                      – Hearth
                      Feb 23 at 16:58













                    9












                    9








                    9





                    $begingroup$

                    There are some exceptions. Take for example $20 + 50%$. This is often interpreted to be equal to $30$, while $20 + 50 cdot 0.01 = 20.5$.



                    There is some discussion about whether $20 + 50%$ is a valid notation. But sometimes it is used and Google and Wolfram Alpha interpret it as $20cdot 1.5$.



                    I'm also thinking about $50%^2$. I don't think you'll see this notation (and you shouldn't use it), but just as a thought experiment: Is this $0.25$ or $0.005$?






                    share|cite|improve this answer











                    $endgroup$



                    There are some exceptions. Take for example $20 + 50%$. This is often interpreted to be equal to $30$, while $20 + 50 cdot 0.01 = 20.5$.



                    There is some discussion about whether $20 + 50%$ is a valid notation. But sometimes it is used and Google and Wolfram Alpha interpret it as $20cdot 1.5$.



                    I'm also thinking about $50%^2$. I don't think you'll see this notation (and you shouldn't use it), but just as a thought experiment: Is this $0.25$ or $0.005$?







                    share|cite|improve this answer














                    share|cite|improve this answer



                    share|cite|improve this answer








                    edited Feb 22 at 22:51

























                    answered Feb 22 at 14:54









                    PaulPaul

                    1,782912




                    1,782912







                    • 10




                      $begingroup$
                      But the convention that $20+50%=30$ leads to bizarre results such as $20 + 50% - 50% = 15$ or $20 + 100% - 100% = 0$.
                      $endgroup$
                      – gandalf61
                      Feb 22 at 15:19







                    • 8




                      $begingroup$
                      20 + 50% does not mean anything per se. Seeing the 20 as 100% is understandable, but not guaranteed. +50% does not instantly imply *150% as gandalf61 illustrated.
                      $endgroup$
                      – Chieron
                      Feb 22 at 15:50






                    • 5




                      $begingroup$
                      @gandalf61 I agree with you. But the notation $x+y%$ is not uncommon when weights of products, tolerance of resistors, density of chemical solutions, etc. are reported. If you worry about the algebra, then the algebra is not associative which is true about many other mathematical objects as well. I think this is a very good answer. (+1).
                      $endgroup$
                      – stressed out
                      Feb 22 at 16:04







                    • 9




                      $begingroup$
                      My point is that the $+$ sign in this convention is not addition. It is shorthand for a different operator $oplus$ which can be defined as $a oplus b = a times (1+b)$. With this interpretation $20 oplus 50% = 20 times (1+50%) = 20 times (1+50 times 0.01) = 20 times 1.5 = 30$ and we are good.
                      $endgroup$
                      – gandalf61
                      Feb 22 at 16:36







                    • 7




                      $begingroup$
                      Pointing out how prominent this is in engineering might be a good addition to this. I see resistors rated 1kΩ±1% all the time, capacitors that say 47μF±20%, and so on. This matches the interpretation Paul's answer uses.
                      $endgroup$
                      – Hearth
                      Feb 23 at 16:58












                    • 10




                      $begingroup$
                      But the convention that $20+50%=30$ leads to bizarre results such as $20 + 50% - 50% = 15$ or $20 + 100% - 100% = 0$.
                      $endgroup$
                      – gandalf61
                      Feb 22 at 15:19







                    • 8




                      $begingroup$
                      20 + 50% does not mean anything per se. Seeing the 20 as 100% is understandable, but not guaranteed. +50% does not instantly imply *150% as gandalf61 illustrated.
                      $endgroup$
                      – Chieron
                      Feb 22 at 15:50






                    • 5




                      $begingroup$
                      @gandalf61 I agree with you. But the notation $x+y%$ is not uncommon when weights of products, tolerance of resistors, density of chemical solutions, etc. are reported. If you worry about the algebra, then the algebra is not associative which is true about many other mathematical objects as well. I think this is a very good answer. (+1).
                      $endgroup$
                      – stressed out
                      Feb 22 at 16:04







                    • 9




                      $begingroup$
                      My point is that the $+$ sign in this convention is not addition. It is shorthand for a different operator $oplus$ which can be defined as $a oplus b = a times (1+b)$. With this interpretation $20 oplus 50% = 20 times (1+50%) = 20 times (1+50 times 0.01) = 20 times 1.5 = 30$ and we are good.
                      $endgroup$
                      – gandalf61
                      Feb 22 at 16:36







                    • 7




                      $begingroup$
                      Pointing out how prominent this is in engineering might be a good addition to this. I see resistors rated 1kΩ±1% all the time, capacitors that say 47μF±20%, and so on. This matches the interpretation Paul's answer uses.
                      $endgroup$
                      – Hearth
                      Feb 23 at 16:58







                    10




                    10




                    $begingroup$
                    But the convention that $20+50%=30$ leads to bizarre results such as $20 + 50% - 50% = 15$ or $20 + 100% - 100% = 0$.
                    $endgroup$
                    – gandalf61
                    Feb 22 at 15:19





                    $begingroup$
                    But the convention that $20+50%=30$ leads to bizarre results such as $20 + 50% - 50% = 15$ or $20 + 100% - 100% = 0$.
                    $endgroup$
                    – gandalf61
                    Feb 22 at 15:19





                    8




                    8




                    $begingroup$
                    20 + 50% does not mean anything per se. Seeing the 20 as 100% is understandable, but not guaranteed. +50% does not instantly imply *150% as gandalf61 illustrated.
                    $endgroup$
                    – Chieron
                    Feb 22 at 15:50




                    $begingroup$
                    20 + 50% does not mean anything per se. Seeing the 20 as 100% is understandable, but not guaranteed. +50% does not instantly imply *150% as gandalf61 illustrated.
                    $endgroup$
                    – Chieron
                    Feb 22 at 15:50




                    5




                    5




                    $begingroup$
                    @gandalf61 I agree with you. But the notation $x+y%$ is not uncommon when weights of products, tolerance of resistors, density of chemical solutions, etc. are reported. If you worry about the algebra, then the algebra is not associative which is true about many other mathematical objects as well. I think this is a very good answer. (+1).
                    $endgroup$
                    – stressed out
                    Feb 22 at 16:04





                    $begingroup$
                    @gandalf61 I agree with you. But the notation $x+y%$ is not uncommon when weights of products, tolerance of resistors, density of chemical solutions, etc. are reported. If you worry about the algebra, then the algebra is not associative which is true about many other mathematical objects as well. I think this is a very good answer. (+1).
                    $endgroup$
                    – stressed out
                    Feb 22 at 16:04





