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Is it correct to calculate the standard deviation of percentages/proportions as you would for four numbers (i.e. non-percentages)?

Thanks for your help @user2974951 @whuber and @asdf. Yes, you're right I was alluding to using the common SD formula. To explain further, my four percentages are from an experiment where we measured the uptake of a chemical by 4 plants. Each plant took up between 40% and 55% of what was applied, therefore the percentage can't ever be >100%. So, if I understand correctly I will need to use the proportion SD which is different to the common SD formula? Thanks for the link to the thread @user2974951

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  • $\begingroup$ Yes. 55% is just 0.55. You can also think in absolute numbers: 1st plant ate 55 g, 2nd 52 g, etc., out of 100 g applied. On average, they ate 53.7 g. Each had the same amount to begin with (100 g), so the average proportion is 53.7/100 = 0.537 = 53.7%. $\endgroup$
    – corey979
    Commented Feb 20, 2019 at 9:03
  • $\begingroup$ Thanks corey979. I guess the question I was wondering is, can you calculate the standard deviation of these four percentages? Or would that be statistically incorrect? $\endgroup$
    – Andrew
    Commented Feb 21, 2019 at 5:43
  • $\begingroup$ @Andrew You can do that, as for whether it is sensible is another matter. SD is really only sensible when you have a normally distributed variable. In your case that seems to be the case. $\endgroup$
    – user2974951
    Commented Feb 21, 2019 at 8:38
  • $\begingroup$ Please register &/or merge your accounts (you can find information on how to do this in the My Account section of our help center), then you will be able to edit & comment on your own question. $\endgroup$
    – gung - Reinstate Monica
    Commented Feb 21, 2019 at 12:26
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    $\begingroup$ @user2974951 SD makes sense, period. It's just a statistic and has nothing inherently to do with normality. $\endgroup$
    – whuber
    Commented Feb 21, 2019 at 13:28

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It depends. If you are just expressing a number that can take any value as a percent (for example, relative growth of number of sales), then go ahead! -15% is just -0.15, 133% is just 1.33 and so on.

However, if what you're dealing with is a proportion (as in "73% of students passed the test, ie: a value between 0% and 100%), then you should calculate standard deviation from the binomial distribution, in other words, for a population of n and a proportion of p (measured from 0 to 1), your variance is np(1-p), and your standard deviation is the square root of that number

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    $\begingroup$ In the proportion case there might be overdispersion, in which case the binomial standard deviation would be to small. $\endgroup$
    – kjetil b halvorsen
    Commented Jun 23, 2020 at 16:10

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