The two skew lines ${\mathfrak{L}}_1$ and ${\mathfrak{L}}_2$

The goal is to show why a plane cannot be determined by two skew lines.

Use the skew line definition to demonstrate the effect.

If the lines do not intersect or are not parallel, they are skewed.

The lines ${\mathfrak{L}}_1$ and ${\mathfrak{L}}_2$ are skew. It means that lines ${\mathfrak{L}}_1$ and ${\mathfrak{L}}_2$ neither intersect nor are parallel.

The lines in a plane either intersect or run parallel to one another.

Therefore, if the lines ${\mathfrak{L}}_1$ and ${\mathfrak{L}}_2$ are skew; they are not in a single plane.

That's why two skew lines don't determine a plane.