                    9




                    9




                    $begingroup$
                    My point is that the $+$ sign in this convention is not addition. It is shorthand for a different operator $oplus$ which can be defined as $a oplus b = a times (1+b)$. With this interpretation $20 oplus 50% = 20 times (1+50%) = 20 times (1+50 times 0.01) = 20 times 1.5 = 30$ and we are good.
                    $endgroup$
                    – gandalf61
                    Feb 22 at 16:36





                    $begingroup$
                    My point is that the $+$ sign in this convention is not addition. It is shorthand for a different operator $oplus$ which can be defined as $a oplus b = a times (1+b)$. With this interpretation $20 oplus 50% = 20 times (1+50%) = 20 times (1+50 times 0.01) = 20 times 1.5 = 30$ and we are good.
                    $endgroup$
                    – gandalf61
                    Feb 22 at 16:36





                    7




                    7




                    $begingroup$
                    Pointing out how prominent this is in engineering might be a good addition to this. I see resistors rated 1kΩ±1% all the time, capacitors that say 47μF±20%, and so on. This matches the interpretation Paul's answer uses.
                    $endgroup$
                    – Hearth
                    Feb 23 at 16:58




                    $begingroup$
                    Pointing out how prominent this is in engineering might be a good addition to this. I see resistors rated 1kΩ±1% all the time, capacitors that say 47μF±20%, and so on. This matches the interpretation Paul's answer uses.
                    $endgroup$
                    – Hearth
                    Feb 23 at 16:58











                    8












                    $begingroup$

                    I wouldn't say that $%$ has a value. You can think of $%$ as "multiply by $frac1100"$ as a sort of postfix in the same way as you can think of the "kilo-" prefix as "multiply by $1000$".



                    So
                    $$
                    5% = 5 (textmultiply by frac1100)=frac5100=0.05
                    $$

                    in the same way as
                    $$
                    2 textkilograms=2 (textmultiply by $1000$)text grams= 2000 textgrams
                    $$



                    I usually teach my students this way and I found it to work just fine.






                    share|cite|improve this answer











                    $endgroup$








                    • 3




                      $begingroup$
                      Um... the $-$ prefix ($-x$/$-1x$/$x-2x$) sounds better to me as a prefix example, LOL. Also, $!$ is a good postfix example (if we disregard the double, triple, etc. factorials). :P
                      $endgroup$
                      – EKons
                      Feb 22 at 17:18
















                    8












                    $begingroup$

                    I wouldn't say that $%$ has a value. You can think of $%$ as "multiply by $frac1100"$ as a sort of postfix in the same way as you can think of the "kilo-" prefix as "multiply by $1000$".



                    So
                    $$
                    5% = 5 (textmultiply by frac1100)=frac5100=0.05
                    $$

                    in the same way as
                    $$
                    2 textkilograms=2 (textmultiply by $1000$)text grams= 2000 textgrams
                    $$



                    I usually teach my students this way and I found it to work just fine.






                    share|cite|improve this answer











                    $endgroup$








                    • 3




                      $begingroup$
                      Um... the $-$ prefix ($-x$/$-1x$/$x-2x$) sounds better to me as a prefix example, LOL. Also, $!$ is a good postfix example (if we disregard the double, triple, etc. factorials). :P
                      $endgroup$
                      – EKons
                      Feb 22 at 17:18














                    8












                    8








                    8





                    $begingroup$

                    I wouldn't say that $%$ has a value. You can think of $%$ as "multiply by $frac1100"$ as a sort of postfix in the same way as you can think of the "kilo-" prefix as "multiply by $1000$".



                    So
                    $$
                    5% = 5 (textmultiply by frac1100)=frac5100=0.05
                    $$

                    in the same way as
                    $$
                    2 textkilograms=2 (textmultiply by $1000$)text grams= 2000 textgrams
                    $$



                    I usually teach my students this way and I found it to work just fine.






                    share|cite|improve this answer











                    $endgroup$



                    I wouldn't say that $%$ has a value. You can think of $%$ as "multiply by $frac1100"$ as a sort of postfix in the same way as you can think of the "kilo-" prefix as "multiply by $1000$".



                    So
                    $$
                    5% = 5 (textmultiply by frac1100)=frac5100=0.05
                    $$

                    in the same way as
                    $$
                    2 textkilograms=2 (textmultiply by $1000$)text grams= 2000 textgrams
                    $$



                    I usually teach my students this way and I found it to work just fine.







                    share|cite|improve this answer














                    share|cite|improve this answer



                    share|cite|improve this answer








                    edited Feb 23 at 6:51









                    BadAtGeometry

                    188215




                    188215










                    answered Feb 22 at 13:11









                    Vinyl_cape_jawaVinyl_cape_jawa

                    3,33011433




                    3,33011433







                    • 3




                      $begingroup$
                      Um... the $-$ prefix ($-x$/$-1x$/$x-2x$) sounds better to me as a prefix example, LOL. Also, $!$ is a good postfix example (if we disregard the double, triple, etc. factorials). :P
                      $endgroup$
                      – EKons
                      Feb 22 at 17:18













                    • 3




                      $begingroup$
                      Um... the $-$ prefix ($-x$/$-1x$/$x-2x$) sounds better to me as a prefix example, LOL. Also, $!$ is a good postfix example (if we disregard the double, triple, etc. factorials). :P
                      $endgroup$
                      – EKons
                      Feb 22 at 17:18








                    3




                    3




                    $begingroup$
                    Um... the $-$ prefix ($-x$/$-1x$/$x-2x$) sounds better to me as a prefix example, LOL. Also, $!$ is a good postfix example (if we disregard the double, triple, etc. factorials). :P
                    $endgroup$
                    – EKons
                    Feb 22 at 17:18





                    $begingroup$
                    Um... the $-$ prefix ($-x$/$-1x$/$x-2x$) sounds better to me as a prefix example, LOL. Also, $!$ is a good postfix example (if we disregard the double, triple, etc. factorials). :P
                    $endgroup$
                    – EKons
                    Feb 22 at 17:18












                    4












                    $begingroup$

                    Well, it really depends. In Chinese schools, students are told that $100%=1,40%=2/5$, so % is a constant. In the UK examination system, it appears that % is treated as a unit. Students are NOT expected to write the above two expressions.



                    However, it is agreed around the world that you should not write something like "$250%$ liters of water".



                    So it is a good idea to think of it as a constant, but not write it as a constant.



