Which characteristics of a graph tell you that it represents a proportional relationship?
To determine if a graph represents a proportional relationship, you should look for the following characteristics:
1. Straight Line: If the graph is a straight line that passes through the origin (0,0), it indicates a proportional relationship.
2. Constant Slope: If the graph has a constant slope, it suggests a proportional relationship. The slope represents the rate at which one variable changes in relation to the other.
3. Direct Variation: If the graph can be expressed by the equation y = kx, where k is a constant, then it represents a proportional relationship.
4. Multiplicative Relationship: If the ratio of y-values to x-values remains constant for all points on the graph, it indicates a proportional relationship. This means that as one variable increases or decreases, the other variable changes in proportion.
Overall, a graph representing a proportional relationship should exhibit a straight line passing through the origin, have a constant slope, follow a direct variation equation, or display a consistent ratio between y and x values.
Does this graph represent a proportional relationship? Explain.
On a coordinate plane, a curved line has 2 curves.
Based on the information provided, if the graph of a curve has two curves, it most likely does not represent a proportional relationship. Proportional relationships are characterized by straight lines or a direct variation equation, not curved lines. Curved lines typically suggest a non-linear relationship where the ratio of y-values to x-values is not constant.
Jamie is walking her neighbors’ dog while they are away. She is keeping track of the total number of blocks she walks over time.
A 2-column table with 3 rows. Column 1 is labeled Minutes with entries 6, 14, 20. Column 2 is labeled Blocks with entries 3, 7, 10.
Does the table represent a proportional relationship?
Yes, because both columns are written in ascending order.
Yes, because the values in the second column are less than the values in the first column.
Yes, because the ratios are equivalent between each pair of values.
No, because the values in the table do not increase by the same amount in each row.
The correct answer is: No, because the values in the table do not increase by the same amount in each row.
In a proportional relationship, the ratio of the values in each row should remain constant. However, in this table, the values in the second column (Blocks) do not increase by the same amount in each row. For example, the difference between the first and second row is 4 blocks (7-3), while the difference between the second and third row is 3 blocks (10-7). Since the differences between the values are not consistent, the table does not represent a proportional relationship.
Rob says that this graph shows a proportional relationship. Is he correct? Explain.
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Apologies, but I'm unable to analyze the graph based on the description provided. It would be helpful if you could provide a detailed description of the graph or share the graph visually for a proper analysis.
Mandy used the input and output in this table to write ratios. She concluded that because they are not all equivalent, this is not a proportional relationship. Is she correct? Explain.
A 2-column table with 4 rows. Column 1 is labeled x with entries 1, 2, 5, 10. Column 2 is labeled y with entries 5, 10, 25, 50.
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Mandy is correct in her conclusion that the table does not represent a proportional relationship.
One way to determine if a relationship is proportional is by comparing the ratios of the input and output values. In this table, the ratios differ for each row:
- For the first row (1, 5), the ratio is 5/1 = 5.
- For the second row (2, 10), the ratio is 10/2 = 5 as well.
- For the third row (5, 25), the ratio is 25/5 = 5.
- However, for the fourth row (10, 50), the ratio is 50/10 = 5.
Because the ratios are not all equivalent, it indicates that the relationship is not proportional.
Which graph of ordered pairs shows a proportional relationship?
On a coordinate plane, points (1, negative 2) and (2, negative 4) are plotted.
On a coordinate plane, points (negative 2, negative 2) and (1, 3) are plotted.
On a coordinate plane, points (negative 2, 1) and (1, negative 2) are plotted.
On a coordinate plane, points (2, 1) and (4, 3) are plotted.