Microsoft Math Solver

There's a factor of 2 missing. Generally, 1 + e^{2i\varphi} = e^{i\varphi}(e^{-i\varphi} + e^{i\varphi}) = e^{i\varphi}\cdot 2\cos \varphi since \cos \varphi = \frac{e^{i\varphi} + e^{-i\varphi}}{2}.

Jerrel, Justin has given a correct answer but there is more to your question.   As Justin says, e is the 'confidence level' in % - 1. That is not the same as the 'margin of error' (such as you see ...

If you are trying to find the minimum vertical distance, then your method is correct, but your answer is not. However, you do not seem to have a firm grip on the problem. You seem to be hand waving ...

It's a bit hard to see in this typography, but the two p are supposed to be different. The p on the l.h.s. is the four-momentum p = (p^0,p^1,p^2,p^3)^T, the one on the r.h.s is the three-momentum \vec p = (p^1,p^2,p^3)^T ...

Those substitutions work because f(x)=(1+1/x)^x is an increasing function for x>0. If f(x) is monotone and \lim\limits_{n\to\infty}f(n)=L then for every divergent sequence a_n (that is \lim\limits_{n\to\infty}a_n=+\infty ...

One way to look at this (I am not claiming that is the best ...) is to realize A as either \frac{{\Bbb R}[X]}{(X^2)}\qquad\text{or}\qquad \frac{{\Bbb R}[X]}{(X^2-1)} and use the following ...