Final answer:
The question describes two vector displacements while walking: the initial 33m north movement and a subsequent turn by 60 degrees. These movements can be analyzed using the graphical technique for adding vectors to determine resultant displacement in physics.
Step-by-step explanation:
The directional movements involved when walking 33m to the north and then turning 60 degrees are essentially two vector displacements. Walking north means moving in a straight line towards the North Pole relative to your current position within the context of a standard geographic coordinate system. A turn by 60 degrees from this direction implies changing your vector of movement by this angle either to the left or the right, usually assuming a clockwise direction unless specified otherwise. These movements can be described using vector addition in physics, where each displacement represents a vector with both magnitude (distance walked) and direction (the angle relative to a reference direction).
In physics problems, one common approach to finding a person's resultant displacement after a series of movements like this would be to use the graphical technique for adding vectors. You would draw each leg of the walk as an arrow on a graph, with the length of the arrow representing the distance walked and the angle of the arrow representing the directional component. The final displacement would be the vector resulting from the sum of these individual vectors, and could be calculated using trigonometric functions if more precision is needed.