                    Other units like cm, mm, kg are like the basis of a vector space or something or the imaginary unit $i^2=1$. The are NOT even like usual numbers because they cannot be added together.






                    share|cite|improve this answer











                    $endgroup$








                    • 1




                      $begingroup$
                      I also leads to incongruities like $5%$ of two hundred Dollars is $5%$$ ?!
                      $endgroup$
                      – Yves Daoust
                      Feb 22 at 13:12







                    • 1




                      $begingroup$
                      @YvesDaoust: Aside from what seems to be typo, I don't see anything wrong with that usage. If I wanted to translate the equation 5% * 15 EUR = 75% EUR into words, I'd say "five percent of fifteen euros is seventy-five percent of a euro," which sounds fine to me. Similarly, I'd read 5% * 20 EUR = 100% EUR as "five percent of twenty euros is one hundred percent of a euro—that is, one whole euro."
                      $endgroup$
                      – Vectornaut
                      Feb 22 at 16:47










                    • $begingroup$
                      @Vectornaut: no typo.
                      $endgroup$
                      – Yves Daoust
                      Feb 22 at 16:49










                    • $begingroup$
                      @YvesDaoust: If there's no typo, I'm having trouble understanding what you wrote. Do we agree that 5%$ = 5% * $1 = 0.05 * $1 = $0.05?
                      $endgroup$
                      – Vectornaut
                      Feb 22 at 16:53







                    • 1




                      $begingroup$
                      Conversion from percentage expressions to fractions is a standard part of the UK examinations. UK students are expected to be able to convert 40% = 2/5 and make comparisons "which is larger 30% or 1/3?"
                      $endgroup$
                      – James K
                      Feb 22 at 20:57















                    4












                    $begingroup$

                    Well, it really depends. In Chinese schools, students are told that $100%=1,40%=2/5$, so % is a constant. In the UK examination system, it appears that % is treated as a unit. Students are NOT expected to write the above two expressions.



                    However, it is agreed around the world that you should not write something like "$250%$ liters of water".



                    So it is a good idea to think of it as a constant, but not write it as a constant.



                    Other units like cm, mm, kg are like the basis of a vector space or something or the imaginary unit $i^2=1$. The are NOT even like usual numbers because they cannot be added together.






                    share|cite|improve this answer











                    $endgroup$








                    • 1




                      $begingroup$
                      I also leads to incongruities like $5%$ of two hundred Dollars is $5%$$ ?!
                      $endgroup$
                      – Yves Daoust
                      Feb 22 at 13:12







                    • 1




                      $begingroup$
                      @YvesDaoust: Aside from what seems to be typo, I don't see anything wrong with that usage. If I wanted to translate the equation 5% * 15 EUR = 75% EUR into words, I'd say "five percent of fifteen euros is seventy-five percent of a euro," which sounds fine to me. Similarly, I'd read 5% * 20 EUR = 100% EUR as "five percent of twenty euros is one hundred percent of a euro—that is, one whole euro."
                      $endgroup$
                      – Vectornaut
                      Feb 22 at 16:47










                    • $begingroup$
                      @Vectornaut: no typo.
                      $endgroup$
                      – Yves Daoust
                      Feb 22 at 16:49










                    • $begingroup$
                      @YvesDaoust: If there's no typo, I'm having trouble understanding what you wrote. Do we agree that 5%$ = 5% * $1 = 0.05 * $1 = $0.05?
                      $endgroup$
                      – Vectornaut
                      Feb 22 at 16:53







                    • 1




                      $begingroup$
                      Conversion from percentage expressions to fractions is a standard part of the UK examinations. UK students are expected to be able to convert 40% = 2/5 and make comparisons "which is larger 30% or 1/3?"
                      $endgroup$
                      – James K
                      Feb 22 at 20:57













                    4












                    4








                    4





                    $begingroup$

                    Well, it really depends. In Chinese schools, students are told that $100%=1,40%=2/5$, so % is a constant. In the UK examination system, it appears that % is treated as a unit. Students are NOT expected to write the above two expressions.



                    However, it is agreed around the world that you should not write something like "$250%$ liters of water".



                    So it is a good idea to think of it as a constant, but not write it as a constant.



                    Other units like cm, mm, kg are like the basis of a vector space or something or the imaginary unit $i^2=1$. The are NOT even like usual numbers because they cannot be added together.






                    share|cite|improve this answer











                    $endgroup$



                    Well, it really depends. In Chinese schools, students are told that $100%=1,40%=2/5$, so % is a constant. In the UK examination system, it appears that % is treated as a unit. Students are NOT expected to write the above two expressions.



                    However, it is agreed around the world that you should not write something like "$250%$ liters of water".



                    So it is a good idea to think of it as a constant, but not write it as a constant.



                    Other units like cm, mm, kg are like the basis of a vector space or something or the imaginary unit $i^2=1$. The are NOT even like usual numbers because they cannot be added together.







                    share|cite|improve this answer














                    share|cite|improve this answer



                    share|cite|improve this answer








                    edited Feb 22 at 13:22









                    J. W. Tanner

                    3,4601320




                    3,4601320










                    answered Feb 22 at 13:10









                    Holding ArthurHolding Arthur

                    1,211417




                    1,211417







                    • 1




                      $begingroup$
                      I also leads to incongruities like $5%$ of two hundred Dollars is $5%$$ ?!
                      $endgroup$
                      – Yves Daoust
                      Feb 22 at 13:12







                    • 1




                      $begingroup$
                      @YvesDaoust: Aside from what seems to be typo, I don't see anything wrong with that usage. If I wanted to translate the equation 5% * 15 EUR = 75% EUR into words, I'd say "five percent of fifteen euros is seventy-five percent of a euro," which sounds fine to me. Similarly, I'd read 5% * 20 EUR = 100% EUR as "five percent of twenty euros is one hundred percent of a euro—that is, one whole euro."
                      $endgroup$
                      – Vectornaut
                      Feb 22 at 16:47










                    • $begingroup$
                      @Vectornaut: no typo.
                      $endgroup$
                      – Yves Daoust
                      Feb 22 at 16:49










                    • $begingroup$
                      @YvesDaoust: If there's no typo, I'm having trouble understanding what you wrote. Do we agree that 5%$ = 5% * $1 = 0.05 * $1 = $0.05?
                      $endgroup$
                      – Vectornaut
                      Feb 22 at 16:53







                    • 1




                      $begingroup$
                      Conversion from percentage expressions to fractions is a standard part of the UK examinations. UK students are expected to be able to convert 40% = 2/5 and make comparisons "which is larger 30% or 1/3?"
                      $endgroup$
                      – James K
                      Feb 22 at 20:57












                    • 1




                      $begingroup$
                      I also leads to incongruities like $5%$ of two hundred Dollars is $5%$$ ?!
                      $endgroup$
                      – Yves Daoust
                      Feb 22 at 13:12







