Your flaw is that you are assuming the result to begin your proof. Here is a simple approach: \dfrac 1n +n\ln\left(1+\frac 1n\right)>\frac 1n+\frac{n}{n+1} = \dfrac{n^2+n+1}{n^2+n}>1. Now, check ...

Firstly, consider the event D=\{\text{a student has birthday either in November or December}\}. Then it is true that p = p(D) = \dfrac{2}{12}. As for me, my suggestion is to approach this problem ...

Of course, \beta and \gamma have to be independent, otherwise the claim is false. Sketch: Denote A_t = e^{\beta_t}, Z_t = x+\int_0^t e^{-\beta_s}d\gamma_s. By Ito's formula, dY_t = Z_t dA_t + A_t dZ_t + d[Z,A]_t = Z_t A_t \Big(d\beta_t + \frac12dt\Big)+A_te^{-\beta_t}d\gamma_t \\ =Y_td\beta_t + d\gamma_t + \frac12 Y_t dt. ...

Let X_i be an indicator variable, equal to 1 if the die shows 2 or 3 on the i-th throw, and zero if it shows neither 2 nor 3. The event of interest is \mathcal{E}_k = \{ X_1 = 0, \ldots, X_{k-1}=0, X_k=1 \} ...

This is too long for a comment. You could have done the first steps faster using logarithmic differentiation P = {RT\over V - b}e^{-\frac a {RTV}}\implies \log(P)=\log(RT)-\log(V-b)-\frac a {RTV} ...

\begin{align*}u=&x&u'=&1\\v'=&xe^{-x^2/b^2}&v=&-\frac{b^2}{2}e^{-x^2/b^2}\end{align*}\;\;\;\;\;\;\Longrightarrow \Longrightarrow \int_0^\infty x^2e^{-x^2/b^2}dx=\left.-\frac{b^2x}{2}e^{-x^2/b^2}\right|_0^\infty+\frac{b^2}{2}\int^\infty_0e^{-x^2/b^2}dx=\frac{b^3}{2}\sqrt\frac{\pi}{2} ...