Using the perpendicular transversal theorem and its converse, we can conclude that the diagram is valid when a and c are perpendicular to b and d. This means that the angle of measure (x+38)\degree needs to be a right angle.

To find the value of x that makes the diagram valid, we let:

x+38=90

Solving this equation gives us x=52, which is when the diagram will be valid.

The directions East and North are perpendicular, so Urbana wants to find the direction that is perpendicular to when she is facing the yellow flag.

Since Urbana knows when she looking directly East, she can draw a line in the sand that points East.

Urbana can draw two arcs centered at different points on the line. One way that Urbana can ensure that the arcs keep a consistent radius is to pin one end of a towel to the center point and draw an arc in the sand at the other end of the towel. The length of the towel will act as a consistent radius for the arc.

To find the line that points directly North from the bags, she must draw the arcs so that they pass through the location of the bags. She must also choose points on the line that are close enough for the arcs to intersect at two distinct points.

The line which passes through the two points of intersection of the arcs will run directly in the North-South directly. Using this line to guide her, Urbana can move directly North to find the treasure.

When sketching out the scenario, you will notice that the East-facing line that Urbana constructs at the start should not pass through the location of the bags. This is because doing so makes it impossible to construct two arcs that both pass through the bags and also have two distinct points of intersection.