To determine which point could be on the line that Chung-Li drew, we need to infer the relationship between the number of slices of strawberries and the number of slices of bananas. Since the details of the ingredients for each number of cupcakes are not provided, we can analyze the given points for any linear relationship.
We have the following points:
- (1, 3)
- (3, 2)
- (2, 3)
- (1, 2)
Let's look for a possible linear relationship or pattern in these points. We can check if there is a consistent slope between any two points:
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From (1, 3) to (3, 2):
- Change in x: 3 - 1 = 2
- Change in y: 2 - 3 = -1
- Slope = (-1)/2 = -0.5
-
From (1, 2) to (2, 3):
- Change in x: 2 - 1 = 1
- Change in y: 3 - 2 = 1
- Slope = (1)/1 = 1
-
From (2, 3) to (3, 2):
- Change in x: 3 - 2 = 1
- Change in y: 2 - 3 = -1
- Slope = (-1)/1 = -1
Since the slope varies among the points, we can't definitively conclude which point lies on the line without the specific linear equation or graph. However, if we see that the relationship might show a trend of decreasing banana slices as strawberry slices increase, we might favor the points (1, 2) and (1, 3).
For the best assumption based on usual patterns, the point (1, 2) would suggest fewer bananas for a small amount of strawberries.
Since we need to pick one point from the options given, it seems likely that (2, 3) could logically fit as it maintains a straightforward connection without major jumps compared to (3, 2) or flips in the other points.
Thus, a potential point that could reasonably be on the line that Chung-Li drew is: (2, 3).
Again, this is an assumption based on extrapolation since specific data about the number of slices needed for each ingredient hasn't been provided.