Consider g_t(s)=λ\cos(λ(s-t))y(s)-\sin(λ(s-t))y'(s). Its derivative is g_t'(s)=-\sin(λ(s-t))g(s,u(s)) and thus by the fundamental theorem of calculus λy(t)-[λ\cos(λt)y(0)+\sin(λt)y'(0)]=g_t(t)-g_t(0)=\int_0^tg_t'(s)\,ds =\int_0^t\sin(λ(t-s))g(s,u(s))\,ds. ...

Your problem is that it should be: p_{n} = \frac{1}{n+1}\left(1-(p_1+p_2+\cdots+p_{n-1})\right) This is the sort of problem where you should pretend to game continues forever, and instead ask what ...

I believe the number of samples is just n^k : at the end we can have any k -sequence of values from a set of size n . So, to be clear, (1,2) and (2,1) count as different outcomes, ...

Looks good. Your answers are correct! Nice work. You could also algebraically solve for n in (a), though I agree the solution seems "obvious": n(n-1) = 72 \iff n^2 - n - 72 = 0 \iff (n-9)(n+8) = 0 \iff n = 9, n=-8 ...

If s is a nontrivial zero of \zeta off the critical line then the four numbers \{s,\bar{s},1-s,1-\bar{s}\} would all be nontrivial zeros off the line. Note 1-\bar{s} is the image of s across ...

The only dubious thing I can see is the introduction of the equation \cot x = \cot y; this appears problematic since (i.) the cotangent functions have singularities in (-\pi, \pi); and (ii.) I can ...