Suppose that we have a solution x(t),y(t) to x'=f(x,y) y'=g(x,y). Define \tilde f(t) to satisfy the differential equation \tilde f'(t)=h(x(\tilde f(t)),y(\tilde f(t))). Notice that, ...

In 1-D, it is called a direction field plot. In higher dimensions, it is called a phase portrait and these two sets of notes 1 and notes 2 provide a procedure for sketing it by hand. We look at ...

\begin{align} 3x+4y &\equiv 2 \bmod 13 \tag{1}\\ 2x+6y &\equiv 1 \bmod 13 \tag{2}\\ 10x+30y &\equiv 5 \bmod 13 \tag{3 [5\times(2)]}\\ 10x+4y &\equiv 5 \bmod 13 \tag{4}\\ 13x+8y &\equiv 7 \bmod 13 \tag{5 [(1)+(4)]}\\ 8y &\equiv 7 \bmod 13 \\ y &\equiv 9 \bmod 13 \tag{6}\\ \hline 2x+54 &\equiv 1 \bmod 13 \tag{7 [(6) ...

Great to see you are interested in Gaussian Processes! First off if you want an in depth read about using GPs I would refer you to GPML , but I should be able to answer your question in this post. ...

x_2(t)=x_2(0)e^{\frac12t^2} and x_1'(t)=x_2(t) implies x_1(t)=x_1(o)+x_2(0)\int_0^t e^{\frac12x^2}dx

The best solution I have found is from the text "Extended Surface Heat Transfer" by Allan D. Kraus in Appendix A. "Recognizing J_\nu(ix) to be a solution..., and seeking only particular solutions of ...