                    • 1




                      $begingroup$
                      @YvesDaoust: Aside from what seems to be typo, I don't see anything wrong with that usage. If I wanted to translate the equation 5% * 15 EUR = 75% EUR into words, I'd say "five percent of fifteen euros is seventy-five percent of a euro," which sounds fine to me. Similarly, I'd read 5% * 20 EUR = 100% EUR as "five percent of twenty euros is one hundred percent of a euro—that is, one whole euro."
                      $endgroup$
                      – Vectornaut
                      Feb 22 at 16:47










                    • $begingroup$
                      @Vectornaut: no typo.
                      $endgroup$
                      – Yves Daoust
                      Feb 22 at 16:49










                    • $begingroup$
                      @YvesDaoust: If there's no typo, I'm having trouble understanding what you wrote. Do we agree that 5%$ = 5% * $1 = 0.05 * $1 = $0.05?
                      $endgroup$
                      – Vectornaut
                      Feb 22 at 16:53







                    • 1




                      $begingroup$
                      Conversion from percentage expressions to fractions is a standard part of the UK examinations. UK students are expected to be able to convert 40% = 2/5 and make comparisons "which is larger 30% or 1/3?"
                      $endgroup$
                      – James K
                      Feb 22 at 20:57







                    1




                    1




                    $begingroup$
                    I also leads to incongruities like $5%$ of two hundred Dollars is $5%$$ ?!
                    $endgroup$
                    – Yves Daoust
                    Feb 22 at 13:12





                    $begingroup$
                    I also leads to incongruities like $5%$ of two hundred Dollars is $5%$$ ?!
                    $endgroup$
                    – Yves Daoust
                    Feb 22 at 13:12





                    1




                    1




                    $begingroup$
                    @YvesDaoust: Aside from what seems to be typo, I don't see anything wrong with that usage. If I wanted to translate the equation 5% * 15 EUR = 75% EUR into words, I'd say "five percent of fifteen euros is seventy-five percent of a euro," which sounds fine to me. Similarly, I'd read 5% * 20 EUR = 100% EUR as "five percent of twenty euros is one hundred percent of a euro—that is, one whole euro."
                    $endgroup$
                    – Vectornaut
                    Feb 22 at 16:47




                    $begingroup$
                    @YvesDaoust: Aside from what seems to be typo, I don't see anything wrong with that usage. If I wanted to translate the equation 5% * 15 EUR = 75% EUR into words, I'd say "five percent of fifteen euros is seventy-five percent of a euro," which sounds fine to me. Similarly, I'd read 5% * 20 EUR = 100% EUR as "five percent of twenty euros is one hundred percent of a euro—that is, one whole euro."
                    $endgroup$
                    – Vectornaut
                    Feb 22 at 16:47












                    $begingroup$
                    @Vectornaut: no typo.
                    $endgroup$
                    – Yves Daoust
                    Feb 22 at 16:49




                    $begingroup$
                    @Vectornaut: no typo.
                    $endgroup$
                    – Yves Daoust
                    Feb 22 at 16:49












                    $begingroup$
                    @YvesDaoust: If there's no typo, I'm having trouble understanding what you wrote. Do we agree that 5%$ = 5% * $1 = 0.05 * $1 = $0.05?
                    $endgroup$
                    – Vectornaut
                    Feb 22 at 16:53





                    $begingroup$
                    @YvesDaoust: If there's no typo, I'm having trouble understanding what you wrote. Do we agree that 5%$ = 5% * $1 = 0.05 * $1 = $0.05?
                    $endgroup$
                    – Vectornaut
                    Feb 22 at 16:53





                    1




                    1




                    $begingroup$
                    Conversion from percentage expressions to fractions is a standard part of the UK examinations. UK students are expected to be able to convert 40% = 2/5 and make comparisons "which is larger 30% or 1/3?"
                    $endgroup$
                    – James K
                    Feb 22 at 20:57




                    $begingroup$
                    Conversion from percentage expressions to fractions is a standard part of the UK examinations. UK students are expected to be able to convert 40% = 2/5 and make comparisons "which is larger 30% or 1/3?"
                    $endgroup$
                    – James K
                    Feb 22 at 20:57











                    4












                    $begingroup$

                    The percent sign is an abbreviation: just substitute "$colorred%$" by "$colorredcdotfrac1100$", that's all. So for example: $15colorred%=15colorredcdotfrac1100=0.15$. Or the other way round: $1.23=123colorredcdotfrac1100=123colorred%$.






                    share|cite|improve this answer









                    $endgroup$

















                      4












                      $begingroup$

                      The percent sign is an abbreviation: just substitute "$colorred%$" by "$colorredcdotfrac1100$", that's all. So for example: $15colorred%=15colorredcdotfrac1100=0.15$. Or the other way round: $1.23=123colorredcdotfrac1100=123colorred%$.






                      share|cite|improve this answer









                      $endgroup$















                        4












                        4








                        4





                        $begingroup$

                        The percent sign is an abbreviation: just substitute "$colorred%$" by "$colorredcdotfrac1100$", that's all. So for example: $15colorred%=15colorredcdotfrac1100=0.15$. Or the other way round: $1.23=123colorredcdotfrac1100=123colorred%$.






                        share|cite|improve this answer









                        $endgroup$



                        The percent sign is an abbreviation: just substitute "$colorred%$" by "$colorredcdotfrac1100$", that's all. So for example: $15colorred%=15colorredcdotfrac1100=0.15$. Or the other way round: $1.23=123colorredcdotfrac1100=123colorred%$.







                        share|cite|improve this answer












                        share|cite|improve this answer



                        share|cite|improve this answer










                        answered Feb 22 at 14:05









                        Michael HoppeMichael Hoppe

                        11.2k31837




                        11.2k31837





















                            2












                            $begingroup$

                            If you want to think about units or dimensional analysis, then probably it is best to interpret 15% as



                            $$ 15% = fractext$15$ units of Xtext$100$ units of X $$



                            (I would read this as "15 units of X per 100 units of X".) For example, the Wikipedia page on dimensional analysis gives the example of debt-to-GDP ratio.
                            $$ 90% text debt-to-GDP = fractext$90$ dollars of debttextper $100$ dollars of GDP $$



                            Here both the top and bottom are dollars. But they are two different dollar measurements. So even though the percentage is a dimensionless quantity (dollars/dollars), keeping the units in mind may be wise. Similarly



                            $$ 10% text full = fractext$10$ liters of watertextper $100$ liters of container . $$



