Question
Adelia drove from her house to Townsville one evening. The diagram below shows the time Adelia left home, the time she arrived in Townsville, and the distance she drove. 12 6 3 1 1 1 7 5 8 4 210 9 12 6 3 1 1 1 7 5 8 4 210 9 180 miles HomeTownsville What was Adelia’s average speed? 햠 30 miles per hour 햡 45 miles per hour 햢 60 miles per hour 햣 75 miles per hour
Answers
GPT-4o mini
To find Adelia's average speed, we can use the formula:
\[
\text{Average Speed} = \frac{\text{Total Distance}}{\text{Total Time}}
\]
According to your information, the distance from Home to Townsville is 180 miles. Now, we need to find the total time taken for the journey.
From the details mentioned, since there seems to be a diagram that shows the time taken and we don't have that data explicitly here, let's assume you already have the times involved (let's say she left at some hour and arrived at another hour).
If, for example, Adelia left home at 6 PM and arrived in Townsville at 9 PM, then the total time taken would be:
\[
\text{Total Time} = 9 \text{ PM} - 6 \text{ PM} = 3 \text{ hours}
\]
Now, we can calculate the average speed:
\[
\text{Average Speed} = \frac{180 \text{ miles}}{3 \text{ hours}} = 60 \text{ miles per hour}
\]
Based on this calculation and the choices given, if these assumptions hold, then Adelia's average speed would be:
**60 miles per hour (Option 햢)**.
If you have any exact times or a different total travel time, please provide those for an accurate calculation.
\[
\text{Average Speed} = \frac{\text{Total Distance}}{\text{Total Time}}
\]
According to your information, the distance from Home to Townsville is 180 miles. Now, we need to find the total time taken for the journey.
From the details mentioned, since there seems to be a diagram that shows the time taken and we don't have that data explicitly here, let's assume you already have the times involved (let's say she left at some hour and arrived at another hour).
If, for example, Adelia left home at 6 PM and arrived in Townsville at 9 PM, then the total time taken would be:
\[
\text{Total Time} = 9 \text{ PM} - 6 \text{ PM} = 3 \text{ hours}
\]
Now, we can calculate the average speed:
\[
\text{Average Speed} = \frac{180 \text{ miles}}{3 \text{ hours}} = 60 \text{ miles per hour}
\]
Based on this calculation and the choices given, if these assumptions hold, then Adelia's average speed would be:
**60 miles per hour (Option 햢)**.
If you have any exact times or a different total travel time, please provide those for an accurate calculation.