I'm not of the great mathematician but I think you should pick 2/3 of 50. THere is high probability that at least two people will choose the same number (birthday paradox) and suppose a class is based upon 30 typical nyc high students. None of them knows about averages, suppose most of them don't think. Let's draw 6 random sets of numbers between 1-100 (that's what they would choose if they don't think, but don't want to disrupt the fun either so all of them are serious about this and they choose whatever comes to mind, there's also high probability that most of them would choose 50 - believe me) all already arranged from smallest to greatest.
\indent\(\pmb{A=\{2,8,12,12,16,16,18,19,24,29,30,43,54,}\\<br />
\pmb{55,59,59,60,60,62,69,75,80,82,82,82,86,}\\<br />
\pmb{87,89,94,99\}}\)
\indent\(\pmb{B=\{1,4,8,19,20,23,25,25,27,38,38,39,44,}\\<br />
\pmb{46,55,57,60,60,61,64,65,67,69,74,84,88,}\\<br />
\pmb{88,94,94,98\}}\)
\indent\(\pmb{C=\{2,9,9,11,17,17,21,21,23,23,26,30,37,}\\<br />
\pmb{37,39,41,41,49,52,54,54,56,58,60,65,68,}\\<br />
\pmb{69,80,81,99\}}\)<br />
\indent\(\pmb{D= \{2,2,5,10,11,26,32,43,43,44,44,47,47,}\\<br />
\pmb{49,55,55,61,62,64,64,70,75,79,80,81,84,}\\<br />
\pmb{86,92,97,100\}}\)<br />
\indent\(\pmb{E=\{11,12,14,15,19,19,26,30,32,36,38,46,}\\<br />
\pmb{47,48,53,55,59,61,62,69,72,74,75,75,75,}\\<br />
\pmb{76,78,81,85,97\}}\)
\indent\(\pmb{F=\{2,3,3,14,14,20,28,40,40,45,54,54,62,}\\<br />
\pmb{63,67,68,71,73,73,75,76,80,80,81,83,86,}\\<br />
\pmb{88,90,97,98\}}\)now let's find avarages of all of them
Avg. Set A = 521/10 ~ 52
Avg. Set B = 307/6 ~ 50
Avg. Set C = 1249/30 ~ 42
Avg. Set D = 1610/30 ~ 53
Avg. Set E = 1540/30 ~ 51
Avg. Set F = 1728/30 ~ 57
Avg. of Sets ~50
As I said It's all about ordinary high school students who tend to choose numbers at random. You can also study the theory of human brain and behavior. If for example the prize would be a computer, most of them would choose 50, doesn't need an explanation I think why. However if you are to ask thinking nyc high school students like from Bronx high school of science or something, you would have to choose about 2/3 of 2/3 of 50 and again if you would be to ask harvard college students and give them some time you would have to choose 2/3 of 2/3 of 2/3 of 50 probably since most of them would come to the conclusion of 2/3 of 50.
Thanks, and I'm looking for improovement on this nice problem.