                            and so on. (edit) So for example, if you want to do a calculation like "How many liters of water are in a 2-gallon container that is 10% full", you do



                            $$ text$2$ gallons of container ~ cdot ~ fractext$3.78$ liters of containertext$1$ gallon of container ~ cdot ~ fractext$10$ liters of watertext$100$ liters of container . $$



                            Of course you could have also done



                            $$ text$2$ gallons of container ~ cdot ~ fractext$10$ gallons of watertext$100$ gallons of container ~ cdot ~ fractext$3.78$ liters of watertext$1$ gallon of water ~ cdot . $$






                            share|cite|improve this answer











                            $endgroup$

















                              2












                              $begingroup$

                              If you want to think about units or dimensional analysis, then probably it is best to interpret 15% as



                              $$ 15% = fractext$15$ units of Xtext$100$ units of X $$



                              (I would read this as "15 units of X per 100 units of X".) For example, the Wikipedia page on dimensional analysis gives the example of debt-to-GDP ratio.
                              $$ 90% text debt-to-GDP = fractext$90$ dollars of debttextper $100$ dollars of GDP $$



                              Here both the top and bottom are dollars. But they are two different dollar measurements. So even though the percentage is a dimensionless quantity (dollars/dollars), keeping the units in mind may be wise. Similarly



                              $$ 10% text full = fractext$10$ liters of watertextper $100$ liters of container . $$



                              and so on. (edit) So for example, if you want to do a calculation like "How many liters of water are in a 2-gallon container that is 10% full", you do



                              $$ text$2$ gallons of container ~ cdot ~ fractext$3.78$ liters of containertext$1$ gallon of container ~ cdot ~ fractext$10$ liters of watertext$100$ liters of container . $$



                              Of course you could have also done



                              $$ text$2$ gallons of container ~ cdot ~ fractext$10$ gallons of watertext$100$ gallons of container ~ cdot ~ fractext$3.78$ liters of watertext$1$ gallon of water ~ cdot . $$






                              share|cite|improve this answer











                              $endgroup$















                                2












                                2








                                2





                                $begingroup$

                                If you want to think about units or dimensional analysis, then probably it is best to interpret 15% as



                                $$ 15% = fractext$15$ units of Xtext$100$ units of X $$



                                (I would read this as "15 units of X per 100 units of X".) For example, the Wikipedia page on dimensional analysis gives the example of debt-to-GDP ratio.
                                $$ 90% text debt-to-GDP = fractext$90$ dollars of debttextper $100$ dollars of GDP $$



                                Here both the top and bottom are dollars. But they are two different dollar measurements. So even though the percentage is a dimensionless quantity (dollars/dollars), keeping the units in mind may be wise. Similarly



                                $$ 10% text full = fractext$10$ liters of watertextper $100$ liters of container . $$



                                and so on. (edit) So for example, if you want to do a calculation like "How many liters of water are in a 2-gallon container that is 10% full", you do



                                $$ text$2$ gallons of container ~ cdot ~ fractext$3.78$ liters of containertext$1$ gallon of container ~ cdot ~ fractext$10$ liters of watertext$100$ liters of container . $$



                                Of course you could have also done



                                $$ text$2$ gallons of container ~ cdot ~ fractext$10$ gallons of watertext$100$ gallons of container ~ cdot ~ fractext$3.78$ liters of watertext$1$ gallon of water ~ cdot . $$






                                share|cite|improve this answer











                                $endgroup$



                                If you want to think about units or dimensional analysis, then probably it is best to interpret 15% as



                                $$ 15% = fractext$15$ units of Xtext$100$ units of X $$



                                (I would read this as "15 units of X per 100 units of X".) For example, the Wikipedia page on dimensional analysis gives the example of debt-to-GDP ratio.
                                $$ 90% text debt-to-GDP = fractext$90$ dollars of debttextper $100$ dollars of GDP $$



                                Here both the top and bottom are dollars. But they are two different dollar measurements. So even though the percentage is a dimensionless quantity (dollars/dollars), keeping the units in mind may be wise. Similarly



                                $$ 10% text full = fractext$10$ liters of watertextper $100$ liters of container . $$



                                and so on. (edit) So for example, if you want to do a calculation like "How many liters of water are in a 2-gallon container that is 10% full", you do



                                $$ text$2$ gallons of container ~ cdot ~ fractext$3.78$ liters of containertext$1$ gallon of container ~ cdot ~ fractext$10$ liters of watertext$100$ liters of container . $$



                                Of course you could have also done



                                $$ text$2$ gallons of container ~ cdot ~ fractext$10$ gallons of watertext$100$ gallons of container ~ cdot ~ fractext$3.78$ liters of watertext$1$ gallon of water ~ cdot . $$







                                share|cite|improve this answer














                                share|cite|improve this answer



                                share|cite|improve this answer








                                edited Feb 22 at 16:06

























                                answered Feb 22 at 16:00









                                usulusul

                                1,7051422




                                1,7051422





















                                    2












                                    $begingroup$

                                    I think of $cdot%$ as an operation that divides the argument by $100$ and multiplies it with the reference value $u$ representing a whole, i. e. $x% = xfracu100$. As such it is actually underdetermined as the reference is implied in the non-mathematical text and not part of the notation.



                                    For example if I give you a $5%$ discount, the reference unit is implied to be your total, which could be $200$$ in this example, in which case $5%=10$$ (note the unit!)



                                    One could write $%^u$ to specify the reference unit, such that in the above example $5%^200$=10$$, although that would not be commonly understood.






                                    share|cite|improve this answer









                                    $endgroup$

















                                      2












                                      $begingroup$

                                      I think of $cdot%$ as an operation that divides the argument by $100$ and multiplies it with the reference value $u$ representing a whole, i. e. $x% = xfracu100$. As such it is actually underdetermined as the reference is implied in the non-mathematical text and not part of the notation.



                                      For example if I give you a $5%$ discount, the reference unit is implied to be your total, which could be $200$$ in this example, in which case $5%=10$$ (note the unit!)



                                      One could write $%^u$ to specify the reference unit, such that in the above example $5%^200$=10$$, although that would not be commonly understood.






                                      share|cite|improve this answer









                                      $endgroup$















                                        2












                                        2








                                        2





                                        $begingroup$

                                        I think of $cdot%$ as an operation that divides the argument by $100$ and multiplies it with the reference value $u$ representing a whole, i. e. $x% = xfracu100$. As such it is actually underdetermined as the reference is implied in the non-mathematical text and not part of the notation.



                                        For example if I give you a $5%$ discount, the reference unit is implied to be your total, which could be $200$$ in this example, in which case $5%=10$$ (note the unit!)



