We need to find the current ix where Gm = 0.2 S. What I've done so far if created two equations using node voltage.
Eq. 1 : Vx/330 - 440ix/330 -ix +gmVx = 0
Eq. 2 : 50Vx/1200 + 50ix - 50gmVx + Vx = 5.6
Matrix (Ax=B) looks like this:
A = (1/330)+.2 (-440/330) - 1
(1/24)-50(.2)+1 50
x = Vx
ix
B = 0
5.6
Did I do this correctly? If not, what should I do?
May as well write it out.
Writing outward spilling currents on the left, inward spilling currents on the right, I get:
$$\begin{align*} \frac{V_X}{50\:\Omega}+\frac{V_X}{330\:\Omega}+\frac{V_X}{1.2\:\textrm{k}\Omega}&=\frac{5.6\:\textrm{V}}{50\:\Omega}+\frac{V_Y}{330\:\Omega}\\\\ \frac{V_Y}{330\:\Omega}+\frac{V_Y}{440\:\Omega}&=\frac{V_X}{330\:\Omega}+g_m\cdot V_X\\\\&=V_X\cdot\left(g_m+\frac{1}{330\:\Omega}\right)\\\\ &\therefore\\\\ \left(\frac{1}{50\:\Omega}+\frac{1}{330\:\Omega}+\frac{1}{1.2\:\textrm{k}\Omega}\right)\cdot V_X-\frac{1}{330\:\Omega}\cdot V_Y&=\frac{5.6\:\textrm{V}}{50\:\Omega}\\\\ -\left(g_m+\frac{1}{330\:\Omega}\right)\cdot V_X+\left(\frac{1}{330\:\Omega}+\frac{1}{440\:\Omega}\right)\cdot V_Y&=0\:\textrm{A} \end{align*}$$
Just solve the above matrix.
