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I am very bad at mathematics, so apologies in advance. My confusion comes from the voting system on an online poll. Example video (Picked at random): http://www.funnyordie.com/videos/4d0ac00700/youre-pitiful-weird-al-yankovic-ver-1-from-insane_ian

The percentage is 71%, meaning that some combination of "funny" or "die" votes added up to that. If 10 out of 100 people voted "funny" it would be easy to say that the percentage who thought it was funny is 10%, I am wondering how the number is derived taking both into account.

Hopefully I worded this correctly. I have a feeling it is something simple that I just don't remember. Thanks. I'm not sure what to tag this with, so I'm taking my best guess. Sorry if that's wrong.

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    You add up the number of people who voted "funny", and the number of people who voted "die". This gives you a total $X$. You take the number of people who voted overall; this is a total $Y$. To compute the percentage of people who voted $X$ you compute $100X/Y$.2012-06-22
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    Thank you for the reply Arturo. I'm still not clear though, wouldn't the number of people who voted "funny" and those who voted "die" (which you say is X) be the same as Y?2012-06-22
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    I don't know what all the options are. If $Y$ people voted (for *anything*, whether "funny", "die", or something else), and $X$ voted for either "funny" or "die", then the percentage of people who voted for either funny or die from among those who voted is $100X/Y$. If everyone who voted voted for *either* "funny" or "die", then $X=Y$, and the percentage is, of course, 100% (of all the people who voted in the last election, how many people cast a vote? 100%). But if there are other options (including abstensions), then in general you will have $X\leq Y$, with $X\lt Y$ possible.2012-06-22
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    Thanks for the clarification. For the purposes of this calculation I was wondering about restricting it to only two options. Sorry, forgot to shift+enter. So 100X/Y (Does that mean 100 * (X/Y)?) is good for an unknown amount of options, but what works for just two?2012-06-22
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    First, $(100X)/Y$ gives the same answer as $100*(X/Y)$. Second: if you want to know what percentage $X$ things are out of $Y$, then you compute $100X/Y$. So, to find out what percentage 74 is out of 87, you compute $100(74)/87 \approx 85.06\%$. Doesn't matter how you get the $X$, it just matters how much it is. You can restrict to whatever options you want to compute $X$, the point is that you need to know both how many "good" items you have ($X$), and how many items *overall* there are ($Y$).2012-06-22
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    Thanks @ArturoMagidin Regarding your first point, I was trying to understand your shorthand. For the second point, I think we might be talking about two different things. On the website referenced, there are two different voting options. My question is how to derive one percentage by calculating the sum of both options together. So X would equal Y in my scenario. There is no overall outside of "good" items. That's where the confusion for me comes in.2012-06-22
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    I don't see any totals or any percentages in the website you pointed to. I have, officially, no idea whatsoever what you are talking about, and no clue. "The percentage is 71%". The percentage of **what**? The percentage of people who did **what**? Just saying "71%" doesn't mean anything.2012-06-22
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    Sorry about the ambiguity, but if you view the site and look below the video you will see the voting options and the percentage in the middle. Flash player might be required.2012-06-22

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