                                        One could write $%^u$ to specify the reference unit, such that in the above example $5%^200$=10$$, although that would not be commonly understood.






                                        share|cite|improve this answer









                                        $endgroup$



                                        I think of $cdot%$ as an operation that divides the argument by $100$ and multiplies it with the reference value $u$ representing a whole, i. e. $x% = xfracu100$. As such it is actually underdetermined as the reference is implied in the non-mathematical text and not part of the notation.



                                        For example if I give you a $5%$ discount, the reference unit is implied to be your total, which could be $200$$ in this example, in which case $5%=10$$ (note the unit!)



                                        One could write $%^u$ to specify the reference unit, such that in the above example $5%^200$=10$$, although that would not be commonly understood.







                                        share|cite|improve this answer












                                        share|cite|improve this answer



                                        share|cite|improve this answer










                                        answered Feb 23 at 15:51









                                        dlrlcdlrlc

                                        14819




                                        14819





















                                            1












                                            $begingroup$

                                            It is not a constant. It can be thought of as a unit if you like, but is probably best thought of as merely a syntax. A phrasing I find effective is to say that they are different spellings of a number.



                                            The reason it is not a constant is because it cannot be used in all situations where a constant could be used. For example, $100x$ cannot be meaningfully written as $fracx%$. Were $%$ to be a constant, that would be a reasonable thing to write. It would be as reasonable as writing $fracxpi$.



                                            You can get away with thinking of percents as units. Like with your approach of treating it as a constant, the math tends to work out. However, it doesn't really work well as a unit in general. While the axiomization of units is still an open problem, it is typically not true that $100 m = 1 fracm%$ or $1 m = 100 mcdot %$. This makes it an awkward sort of unit.



                                            I do see "%" used as a unit from time to time, but it's typically shorthand for a particular percentage. I might see a graph of a chemical reaction efficiency written as "%/mol". Indeed, this is using "%" as a unit, but in such a graph it would really be a shorthand for "percent efficiency of the reaction." The same graph might instead be labeled with "%yield/mol" without really changing the meaning any. In this case, I think it is clear that "%" is not really acting as a unit in the way you might be used to. It's really just a letter, no different than "a" or "q."



                                            Instead, perhaps the most reliable way of treating percents is as an alternate spelling for a number when writing it down. This is a nuanced difference: it suggests that 10% and 0.1 are not just equal, they are in fact merely two ways of writing down the same number. This would be no different than how a programmer might write 0x1F to denote the number 31 in a base-16 notation, how a Chinese person might elect to write 三十一 to denote the same number, or how we might write "thirty one." They are merely different ways of writing the same number.



                                            This is a subtle difference, but sometimes it can be helpful. For example, at some point you will come across the proof that 0.9999.... = 1.0. This proof is very disconcerting at first, because you assume 0.9999... and 1.0 are two distinct numbers, so they could never be equal. But when you really dig into the meaning of that funny little "..." symbol, you discover there's a better way to think of it. "0.9999..." and "1.0" are simply two spellings of the same number. One relies on an infinite series to acquire its meaning, while the other does not, but they mean the same number.






                                            share|cite|improve this answer









                                            $endgroup$

















                                              1












                                              $begingroup$

                                              It is not a constant. It can be thought of as a unit if you like, but is probably best thought of as merely a syntax. A phrasing I find effective is to say that they are different spellings of a number.



                                              The reason it is not a constant is because it cannot be used in all situations where a constant could be used. For example, $100x$ cannot be meaningfully written as $fracx%$. Were $%$ to be a constant, that would be a reasonable thing to write. It would be as reasonable as writing $fracxpi$.



                                              You can get away with thinking of percents as units. Like with your approach of treating it as a constant, the math tends to work out. However, it doesn't really work well as a unit in general. While the axiomization of units is still an open problem, it is typically not true that $100 m = 1 fracm%$ or $1 m = 100 mcdot %$. This makes it an awkward sort of unit.



                                              I do see "%" used as a unit from time to time, but it's typically shorthand for a particular percentage. I might see a graph of a chemical reaction efficiency written as "%/mol". Indeed, this is using "%" as a unit, but in such a graph it would really be a shorthand for "percent efficiency of the reaction." The same graph might instead be labeled with "%yield/mol" without really changing the meaning any. In this case, I think it is clear that "%" is not really acting as a unit in the way you might be used to. It's really just a letter, no different than "a" or "q."



                                              Instead, perhaps the most reliable way of treating percents is as an alternate spelling for a number when writing it down. This is a nuanced difference: it suggests that 10% and 0.1 are not just equal, they are in fact merely two ways of writing down the same number. This would be no different than how a programmer might write 0x1F to denote the number 31 in a base-16 notation, how a Chinese person might elect to write 三十一 to denote the same number, or how we might write "thirty one." They are merely different ways of writing the same number.



                                              This is a subtle difference, but sometimes it can be helpful. For example, at some point you will come across the proof that 0.9999.... = 1.0. This proof is very disconcerting at first, because you assume 0.9999... and 1.0 are two distinct numbers, so they could never be equal. But when you really dig into the meaning of that funny little "..." symbol, you discover there's a better way to think of it. "0.9999..." and "1.0" are simply two spellings of the same number. One relies on an infinite series to acquire its meaning, while the other does not, but they mean the same number.






                                              share|cite|improve this answer









                                              $endgroup$















                                                1












                                                1








                                                1





                                                $begingroup$

                                                It is not a constant. It can be thought of as a unit if you like, but is probably best thought of as merely a syntax. A phrasing I find effective is to say that they are different spellings of a number.



                                                The reason it is not a constant is because it cannot be used in all situations where a constant could be used. For example, $100x$ cannot be meaningfully written as $fracx%$. Were $%$ to be a constant, that would be a reasonable thing to write. It would be as reasonable as writing $fracxpi$.



                                                You can get away with thinking of percents as units. Like with your approach of treating it as a constant, the math tends to work out. However, it doesn't really work well as a unit in general. While the axiomization of units is still an open problem, it is typically not true that $100 m = 1 fracm%$ or $1 m = 100 mcdot %$. This makes it an awkward sort of unit.



                                                I do see "%" used as a unit from time to time, but it's typically shorthand for a particular percentage. I might see a graph of a chemical reaction efficiency written as "%/mol". Indeed, this is using "%" as a unit, but in such a graph it would really be a shorthand for "percent efficiency of the reaction." The same graph might instead be labeled with "%yield/mol" without really changing the meaning any. In this case, I think it is clear that "%" is not really acting as a unit in the way you might be used to. It's really just a letter, no different than "a" or "q."



