Equation of the line that is perpendicular to \displaystyle{5}{y}+{3}{x}={8} and passing through \displaystyle{\left({4.6}\right)} is \displaystyle{5}{x}-{3}{y}-{2}={0} ...

You seem to be getting the hang of Lagrange multipliers, so here's another approach that works nicely because we're lucky with the constraint. Saying that 4x^2 + 2y = 48 is equivalent to saying that ...

KillerBunny Apr 4, 2015 First of all, let's study where the equation holds: you have \displaystyle{y}-{4}={x}-{6}\Leftrightarrow{y}={x}-{2} . This is the equation of a line, which you ...

seph Oct 25, 2014 [1] \displaystyle{y}=-{2}{x}-{4} [2] \displaystyle{y}+{4}=-{2}{x} If you isolate \displaystyle{y} in [2], the resulting equation is equal to [1] \displaystyle{y}+{4}=-{2}{x} ...

Indeed, xy=C and \sin(xy)=C characterize the same family of curves. For example \sin(xy)=0 is the curves xy=k\pi , k\in\mathbb{Z} .

The solution is done in two steps. First , diagonalise the linear system. We denote by \mathbf{U}=[u;v;w]. The original system becomes \partial_x\mathbf{U}+M\partial_y\mathbf{U}=0, where M=\begin{pmatrix} 1 & 1 & 0\\ 1 & 2 & 1\\ 0 & 1 & 1 \end{pmatrix}. ...