Answer
See below
Work Step by Step
The equation in standard form: $4x-11y^2=0\\y^2=\frac{4}{11}x$
Identify the focus, directrix, and axis of symmetry. The equation has the form $y^2=4px$ where $p=\frac{1}{11}$. The focus is $(\frac{1}{11},0)$. The directrix is $x =-p=-\frac{1}{11}$. Because $y$ is squared, the axis of symmetry is the x-axis.
Find some values and plot points:
$x=1 \rightarrow y=\pm 0.6\\x=2 \rightarrow y=\pm 0.85\\x=3 \rightarrow y=\pm 1.04\\x=4 \rightarrow y=\pm 1.21\\x=5 \rightarrow y=\pm 1.35$
