Sorry for the incorrect formatting, my first time posting here.
So I've got the following question - the probability of A is 0.2. Given 5000 trials, what will be the variation from the expected outcome (which is 1000 as far as I understand) with the probability of 0.9128?
I had to ideas - if we assume this falls under the Gaussian distribution then the probability of 0.9128 would mean we have to check the normal distribution tables to find t for Ψ(t) = 0.4564 (since the curve is symmetrical), get the corresponding outcome from t.
But then again shouldn't this scenario fall under the binomial distribution? Then I guess I should find the correct k via the Bernoulli formula, but then I get an equation with k factorial and k in the exponent, which I cant solve.
Given that I'm not simply asking to do everything in my place, and have provided the options I came down to, can anyone advise me what is the correct solution to this?
UPDATE
I really should learn Latex, but in the mean time from the link in the comments I assume what I need is:
z = 1.71 (since error in my case is 0.0872, 1 - 0.0872 / 2 = 0,9564 and from the table the corresponding z value is 1.71)
1.71 * sqrt(0.16/5000) = 0.00967
and the variation then is (0.2 +/- 0.00967) * 5000. Did I get this correctly?
Am I correct?
