Question

To determine which statement is NOT true, we need to analyze the information provided, using the point (6.5, 26) as a reference. The data likely indicates a time of 6.5 minutes and a temperature of 26 degrees.

1. **Option 1**: "The temperature of the liquid is increasing at a constant rate."
- If the graph shows a straight line, this statement would be true. If it shows variations in temperature change over time, it may be false.

2. **Option 2**: "At this rate, the temperature will rise 60° in a quarter hour."
- A quarter hour is 15 minutes. If the rate can be found from the graph, you can check whether the temperature increases by 60° over 15 minutes.

3. **Option 3**: "The temperature of the liquid changed at a unit rate of 4° per minute."
- To check this, determine the slope of the line if it's a straight line, which is the rise over run. From the point provided (6.5, 26), we need more data points or the slope of the graph to confirm this.

4. **Option 4**: "At this rate, it would take less than 10 minutes for the temperature of the liquid to rise 52°."
- If the determined rate and the temperature change is used to calculate time, you can check this.

To conclude, without actual numerical data from the graph beyond the single point (6.5, 26), we can follow the statements logically:

- If the temperature is indeed changing at a constant rate as suggested, options may be verifiable.
- If the calculated temperature rise (based on these options and the graph) contradicts any one of the statements, that one would be false.

If you can find the slope or confirm temperature changes directly from the graph data, it would clearly show which statement doesn't hold true. Without the actual graph data or numbers to confirm the rate, a specific conclusion cannot be drawn. However, you may find that Option 2 or Option 4 doesn't line up well if the rate is less than what they assume. Therefore, the overall best approach is to do numerical calculations based on the precise slope from the graph.