Find the solution of the system of equations. \[ \begin{array}{c}-9 x-5 y=-18 \\ 4 x+5 y=33\end{array} \]

To solve the system of equations: 1. We have the equations: \[ -9x - 5y = -18 \quad (1) \] \[ 4x + 5y = 33 \quad (2) \] 2. Let's add the two equations to eliminate \(y\): \[ -9x - 5y + 4x + 5y = -18 + 33 \] Simplifying this, we get: \[ -9x + 4x = -18 + 33 \] \[ -5x = 15 \] \[ x = -3 \] 3. Now, we substitute \(x = -3\) into one of the original equations, let's use equation (2): \[ 4(-3) + 5y = 33 \] This simplifies to: \[ -12 + 5y = 33 \] \[ 5y = 45 \] \[ y = 9 \] Thus, the solution to the system of equations is \(x = -3\) and \(y = 9\), or as an ordered pair: \((-3, 9)\).