Under constant acceleration, we have average velocity [tex]\bar v[/tex] over a time interval of duration [tex]\Delta t[/tex] satisfying
[tex]\bar v=\dfrac{v+v_0}2=\dfrac{x-x_0}{\Delta t}[/tex]
where [tex]x_0,v_0[/tex] are the plane's initial position and velocity (respectively) and [tex]x,v[/tex] are the plane's position and velocity (respectively) after 9.00 seconds. So
[tex]\dfrac{v+0\,\frac{\mathrm m}{\mathrm s}}2=\dfrac{330\,\mathrm m-0\,\mathrm m}{9.00\,\mathrm s}\implies v=73.3\,\dfrac{\mathrm m}{\mathrm s}[/tex]
