\documentclass[a4paper,12pt]{article}
\usepackage{epsfig}
\newcommand{\un}{\underline}
\begin{document}
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\begin{center}
\textbf{Vector Fields}

\textit{\textbf{Scalar and Vector Fields}}
\end{center}

\textbf{Question}

Sketch the following plane vector field and determine its field
lines.

$\un{F}(x,y) = \nabla \ln (x^+y^2)$


\textbf{Answer}

$\un{F}(x,y) = \nabla \ln (x^+y^2)$

$\begin{array}{l}
\textrm{The field lines satisfy }\frac{dx}{x} =\frac{dy}{y}.\\
\textrm{Thus they are radial lines }\\
y=Cx \ \ (\rm{and} \ x=0)
\end{array}
\ \ \ \ \
\begin{array}{c}
\epsfig{file=VF-1A-7.eps, width=40mm}
\end{array}$

\end{document}