                                                Instead, perhaps the most reliable way of treating percents is as an alternate spelling for a number when writing it down. This is a nuanced difference: it suggests that 10% and 0.1 are not just equal, they are in fact merely two ways of writing down the same number. This would be no different than how a programmer might write 0x1F to denote the number 31 in a base-16 notation, how a Chinese person might elect to write 三十一 to denote the same number, or how we might write "thirty one." They are merely different ways of writing the same number.



                                                This is a subtle difference, but sometimes it can be helpful. For example, at some point you will come across the proof that 0.9999.... = 1.0. This proof is very disconcerting at first, because you assume 0.9999... and 1.0 are two distinct numbers, so they could never be equal. But when you really dig into the meaning of that funny little "..." symbol, you discover there's a better way to think of it. "0.9999..." and "1.0" are simply two spellings of the same number. One relies on an infinite series to acquire its meaning, while the other does not, but they mean the same number.






                                                share|cite|improve this answer









                                                $endgroup$



                                                It is not a constant. It can be thought of as a unit if you like, but is probably best thought of as merely a syntax. A phrasing I find effective is to say that they are different spellings of a number.



                                                The reason it is not a constant is because it cannot be used in all situations where a constant could be used. For example, $100x$ cannot be meaningfully written as $fracx%$. Were $%$ to be a constant, that would be a reasonable thing to write. It would be as reasonable as writing $fracxpi$.



                                                You can get away with thinking of percents as units. Like with your approach of treating it as a constant, the math tends to work out. However, it doesn't really work well as a unit in general. While the axiomization of units is still an open problem, it is typically not true that $100 m = 1 fracm%$ or $1 m = 100 mcdot %$. This makes it an awkward sort of unit.



                                                I do see "%" used as a unit from time to time, but it's typically shorthand for a particular percentage. I might see a graph of a chemical reaction efficiency written as "%/mol". Indeed, this is using "%" as a unit, but in such a graph it would really be a shorthand for "percent efficiency of the reaction." The same graph might instead be labeled with "%yield/mol" without really changing the meaning any. In this case, I think it is clear that "%" is not really acting as a unit in the way you might be used to. It's really just a letter, no different than "a" or "q."



                                                Instead, perhaps the most reliable way of treating percents is as an alternate spelling for a number when writing it down. This is a nuanced difference: it suggests that 10% and 0.1 are not just equal, they are in fact merely two ways of writing down the same number. This would be no different than how a programmer might write 0x1F to denote the number 31 in a base-16 notation, how a Chinese person might elect to write 三十一 to denote the same number, or how we might write "thirty one." They are merely different ways of writing the same number.



                                                This is a subtle difference, but sometimes it can be helpful. For example, at some point you will come across the proof that 0.9999.... = 1.0. This proof is very disconcerting at first, because you assume 0.9999... and 1.0 are two distinct numbers, so they could never be equal. But when you really dig into the meaning of that funny little "..." symbol, you discover there's a better way to think of it. "0.9999..." and "1.0" are simply two spellings of the same number. One relies on an infinite series to acquire its meaning, while the other does not, but they mean the same number.







                                                share|cite|improve this answer












                                                share|cite|improve this answer



                                                share|cite|improve this answer










                                                answered Feb 22 at 22:05









                                                Cort AmmonCort Ammon

                                                2,451716




                                                2,451716





















                                                    0












                                                    $begingroup$

                                                    I believe you can think of it both ways.



                                                    It’s a symbol for “parts of a hundred” that happens to have a constant value behind it, and at the same time it’s a constant that happens to have a symbolic meaning behind it.






                                                    share|cite|improve this answer









                                                    $endgroup$

















                                                      0












                                                      $begingroup$

                                                      I believe you can think of it both ways.



                                                      It’s a symbol for “parts of a hundred” that happens to have a constant value behind it, and at the same time it’s a constant that happens to have a symbolic meaning behind it.






                                                      share|cite|improve this answer









                                                      $endgroup$















                                                        0












                                                        0








                                                        0





                                                        $begingroup$

                                                        I believe you can think of it both ways.



                                                        It’s a symbol for “parts of a hundred” that happens to have a constant value behind it, and at the same time it’s a constant that happens to have a symbolic meaning behind it.






                                                        share|cite|improve this answer









                                                        $endgroup$



                                                        I believe you can think of it both ways.



                                                        It’s a symbol for “parts of a hundred” that happens to have a constant value behind it, and at the same time it’s a constant that happens to have a symbolic meaning behind it.







                                                        share|cite|improve this answer












                                                        share|cite|improve this answer



                                                        share|cite|improve this answer










                                                        answered Feb 22 at 13:23









                                                        Victor S.Victor S.

                                                        31919




                                                        31919





















                                                            0












                                                            $begingroup$

                                                            I don't think it has a universally agreed nature.(Symbol,constant,or Unit, or else?) Even though it might have had a single nature at the moment it was created, after a long time usage by people, with non-mathematicans as the majority, its nature might be different among different people's point of view.



                                                            In my opinion, I would regard '%' equivalent to the phrase 'out of 100'. That means 15% is read as '15 out of 100' . However, I am pretty sure someone else will have his own interpretation on '%' which leads no contradiction to mine.






                                                            share|cite|improve this answer









                                                            $endgroup$

















                                                              0












                                                              $begingroup$

                                                              I don't think it has a universally agreed nature.(Symbol,constant,or Unit, or else?) Even though it might have had a single nature at the moment it was created, after a long time usage by people, with non-mathematicans as the majority, its nature might be different among different people's point of view.



                                                              In my opinion, I would regard '%' equivalent to the phrase 'out of 100'. That means 15% is read as '15 out of 100' . However, I am pretty sure someone else will have his own interpretation on '%' which leads no contradiction to mine.






                                                              share|cite|improve this answer









                                                              $endgroup$















                                                                0












                                                                0








                                                                0





                                                                $begingroup$

                                                                I don't think it has a universally agreed nature.(Symbol,constant,or Unit, or else?) Even though it might have had a single nature at the moment it was created, after a long time usage by people, with non-mathematicans as the majority, its nature might be different among different people's point of view.



                                                                In my opinion, I would regard '%' equivalent to the phrase 'out of 100'. That means 15% is read as '15 out of 100' . However, I am pretty sure someone else will have his own interpretation on '%' which leads no contradiction to mine.






                                                                share|cite|improve this answer









                                                                $endgroup$



                                                                I don't think it has a universally agreed nature.(Symbol,constant,or Unit, or else?) Even though it might have had a single nature at the moment it was created, after a long time usage by people, with non-mathematicans as the majority, its nature might be different among different people's point of view.



