To interpret the graph based on the provided information, we need to analyze the coordinates on the axes. The x-axis, labeled 'Time', represents time in minutes, while the y-axis, labeled 'Distance', represents distance in miles from Rania’s home to her workplace.
To determine how long it takes Rania to get home, we need to find the point on the graph where the distance from her workplace to home is 0 miles (indicating she has arrived home).
Since we do not have the actual graph in front of us, we rely on reasoning about the potential distances and times she might have traveled based on the options given.
If we assume that Rania starts at work (which would be at the maximum distance shown on the y-axis) and travels towards home:
- If the graph shows she arrives home at 35 minutes, the distance would drop to 0 at that point.
- Similarly, if she arrived home at 40 minutes, she would reach 0 distance at that time.
Typically, the first distances she would be covering would be immediately evident on the graph where the distance crosses the x-axis (i.e., where distance reaches 0 miles).
Without the actual data from the graph or specific details on those plotted points, based solely on typical patterns and options given, many people would conclude that 35 minutes is likely the answer, as it represents a common time frame for completing a trip that involves a stop (which could also account for time spent at the grocery store).
So, after interpreting the situation and the likely candidates based on usual patterns, the answer would be 35 minutes.