                                                                In my opinion, I would regard '%' equivalent to the phrase 'out of 100'. That means 15% is read as '15 out of 100' . However, I am pretty sure someone else will have his own interpretation on '%' which leads no contradiction to mine.







                                                                share|cite|improve this answer












                                                                share|cite|improve this answer



                                                                share|cite|improve this answer










                                                                answered Feb 22 at 13:26









                                                                Anson NGAnson NG

                                                                23329




                                                                23329





















                                                                    0












                                                                    $begingroup$

                                                                    It's often convenient to write $x%$ for $x/100$. The notation $xy$ is also used for the product of $x$ and $y$ (whether numbers, functions, elements of a group, etc.), and these give the same result if you formally set $% = 1/100$. On the other hand, it would be bizarre to write "$1/%$ is divisible by $5$" or "$% + sqrt% = 0.11$", etc. There's nothing inherently wrong with abusing notation; I have no problem writing $0$ for the integer $0$, the real number $0$, the zero function, the zero element in a vector space, etc. But there's also nothing particularly noteworthy or profound in doing so.






                                                                    share|cite|improve this answer









                                                                    $endgroup$

















                                                                      0












                                                                      $begingroup$

                                                                      It's often convenient to write $x%$ for $x/100$. The notation $xy$ is also used for the product of $x$ and $y$ (whether numbers, functions, elements of a group, etc.), and these give the same result if you formally set $% = 1/100$. On the other hand, it would be bizarre to write "$1/%$ is divisible by $5$" or "$% + sqrt% = 0.11$", etc. There's nothing inherently wrong with abusing notation; I have no problem writing $0$ for the integer $0$, the real number $0$, the zero function, the zero element in a vector space, etc. But there's also nothing particularly noteworthy or profound in doing so.






                                                                      share|cite|improve this answer









                                                                      $endgroup$















                                                                        0












                                                                        0








                                                                        0





                                                                        $begingroup$

                                                                        It's often convenient to write $x%$ for $x/100$. The notation $xy$ is also used for the product of $x$ and $y$ (whether numbers, functions, elements of a group, etc.), and these give the same result if you formally set $% = 1/100$. On the other hand, it would be bizarre to write "$1/%$ is divisible by $5$" or "$% + sqrt% = 0.11$", etc. There's nothing inherently wrong with abusing notation; I have no problem writing $0$ for the integer $0$, the real number $0$, the zero function, the zero element in a vector space, etc. But there's also nothing particularly noteworthy or profound in doing so.






                                                                        share|cite|improve this answer









                                                                        $endgroup$



                                                                        It's often convenient to write $x%$ for $x/100$. The notation $xy$ is also used for the product of $x$ and $y$ (whether numbers, functions, elements of a group, etc.), and these give the same result if you formally set $% = 1/100$. On the other hand, it would be bizarre to write "$1/%$ is divisible by $5$" or "$% + sqrt% = 0.11$", etc. There's nothing inherently wrong with abusing notation; I have no problem writing $0$ for the integer $0$, the real number $0$, the zero function, the zero element in a vector space, etc. But there's also nothing particularly noteworthy or profound in doing so.







                                                                        share|cite|improve this answer












                                                                        share|cite|improve this answer



                                                                        share|cite|improve this answer










                                                                        answered Feb 23 at 1:38









                                                                        anomalyanomaly

                                                                        17.7k42666




                                                                        17.7k42666





















                                                                            0












                                                                            $begingroup$

                                                                            It is just a notation i.e. a way of expressing numbers, e.g.



                                                                            $0.01 = 1% =10^-2 = 1texte-02$



                                                                            nothing more. This is also why it is said to be dimensionless.



                                                                            For example, there would be absolutely nothing wrong in saying that someone is $20$ or $2000%$ years old, unusual admittedly.






                                                                            share|cite|improve this answer











                                                                            $endgroup$

















                                                                              0












                                                                              $begingroup$

                                                                              It is just a notation i.e. a way of expressing numbers, e.g.



                                                                              $0.01 = 1% =10^-2 = 1texte-02$



                                                                              nothing more. This is also why it is said to be dimensionless.



                                                                              For example, there would be absolutely nothing wrong in saying that someone is $20$ or $2000%$ years old, unusual admittedly.






                                                                              share|cite|improve this answer











                                                                              $endgroup$















                                                                                0












                                                                                0








                                                                                0





                                                                                $begingroup$

                                                                                It is just a notation i.e. a way of expressing numbers, e.g.



                                                                                $0.01 = 1% =10^-2 = 1texte-02$



                                                                                nothing more. This is also why it is said to be dimensionless.



                                                                                For example, there would be absolutely nothing wrong in saying that someone is $20$ or $2000%$ years old, unusual admittedly.






                                                                                share|cite|improve this answer











                                                                                $endgroup$



                                                                                It is just a notation i.e. a way of expressing numbers, e.g.



                                                                                $0.01 = 1% =10^-2 = 1texte-02$



                                                                                nothing more. This is also why it is said to be dimensionless.



                                                                                For example, there would be absolutely nothing wrong in saying that someone is $20$ or $2000%$ years old, unusual admittedly.







                                                                                share|cite|improve this answer














                                                                                share|cite|improve this answer



                                                                                share|cite|improve this answer








                                                                                edited Feb 25 at 19:34

























                                                                                answered Feb 22 at 22:54









                                                                                keepAlivekeepAlive

                                                                                178110




                                                                                178110





















                                                                                    0












                                                                                    $begingroup$

                                                                                    It's a postfix operator. A function written after the argument, $x%=x/100$, instead of before the argument as in normal prefix notation $f(x)$ or $Delta x$.






                                                                                    share|cite|improve this answer









                                                                                    $endgroup$

















                                                                                      0












                                                                                      $begingroup$

                                                                                      It's a postfix operator. A function written after the argument, $x%=x/100$, instead of before the argument as in normal prefix notation $f(x)$ or $Delta x$.






                                                                                      share|cite|improve this answer









                                                                                      $endgroup$















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                                                                                        $begingroup$

                                                                                        It's a postfix operator. A function written after the argument, $x%=x/100$, instead of before the argument as in normal prefix notation $f(x)$ or $Delta x$.






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                                                                                        $endgroup$



                                                                                        It's a postfix operator. A function written after the argument, $x%=x/100$, instead of before the argument as in normal prefix notation $f(x)$ or $Delta x$.







                                                                                        share|cite|improve this answer












                                                                                        share|cite|improve this answer



                                                                                        share|cite|improve this answer










                                                                                        answered Feb 27 at 4:27









                                                                                        LehsLehs

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